Hagen Kleinert (original) (raw)

Professor Dr. Dr. h.c. mult. for theoretical physics

Books

Collective Classical and Quantum Fields

in Plasmas, Superconductors, Superfluid 3He, and Liquid Crystals

Hagen Kleinert
pp. 1-424, World Scientific, Singapore 2017
ISBN: 978-981-3223-93-6 (hardcover)
ISBN: 978-981-3223-94-3 (softcover)
ISBN: 978-981-3223-96-7 (ebook)
World Scientific,amazon.com

This is an introductory book dealing with collective phenomena in many-body systems. A gas of bosons or fermions can show oscillations of various types of densities. These are described by different combinations of field variables. Especially delicate is the competition of these variables. In superfluid 3He, for example, the atoms can be attracted to each other by molecular forces, whereas they are repelled from each other at short distance due to a hardcore repulsion. The attraction gives rise to Cooper pairs, and the repulsion is overcome by paramagnon oscillations. The combination is what finally led to the discovery of superfluidity in3He. In general, the competition between various channels can most efficiently be studied by means of a classical version of the Hubbard-Stratonovich transformation.

A gas of electrons is controlled by the interplay of plasma oscillations and pair formation. In a system of rod- or disc-like molecules, liquid crystals are observed with directional orientations that behave in unusual five-fold or seven-fold symmetry patterns. The existence of such a symmetry was postulated in 1975 by the author and K. Maki. An aluminium material of this type was later manufactured by Dan Shechtman which won him the 2014 Nobel prize. The last chapter presents some solvable models, one of which was the first to illustrate the existence of broken supersymmetry in nuclei.

Particles and Quantum Fields

Hagen Kleinert
pp. 1-1628, World Scientific, Singapore 2015
ISBN: 978-981-4740-89-0 (hardcover)
ISBN: 978-981-4740-90-6 (softcover)
ISBN: 978-981-4740-92-0 (ebook)
World Scientific,amazon.com

This is an introductory book on elementary particles and their interactions. It starts out with many-body Schrödinger theory and second quantization and leads, via its generalization, to relativistic fields of various spins and to gravity. The text begins with the best known quantum field theory so far, the quantum electrodynamics of photon and electrons (QED). It continues by developing the theory of strong interactions between the elementary constituents of matter (quarks). This is possible due to the property called asymptotic freedom. On the way one has to tackle the problem of removing various infinities by renormalization. The divergent sums of infinitely many diagrams are performed with the renormalization group or by variational perturbation theory (VPT). The latter is an outcome of the Feynman-Kleinert variational approach to path integrals discussed in two earlier books of the author, one representing a comprehensive treatise on path integrals, the other dealing with critial phenomena. Unlike ordinary perturbation theory, VPT produces uniformly convergent series which are valid from weak to strong couplings, where they describe critical phenomena.

The present book develops the theory of effective actions which allow to treat quantum phenomena with classical formalism. For example, it derives the observed anomalous power laws of strongly interacting theories from an extremum of the action. Their fluctuations are not based on Gaussian distributions, as in the perturbative treatment of quantum field theories, or in asymptotically-free theories, but on deviations from the average which are much larger and which obey power-like distributions.

Exactly solvable models are discussed and their physical properties are compared with those derived from general methods. In the last chapter we discuss the problem of quantizing the classical theory of gravity.

Path Integrals

in Quantum Mechanics, Statistics, Polymer Physics, and Financial Markets

Hagen Kleinert
5th edition, pp. 1-1624, World Scientific, Singapore 2009
ISBN: 978-981-4273-55-8 (hardcover)
ISBN: 978-981-4273-56-5 (softcover)
ISBN: 978-981-4365-26-0 (ebook)
World Scientific,amazon.com

This is the fifth, expanded edition of the comprehensive textbook published in 1990 on the theory and applications of path integrals. It is the first book to explicitly solve path integrals of a wide variety of nontrivial quantum-mechanical systems, in particular the hydrogen atom. The solutions have been made possible by two major advances. The first is a new euclidean path integral formula which increases the restricted range of applicability of Feynman's time-sliced formula to include singular attractive 1/r- and 1/r2-potentials. The second is a new nonholonomic mapping principle carrying physical laws in flat spacetime to spacetimes with curvature and torsion, which leads to time-sliced path integrals that are manifestly invariant under coordinate transformations.

In addition to the time-sliced definition, the author gives a perturbative, coordinate-independent definition of path integrals, which makes them invariant under coordinate transformations. A consistent implementation of this property leads to an extension of the theory of generalized functions by defining uniquely products of distributions.

The powerful Feynman-Kleinert variational approach is explained and developed systematically into a variational perturbation theory which, in contrast to ordinary perturbation theory, produces convergent results. The convergence is uniform from weak to strong couplings, opening a way to precise evaluations of analytically unsolvable path integrals in the strong-coupling regime where they describe critical phenomena.

Tunneling processes are treated in detail, with applications to the lifetimes of supercurrents, the stability of metastable thermodynamic phases, and the large-order behavior of perturbation expansions. A variational treatment extends the range of validity to small barriers. A corresponding extension of the large-order perturbation theory now also applies to small orders.

Special attention is devoted to path integrals with topological restrictions needed to understand the statistical properties of elementary particles and the entanglement phenomena in polymer physics and biophysics. The Chern–Simons theory of particles with fractional statistics (anyons) is introduced and applied to explain the fractional quantum Hall effect.

The relevance of path integrals to financial markets is discussed, and improvements of the famous Black–Scholes formula for option prices are developed which account for the fact, recently experienced in the world markets, that large fluctuations occur much more frequently than in Gaussian distributions.

Translations

• Spanish translation by Daniel Olguin (daniel@fis.cinvestav.mx), with the help of Pablo Medina Zepeda (jerzyzepeda@gmail.com).
  eae-publishing, 2017, ISBN: 978-363-9533-04-0, morebooks.shop
• Chinese translation by Dr. Cong-Feng Qiao (qiaocf@gucas.ac.cn).

Downloads

• English
• Spanish
• Chinese (first two chapters)

Proceedings of the Eleventh Marcel Grossmann Meeting on General Relativity

Hagen Kleinert and Robert T. Jantzen (eds.)
pp. 1-3120, World Scientific, Singapore 2008
ISBN: 978-981-2834-26-3 (hardcover)
ISBN: 978-981-4470-03-2 (ebook)
World Scientific,amazon.com

The Marcel Grossmann Meetings are three-yearly forums that meet to discuss recent advances in gravitation, general relativity and relativistic field theories, emphasizing their mathematical foundations, physical predictions and experimental tests. These meetings aim to facilitate the exchange of ideas among scientists, to deepen our understanding of space-time structures, and to review the status of ongoing experiments and observations testing Einstein's theory of gravitation either from ground or space-based experiments. Since the first meeting in 1975 in Trieste, Italy, which was established by Remo Ruffini and Abdus Salam, the range of topics presented at these meetings has gradually widened to accommodate issues of major scientific interest, and attendance has grown to attract more than 900 participants from over 80 countries. This proceedings volume of the eleventh meeting in the series, held in Berlin in 2006, highlights and records the developments and applications of Einstein's theory in diverse areas ranging from fundamental field theories to particle physics, astrophysics and cosmology, made possible by unprecedented technological developments in experimental and observational techniques from space, ground and underground observatories. It provides a broad sampling of the current work in the field, especially relativistic astrophysics, including many reviews by leading figures in the research community.

Multivalued Fields

in Condensed Matter, Electromagnetism, and Gravitation

Hagen Kleinert
pp. 1-2800, World Scientific, Singapore 2008
ISBN: 978-981-2791-70-2 (hardcover)
ISBN: 978-981-2791-71-9 (softcover)
ISBN: 978-981-3101-34-0 (ebook)
World Scientific,amazon.com

This book lays the foundations of the theory of fluctuating multivalued fields with numerous applications. Most prominent among these are phenomena dominated by the statistical mechanics of line-like objects, such as the phase transitions in superfluids and superconductors as well as the melting process of crystals, and the electromagnetic potential as a multivalued field that can produce a condensate of magnetic monopoles. In addition, multivalued mappings play a crucial role in deriving the physical laws of matter coupled to gauge fields and gravity with torsion from the laws of free matter. Through careful analysis of each of these applications, the book thus provides students and researchers with supplementary reading material for graduate courses on phase transitions, quantum field theory, gravitational physics, and differential geometry.

Translations

• Chinese translation by Dr. Ying Jiang (yjiang@shu.edu.cn).

Downloads

• English
• Chinese

Critical Properties of Phi4-Theories

Hagen Kleinert and V. Schulte-Frohlinde
pp. 1-512, World Scientific, Singapore 2001
ISBN: 978-981-0246-58-7 (hardcover)
ISBN: 978-981-0246-59-4 (softcover)
ISBN: 978-981-4490-79-5 (ebook)
World Scientific,amazon.com

This book explains in detail how to perform perturbation expansions in quantum field theory to high orders, and how to extract the critical properties of the theory from the resulting divergent power series. These properties are calculated for various second-order phase transitions of three-dimensional systems with high accuracy, in particular the critical exponents observable in experiments close to the phase transition.

Beginning with an introduction to critical phenomena, this book develops the functional-integral description of quantum field theories, their perturbation expansions, and a method for finding recursively all Feynman diagrams to any order in the coupling strength. Algebraic computer programs are supplied on accompanying World Wide Web pages. The diagrams correspond to integrals in momentum space. They are evaluated in 4-ε dimensions, where they possess pole terms in 1/ε. The pole terms are collected into renormalization constants.

The theory of the renormalization group is used to find the critical scaling laws. They contain critical exponents which are obtained from the renormalization constants in the form of power series. These are divergent, due to factorially growing expansion coefficients. The evaluation requires resummation procedures, which are performed in two ways: (1) using traditional methods based on Padé and Borel transformations, combined with analytic mappings; (2) using modern variational perturbation theory, where the results follow from a simple strong-coupling formula. As a crucial test of the accuracy of the methods, the critical exponent α governing the divergence of the specific heat of superfluid helium is shown to agree very well with the extremely precise experimental number found in the space shuttle orbiting the earth (whose data are displayed on the cover of the book).

The phi4-theories investigated in this book contain any number N of fields in an O(N)-symmetric interaction, or in an interaction in which O(N)-symmetry is broken by a term of a cubic symmetry. The crossover behavior between the different symmetries is investigated. In addition, alternative ways of obtaining critical exponents of phi4-theories are sketched, such as variational perturbation expansions in three rather than 4-ε dimensions, and improved ratio tests in high-temperature expansions of lattice models.

Pfadintegrale

in Quantenmechanik, Statistik und Polymerphysik

Hagen Kleinert
pp. 1-850, Spektrum Akademischer Verlag, Heidelberg 1993
ISBN: 3-86025-613-0 (hardcover)
amazon.de

Dieses umfassende Lehrbuch aber Theorie und Anwendung von Pfadintegralen enthält erstmals Lösungen für eine Vielzahl nichttrivialer Systeme. Darunter fallen das einfachste System der Atomphysik und das für die Gravitationsphysik relevante System eines Teilchens in einem Raum mit Krümmung und Torsion. Ermöglicht werden diese Lösungen durch zwei neue Entwicklungen eine euklidische Pfadintegralformel, die im Gegensatz zur Feynmanschen Formel auch bei attraktiven 1/r- und 1/r2-Potentialen existiert, und ein einfaches Aequivalenzprinzip, die Übertragung von Pfadintegralen aus dem flachen Raum in einen nichteuklidischen Raum regelt. Damit zusammenhängend wird gezeigt, daß die Ableitung der richtigen klassischen Bewegungsgleichungen in Räumen mit Torsion eines Wirkungsprinzips bedarf.

Das Feynman-Kleinert-Variationsverfahren wird vorgestellt und systematisch verbessert. Es ermöglicht eine sehr genaue Berechnung analytisch nicht lösbarer Pfadintegrale.

Eine ausführliche Behandlung erfährt die Theorie der Tunnelprozesse mit Anwendungen auf die Lebensdauer von Supraströmen, die Stabilität metastabiler Phasen und das von Störungsreihen. Mit Hilfe eines neuen Variationsverfahrens wird der bisher auf hohe Tunnelbarrieren eingeschränkte Gültigkeitbereich auf niedrige Barrieren erweitert und vermittelt dadurch Kenntnis aber Störungskoeffizienten niedrigerer Ordnung.

Besondere Aufmerksamkeit gilt Pfadintegralen mit topologischen Einschränkungen, die für die Statistik quantenmechanischer Vielteilchensysteme und Verschlingungserscheinungen in der Polymerphysik von Bedeutung sind. Die Chern-Simons-Theorie der wird eingeführt, ihre mögliche Relevanz für die Hochtemperatur-Supraleitung erläutert und die auf ihr fußende Erklärung des Quanten-Hall-Effekts geliefert.

Gauge Fields in Condensed Matter

Vol. 1: Superflow and Vortex Lines (Disorder Fields, Phase Transitions)

Vol. 2: Stresses and Defects (Differential Geometry, Crystal Melting)

Hagen Kleinert
pp. 1-1524, World Scientific, Singapore 1989
ISBN: 978-997-1502-10-2 (hardcover)
World Scientific,amazon.com

This book is the first to develop a unified gauge theory of condensed matter systems dominated by vortices or defects and their long-range interactions. Gauge fields provide the only means of describing these interactions in terms of local fields, rendering them accessible to standard field theoretic techniques. Two particularly important examples, superfluid systems and crystals, are treated in great detail. The theory is developed in close contact with physical phenomena and evolves naturally from conventional descriptions of the systems. In addition to gauge fields, the book introduces the important new concept of disorder fields for ensembles of line-like defects. The combined field theory allows for a new understanding of the important phase transitions superfluid ‘normal and solid’ liquid. Apart from the above, the book presents the general differential geometry of defects in spaces with curvature and torsion and establishes contact with the modern theory of gravity with torsion. This book is written for condensed matter physicists and field theorists. It can be used as a textbook for a second-year graduate course or as supplementary reading for courses in the areas of condensed matter and solid state physics, statistical mechanics, and field theory.

Downloads

• Part 1, English
• Part 2, English
• Part 3, English
• Part 4, English

Articles

[0] H. Kleinert The Asymmetric Energy of Single-Closed-Shell Nuclei in Present-day Microscopic Theory M.S. Thesis, 1-49 (1964)

[1] H. Kleinert Group Dynamics of Elementary Particles, University of Colorado Thesis, Fortschritte der Physik 6, 1-74 (1968) (Ph.D. Thesis)

[2] H. Kleinert Isoscalar Nucleon Form Factor from O(4,2) Dynamics, Phys. Rev. 163, 1807 (1968)

[3] H. Kleinert Relativistic Current of the H-Atom in O(4,2) Dynamics, Phys. Rev. 168, 1827 (1968)

[4] H. Kleinert Group Dynamics of the Hydrogen Atom, Lectures in Theoretical Physics, edited by W.E. Brittin and A.O. Barut, Gordon and Breach, N.Y. 1968, pp. 427-482.

[5] H. Kleinert Decay Rates of the Decouplet resonances from O(3,1) times SU(3) Dynamics. Definite SU(3) Symmetry Breaking, Phys. Rev. Letters 18, 1027 (1967)

[6] A.O. Barut and H. Kleinert
The Solution of the Relativistic Discrete Mass Problem with Internal Degrees of Freedom and Further Developments, Proc. of the Fourth Coral Gables Conference, p. 76-105, edited by A. Perlmutter and B. Kursungoglu, W.H. Freeman, San Francisco, 1967.

[7] A.O. Barut and H. Kleinert Resonance Decays from O(3,1) Dynamics. A Regularity in the Partial Decay Widths, Phys. Rev. Letters 18, 754 (1967)

[8] A.O. Barut and H. Kleinert Calculation of Relativistic Transition Probabilities and Form Factors from Non-Compact Groups, Phys. Rev. 156, 1546 (1967) (PR ONLINE)

[9] A.O. Barut and H. Kleinert Transition Probabilities of the H-Atom from Noncompact Dynamical Groups, Phys. Rev. 156, 1541 (1967)

[10] A.O. Barut and H. Kleinert Current Operators and Majorana Equation for the Hydrogen Atom from Dynamical Groups, Phys. Rev. 157, 1180 (1967)

[11] A.O. Barut and H. Kleinert Dynamical Group O(4,2) for Baryons and the Behaviour of Form factors, Phys. Rev. 161, 1464 (1967) (PR ONLINE)

[12] A.O. Barut and H. Kleinert Transition Form Factors of H-Atom, Phys. Rev. 160, 1149 (1967)

[13] A.O. Barut and H. Kleinert Tensor Operators and Mass Formula in the Minimal Extension of U(3) by Charge Conjugation, J. Math. Phys. 8, 685 (1967)

[14] A.O. Barut and H. Kleinert Near Forward Peaks in the K^-p- and pi^- p Charge-Exchange Scattering, Phys. Rev. Letters 16, 950 (1966) (PRL ONLINE)

[15] A.O. Barut, D. Corrigan, and H. Kleinert Derivation of Mass Spectrum and Magnetic Moments from Current Conservation in Relativistic O(3,2) and O(4,2) Theories, Phys. Rev. 167, 1527 (1968) (PR ONLINE)

[16] A.O. Barut, D. Corrigan, and H. Kleinert Magnetic Moments, Form Factors and Mass Spectrum of Baryons, Phys. Rev. Letters 20, 167 (1968) (PRL ONLINE)

[17] A.O. Barut, H. Kleinert, and S. Malin, The Anomalous Zitterbewegung of Composite Particles, Nuovo Cimento A 57, 835 (1968)

[18] B. Hamprecht and H. Kleinert Nonfactorizing Saturation of Current Algebra, Phys. Rev. 180, 1410 (1969) (PR ONLINE)

[19] B. Hamprecht and H. Kleinert Decays of Baryon resonances in an O(3,1) Model, Fortschr. Phys. 16, 635-661 (1969)

[20] H. Kleinert Baryon Current Solving SU(3) Charge Current Algebra, Springer Tracts in Modern Physics, Vol. 49 (1969)

[21] H. Kleinert and K.H. Muetter, Invariant Functions and Discrete Symmetries, Nuovo Cimento A 63, 657-674 (1969)

[22] D. Corrigan, B. Hamprecht and H. Kleinert
Formfactors of Delta (123) from O(4,2) Dynamics, Nucl. Phys. B 11, 1-6 (1969)

[23] F. Buccella, H. Kleinert, and C.A. Savoy, A Mixing Operator for the SU(3) times SU(3) Chiral Algebra, Il Nuovo Cimento, A 69, 133-149 (1970)

[24] H. Kleinert Veneziano Amplitude for any Intercept from Local Lagrangian, Lettere Nuovo Cimento 4, 285 (1970)

[25] H. Kleinert and P.H. Weisz, Broken Scale Invariance and sigma pi pi, sigma A_1 A_1, sigma A_1 pi, and A_1 sigma pi Vertices, Lettere Nuovo Cimento 4, 1091-1096 (1970)

[26] H. Kleinert and P.H. Weisz, Field Dimension and Gravitational Vertex, Nucl. Phys. B 27, 23-32 (1971)

[27] H. Kleinert and P.H. Weisz, On the Dimension of Chiral and Conformal Symmetry Breaking, Nuovo Cimento A 3, 479-490 (1971)

[28] H. Kleinert, F. Steiner, and P.H. Weisz, Do Present Meson Baryon Scattering Data Really Support (3,_3) + (_3,3) Dominance in SU(3) times SU(3) Symmetry Breaking? Physics Letters B 34, 312 (1971)

[29] J. Baacke and H. Kleinert Backward Dispersion Relations for pi N - > pi Delta Scattering and N delta gamma Couplings, Phys. Letters B 35, 159-162 (1971)

[30] H. Kleinert, L. Staunton, and P.H. Weisz, Hard Meson Cal culation of sigma pi pi , A sigma pi , and sigma A A Vertices, Nucl. Phys. B 38, 104-124 (1972)

[31] J. Baacke and H. Kleinert Large Isovector Magnetic Moment for Roper Nucleon Transition, Lettere Nuovo Cimento 2, 463-467 (1971)

[32] H. Kleinert and P.H. Weisz, On the Helicity-Flip Property of A_2 NN Coupling, Lettere Nuovo Cimento 2, 459-462 (1971)

[33] H. Kleinert, L. Staunton, and P.H. Weisz, On the Electromagnetic Coupling of f and sigma Mesons, Nuclear Physics B 38, 87-103 (1972)

[34] J. Baacke and H. Kleinert Electromagnetic Couplings from the Combined Use of Forward and Backward Dispersion Relations, Nuclear Physics, 42 42, 301-324 (1972)

[35] J. Baacke, T.H. Chang, and H. Kleinert Compton Scattering and the Couplings of f, sigma , A_2, and pi to Photons and Nucleons, Il Nuovo Cimento A 12, 21-61 (1972)

[36] H. Kleinert A Model for Deep Inelastic Structure Functions, Nucl. Phys. B 43, 301-330 (1972)

[37] A. Grillo and H. Kleinert
Is Nature Scale Invariant on the Light Cone, FU-Berlin preprint, December 1971.

[38] H. Kleinert Low Energy Aspects of Broken Scale Invariance, Acta Phys. Austriaca Suppl IX, 533-604 (1972)

[39] H. Kleinert Broken Scale Invariance, Fortschr. Phys. 21, 1-55 (1973)

[40] H. Kleinert Algebraization of Regge Couplings, Phys. Letters B 39, 511-513 (1972)

[41] H. Kleinert
Scaling Properties of Infinite Component Fields, in Scale and Conformal Symmetry, Addison Wesley, N.Y. (1973)

[42] H. Kleinert Regge Couplings From SU(2) times SU(2) Saturation Schemes, Fortschr. Phys. 21, 377-396 (1973)

[43] H. Kleinert, L. R. Ram Mohan, Predictions on the Coupling of f and rho Trajectories to Mesons from Chiral Symmetry, Nucl. Phys. B 52, 253-279 (1973)

[44] H. Kleinert Algebra of Regge Residues, Lettere Nuovo Cimento 6, 583 (1973)

[45] H. Kleinert Bilocal Form Factors and Regge Couplings, Nucl. Phys. B 65, 77-111 (1973)

[46] H. Kleinert
Superalgebra of currents and Regge Couplings, Erice Lectures 1973, in Properties of the Fundamental Interactions\/, Editrice Compositori, Bologna, Italy.

[47] H. Kleinert Quarks and Reggeons, Nucl. Phys. B 79, 526-545 (1974)

[48] H. Kleinert
The Origin of Exchange Degeneracy, Erice Lectures 1974, in Highlights in Particle Physics, Editrice Compositori, Bologna, Italy.

[49] R. Acharya and H. Kleinert A Gauge Invariance in Gribov's Field Theory and the Intercept of the Pomeron, Lettere Nuovo Cimento 14, 395 (1975)

[50] H. Kleinert Quark Pairs inside Hadrons, Phys. Letters B 59, 163 (1975)

[51] H. Kleinert Quark Masses, Phys. Letters B 62, 77 (1976)

[52] H. Kleinert Hadronization of Quark Theories and a Bilocal form of QED, Phys. Letters B 62, 429 (1976)

[52a] H. Kleinert Hadronization of Quark Theories and Bilocal QED, Lecture presented at Tbilisi Conference 1976 publ. in Proceedings.

[53] H. Kleinert On the Hadronization of Quark Theories, Lectures presented at the Erice Summer Institute 1976, in Understanding the Fundamental Constituents of Matter, Plenum Press, New York, 1978, A. Zichichi ed., pp. 289-390.

[54] H. Kleinert Field Theory of Collective Excitations; I. A Soluble Model, Phys. Lett. B 69, 9 (1977)

[55] H. Kleinert Collective Quantum Fields, Lectures presented at the First Erice Summer School on Low-Temperature Physics, 1977, in Fortschr. Physik 26, 565-671 (1978)

[56] H. Kleinert
Non-Linear Field Equations in Collective Phenomena, Lecture presented at the Istanbul Conference on Mathematical Physics 1977, Nonlinear Equations in Physics and Mathematics, 355-374, Reidel 1978.

[57] H. Kleinert, Y.L. Lin-Liu and K. Maki, Stability of Uniform Textures in ^3He-A in the Presence of Superflow, Phys. Lett. A 70, 27 (1979)

[58] H. Kleinert and H. Reinhardt Semiclassical Approach to Large Amplitude Collective Nuclear Excitations, Nucl. Phys. A 332, 33 (1979)

[59] H. Kleinert, Y.L. Lin-Liu, and K. Maki, Existence of Helical Textures around Superflow in ^3He-A; Paper presented at the Grenoble conference on Low-Temperature Physics, August 1978, Journal des Physique 39, C6-59 (1978)

[60] H. Kleinert What can a Particle Physicist learn from Superliquid ^3He? Lectures presented at the International School of Subnuclear Physics, Erice, 1978, publ. in The New Aspects of Subnuclear Physics, Plenum Press 1980, A. Zichichi, ed.

[61] H. Kleinert The Two Superflows in ^3He-A, Phys. Lett. A 71, 66 (1969)

[62] H. Kleinert and K. Maki, High Frequences Conductivity of Charge Density Wave Condensates at Low Temperatures, Phys. Rev. B 12, 6238 (1979)

[63] H. Kleinert
Collective Field Theory of Superliquid ^3He, FU-Berlin preprint, 1978

[64] W. Janke and H. Kleinert Summing Paths for a Particle in a Box, Lettere Nuovo Cimento 25, 297 (1979)

[65] H. Duru and H. Kleinert Solution of the Path Integral for the H-Atom, Phys. Letters B 84, 185 (1979)

[66] R. Kaul and H. Kleinert Surface Energy and Textural Boundary Conditions Between A and B Phases of ^3He, J. Low. Temp. Phys. 38, 539 (1980)

[67] H. Kleinert Fate of False Vacua - Field Theory Applied to Superflow, Erice Lectures (1979), publ. in Pointlike Structures Inside and Outside Hadrons, Plenum Press 1982, A. Zichichi, ed.

[68] H. Kleinert Depairing Critical Current in ^3He-B. Including Gap Distortion, J. Low Temp. Phys. 39, 451 (1980)

[69] H. Kleinert Collective Excitations in ^3He B in the Presence of Superflow Phys. Letters A 78, 155 (1980)

[70] W. Janke and H. Kleinert Superflow in ^3He-B in the Presence of Magnetic Fields at all Temperatures, Phys. Letters A 78, 363 (1980)

[71] H. Kleinert New Symmetries and Constants of Motion from Dynamical Groups Phys. Letters B 94, 373 (1980)

[72] R. Kaul and H. Kleinert Surface Energy and Textural Boundary Conditions Between A and B Phases of ^3He, J. Low. Temp. Phys. 38, 539 (1980)

[73] H. Kleinert No Pion Condensate in Nuclear Matter due to Fluctuations, Phys. Lett. B 102, 1 (1981)

[74] H. Duru. H. Kleinert and N. Uenal, Decay Rate of Supercurrent in Thin Wire, J. Low Temp. Phys. 42, 85 (1981)

[75] H. Kleinert and K. Maki, Lattice Textures in Cholesteric Liquid Crystals, Fortschr. Phys. 29, 1 (1981)

[76] H. Kleinert Thermal Expansion and Bragg Reflexes in Lattice Textures of Cholesteric Liquid Crystals, Phys. Letters A 81, 141 (1981)

[77] H. Kleinert Field Theory of Collective Excitations. II. Large Amplitude Phenomena. Lett. Nuovo Cimento 31, 521 (1981)

[78] H. Kleinert Field Theory of Collective Excitations. III. Condensation of Four-Particle Clusters, Phys. Letters A 84, 199 (1981)

[79] H. Kleinert Field Theory of Collective Excitations, IV. Condensation of Three and Four-Particle Clusters in Bose Systems, Phys. Letters A 84, 259 (1981)

[80] H. Kleinert Beyond Landau's Theory of Fermi Liquids, Phys. Letters A 84, 202 (1981)

[81] H. Kleinert Condensation of Four-Particle Clusters: A Soluble Model, Jour. Phys. G: Nucl. Phys. 8, 239 (1982)

[82] H. Kleinert Higher Effective Actions in Bose Systems, Fortschr. Phys. 30, 187 (1982)

[83] H. Duru and H. Kleinert Quantum Mechanics of H-Atom from Path Integrals, Fortschr. d. Phys. 30, 401 (1982)

[84] H. Kleinert Quasiclassical Approach to Collective Nuclear Phenomena, Fortschr. d. Phys. 30, 351 (1982)

[85] H. Kleinert No Cryptoferromagnetic State due to Fluctuations, Phys. Lett. A 83, 294(1981)

[86] H. Kleinert Restrictions on Pion Condensate, Lett. Nuovo Cimento 34, 133 (1982)

[87] H. Kleinert Gauge Theory of Dislocations in Solids and Melting as a Meissner-Higgs Effect Lett. Nuovo Cimento 34, 464(1982)

[88] H. Kleinert Gauge Theory of Dislocation Melting, Phys. Lett. A 89, 294 (1982)

[89] H. Kleinert Theory of Defect Fluctuations in Solids-Dislocations and Disclinations under Stress, Lett. Nuovo Cimento 34, 471 (1982)

[90] H. Kleinert Towards a Unified Theory of Defects and Stresses, Lett. Nuovo Cimento 35, 41 (1982)

[91] H. Kleinert Defect Melting as an SO(3) Lattice Gauge Theory, Phys. Lett. B 113, 395 (1982)

[92] H. Kleinert A New Dynamical Origin for Higgs Particles, Lett. Nuovo Cimento 34, 209 (1982)

[93] H. Kleinert Duality Transformation for Defect Melting, Phys. Lett. A 91, 295 (1982)

[94] H. Kleinert Line-like Defects in Pion Condensate, Lett. Nuovo Cimento 34, 103 (1982)

[95] H. Kleinert Fluctuations and Defects in the spiral state of Magnetic Superconductors, Phys. Lett. A 90, 259 (1982)

[96] H. Kleinert Comment on Path Integral for General Time-Dependent Solvable Schr"odinger Equation, Lett. Nuovo Cimento 34, 503 (1982)

[97] H. Kleinert Disorder Version of the Abelian Higgs Model and the Order of the Superconductive Phase Transition, Lett. Nuovo Cimento 35, 405 (1982)

[98] H. Kleinert Gauge Theory of Vortex Lines in ^4He and the Superfluid Phase Transition, Phys. Lett. A 93, 86 (1982)

[99] H. Kleinert
Defect Lines in Pion Condensates and a Possible New Phase, Lecture presented at the 1983 Conference on High Energy Nuclear Physics at Lake Balaton, Hungary - Proceedings publ. by Budapest University Press, 1983, ed. J. Eroe.

[100] H. Kleinert Relation between U(1) Lattice Gauge Theory and Defect Melting, Lett. Nuovo Cimento 37, 425(1983)

[101] H. Kleinert Transition Entropy of Defect Melting, Phys. Lett. A 95, 493 (1983)

[102] H. Kleinert Gauge Field Theory of Dislocations in Smectic A Liquid Crystals, J. Phys. 44, 353 (1983) (Paris)

[103] H. Kleinert
New Developments in Gauge Theory of Defect Melting, Lecture presented at Max-Planck-Institut fuer Festkoerperforschung und Metallforschung, Stuttgart, July 1982, publ. in Gauge Field Theories of Defects in Solids, ed. E. Kroener.

[104] H. Kleinert Disclinations and First-Order Transition in 2D Melting, Phys. Lett. A 95, 381 (1983)

[105] H. Kleinert Dual Model of Dislocation and Disclination Melting, Phys. Lett. A 96 302 (1983)

[106] H. Kleinert Limitations on Coleman-Weinberg Mechanism, Phys. Lett. B 128, 69 (1983)

[107] H. Kleinert Double Gauge Theory of Stresses and Defects, Phys. Lett. A 97, 51 (1983)

[108] H. Kleinert Disclinations as Origin of First-Order Transitions in Melting, Lett. Nuovo Cimento 37, 295 (1983)

[109] H. Kleinert Model of Glass, Phys. Lett. A 101, 224 (1984)

[110] H. Kleinert Gauge Theory of Defect Melting-Status 1984 Invited lecture at the 1984 EPS Conference on Condensed Matter Physics, Den Haag, publ. in Physica 127B, 332(1984)

[111] S. Ami and H. Kleinert Fluctuations in 2D Melting, J. Phys. Lett. 45, (Paris) 877 (1984)

[112] T. Hofsaess and H. Kleinert Field Theory of Self-Avoiding Random Chains, Phys. Lett. A 103, 67 (1984)

[113] T. Hofsaess and H. Kleinert Field Theory of Self-Avoiding Random Surfaces, Phys. Lett. A 102, 420 (1984)

[114] T. Matsui, H. Kleinert and S. Ami, Two Loop Effective Action of O(N) Spin Models in 1/D Expansion, Phys. Lett. B 143, 199 (1984)

[115] T. Hofsaess and H. Kleinert A Simple Lattice Model for Self-Avoiding Random Loops, Phys. Lett. A 105, 60 (1984)

[116] L. Jacobs and H. Kleinert Monte Carlo Study of Defect Melting in Three Dimensions, J. Phys. A 17, L361 (1984)

[117] H. Kleinert Higgs Particles from Pure Gauge Fields, Erice Lectures 1982, in Gauge Interactions, Plenum Press, N.Y., ed. A. Zichichi, 1984, pp. 301-326.

[118] H. Kleinert Defect Mediated Phase Transitions in Superfluids, Solids, and Relation to Lattice Gauge Theories, Lecture presented at the 1983 Cargese Summer School on Progress in Gauge Field Theory; publ. in Progress in Gauge Field Theory, ed. by G. 't. Hooft et al., Plenum Press 1984, pp 373-401.

[119] T. Hofsaess, W. Janke and H. Kleinert From Self-Avoiding Random Loops to Ising Systems - an Interpolation Spin Model and its Monte Carlo Study, Phys. Lett. A 105, 463, (1984)

[120] W. Janke and H. Kleinert First Order in 2D Disclination Melting, Phys. Lett. A 105, 134 (1984)

[121] H. Kleinert Towards a Quantum Field Theory of Defects and Stresses - Quantum Vortex Dynamics in a Film of Superfluid Helium, Int. J. Engng. Sci. 23, 927 (1985)

[122] H. Kleinert Interaction Energy Between Defects in Higher Gradient Elasticity, Lett. Nuovo Cimento 43, 261 (1985)

[123] H. Kleinert Path Integrals for Self-Avoiding Random Loops and Surfaces, Lecture presented at the 1985 Bielefeld Conference on ``Path Integrals from meV to MeV", ed. by M.C. Gutzwiller, A. Inomata, J.R. Klauder, L. Steit, World Scientific, Singapore, 1986, pp. 239-250.

[124] T. Hofsaess, H. Kleinert, T. Matsui, Are Gluons Composite? A New Lattice Gauge Model with an Exact U(N) Solution, Phys. Lett. B 156, 96 (1985)

[125] T. Hofsaess and H. Kleinert Disorder Field Theory of the Ensemble of Random Loops without Spikes, Lett. Nuovo Cimento 43, 244 (1985)

[126] W. Janke and H. Kleinert How Good is the Villain Approximation? Nucl. Phys. B 270, 135 (1986)

[127] H. Kleinert Gauge Theory of Time-Dependent Stresses and Defects: Quantum Defect Dynamics, J. Phys. A: Math. Gen. 19, 1855 (1986)

[128] H. Kleinert Thermal Softening of Curvature Elasticity in Membranes, Phys. Lett. A 114, 263 (1986)

[129] H. Kleinert Size Distribution of Spherical Vesicles, Phys. Lett. A 116, 57 (1986)

[130] H. Kleinert and W. Miller, Renormalization of Charge in Villain Form Lattice Gauge Theory, UCSD preprint 1985, Phys. Rev. Lett. 56, 11 (1986)

[131] W. Janke and H. Kleinert Tricritical Points in 3D XY Model with Mixed Action, Phys. Rev. Lett. 57, 279 (1986)

[132] S. Ami and H. Kleinert Vortex Contribution to Specific Heat in 2D XY-Model, Phys. Rev. B 33, 4692 (1986)

[133] W. Janke and H. Kleinert Fluctuation Pressure of Membrane Between Walls, Phys. Lett. A 117, 353 (1986)

[134] W. Janke and H. Kleinert Thermodynamic Properties of 3D Defect Systems, Phys. Rev. B 33, 6346 (1986)

[135] W. Janke and H. Kleinert First-Order Transition in Two Dimensional Laplacian Roughening Model on Square Lattice, Phys. Lett. A 114, 255 (1986)

[136] T. Matsui, T. Hofsaess, H. Kleinert Fluctuations in the Nematic Isotropic Phase Transition, Phys. Rev. A 33, 660 (1986)

[137] H. Kleinert Microemulsions in the Three-Phase Regime, J. Chem. Phys. 84, 964 (1986)

[138] H. Kleinert Path Integrals and the N to Infinity Solution of U(N) Lattice Gauge Theories, Lecture presented at the 1985 Bielefeld Conference on ``Path Integrals from meV to MeV", ed. by M.C. Gutzwiller, A. Inomata, J.R. Klauder, L. Steit, World Scientific, Singapore, 1986, pp. 235-238.

[139] W. Janke and H. Kleinert First Order Phase Transition in 3D XY Model with Mixed Action, Nucl. Phys. B 270, 399 (1986)

[140] H. Kleinert Tricritical Ratio of Length Scales in 4D Abelian Higgs Model, Phys. Rev. Lett. 56, 1441 (1986)

[141] H. Kleinert The Neighborhood of the Three-Phase Regime in Microemulsions, J. Chem. Phys. 85, 4148 (1986)

[142] W. Janke and H. Kleinert Self-Avoiding Random Loops Versus Ising Model in Three Dimensions, Phys. Lett. A 128, 463(1988)

[143] W. Janke and H. Kleinert Fluctuation Pressure in a Stack of Membranes, Phys. Rev. Lett. 58, 144 (1987)

[144] H. Kleinert Path Integral for Lagrangian L = (k/2) ddot x^2 + (m^2/2) dot x^2 + (k/2)x^2, J. Math. Phys. 27, 3003 (1986)

[145] H. Kleinert Particle Distribution from Effective Classical Potential, Phys. Lett. A 118, 267 (1986)

[146] H. Kleinert Path Integral for Coulomb System with Magnetic Charges Phys. Lett. A 116, 201 (1986)

[147] T. Hofsaess and H. Kleinert Gaussian Curvature in an Ising Model of Microemulsions, J. Chem. Phys. 86 (6), 3565 (1987)

[148] H. Kleinert Effective Classical Potential for Fluctuating Field Systems of Finite Size, Phys. Lett. A 118, 195 (1986)

[149] H. Kleinert The Membrane Properties of Condensing Strings Phys. Lett. B 174, 335 (1986)

[150] H. Kleinert The Two Gauge fields of Elasticity and Plasticity Annals of the New York Academy of Sciences 452, 349 (1985)

[151] H. Kleinert Effective Potentials from Effective Classical Potentials, Phys. Lett. B 181, 324 (1986)

[152] S. Ami and H. Kleinert
Functional Measures of Membrane Fluctuations, FU-Berlin preprint 1986.

[153] W. Janke and H. Kleinert Effective Classical Potential and Particle Distribution of a Coulomb System, Phys. Lett. A 118, 371 (1986)

[154] W. Janke and H. Kleinert The Effective Classical Potential of the Double-Well Potential, Chem. Phys. Lett. 137, 162 (1987)

[155] H. Kleinert
Recent Results on 2D Defect Melting, Lecture presented at the Boston Conference on Solid State Physics, 1986.

[156] H. Kleinert and W. Miller, Renormalization of Charge Due to Magnetic Monopoles in the Villain-Form of U(1) Lattice Gauge Theory, Phys. Rev. D 38, 1239(1988)

[157] S. Ami and H. Kleinert Renormalization of Curvature Elastic Constants for Elastic and Fluid Membranes, Phys. Lett. A 120, 207 (1987)

[158] H. Kleinert
Floppy Membranes, FU-Berlin preprint 1986.

[159] R.P Feynman and H. Kleinert Effective Classical Partition Functions, Phys. Rev. A 34, 5080 (1986)

[160] H. Kleinert
Quark Mass Dependence of 1/R Term in String Potential,

[161] T. Hofsaess and H. Kleinert A Generalization of Widom's Model of Microemulsions, J. Chem. Phys. 88(2), 1156(1988)

[162] H. Kleinert Thermal Deconfinement Transition for Spontaneous Strings, Phys. Lett. B 189, 187 (1987)

[163] H. Kleinert How to do the Time-Sliced Path Integral of H-Atom, Phys. Lett. A 120, 361 (1987)

[164] H. Kleinert Spontaneous Generation of String Tension and Quark Potential, Phys. Rev. Lett. 58, 1915 (1987)

[165] H. Kleinert Spontaneous Quantum Gravity - A Soluble Model Phys. Lett. B 196, 355 (1987)

[166] H. Kleinert
Spontaneous Strings FU-Berlin preprint 1987.

[167] H. Kleinert Glueballs from Spontaneous Strings Phys. Rev. D 37, 1699 (1988)

[168] H. Kleinert Universal 1/R Term in Quark Potential of Spontaneous Strings Phys. Lett. B 197, 351 (1987)

[169] H. Kleinert Phases of Spontaneous Strings in Large Dimensions Phys. Lett. B 197, 125 (1987)

[170] H. Kleinert Universal Entropy of Large Spheres Made of Spontaneous Strings, Mod. Phys. Lett. A 3, 531 (1987)

[171] T. Hofsaess and H. Kleinert Towards Custom-Made Microemulsions, Chem. Phys. Lett. 145, 407 (1988)

[172] H. Kleinert Gravity as Theory of Defects in a Crystal with Only Second-Gradient Elasticity Ann. d. Physik, 44, 117(1987)

[173] H. Kleinert Smectic-nematic phase transition as wrinkling transition in a stack of membranes Phys. Lett. A. 264, 440 (2000), (cond-mat/9912023)

[174] H. Kleinert Lattice Defect Model with Two Successive Melting Transitions Phys. Lett. A 130, 443(1988)

[175] H. Kleinert Tangential Flow in Fluid Membranes - Absence of Renormalization Effects J. Stat. Phys. 56, 227 (1989)

[176] H. Kleinert Fundamental Phase Space Identities for Gauge Fields in Superfluids and Solids Phys. Lett. A 130, 59(1988)

[177] H. Kleinert Dynamical Generation of String Tension and Stiffness Phys. Lett. B 211, 151(1988)

[178] H. Kleinert Solution of Dyson Equation For Elastic Membranes J. Math. Phys. 30, 2991 (1989)

[179] W. Janke and H. Kleinert From First-Order to Two Continuous Melting Transitions - Monte Carlo Study of New 2D Lattice Defect Model Phys. Rev. Lett. 61(20), 2344(1988)

[180] G. German and H. Kleinert Perturbative Two-loop Quark Potential of Spontaneous Strings in any Dimension d Phys. Rev. D 40, 1108 (1989)

[180a] G. German and H. Kleinert Quark Potential of Spontaneous Strings, Proceedings of the 1988 Eger Workshop and Conference on Frontiers in Nonperturbative Field Theory.

[181] H. Kleinert Membrane Stiffness from v.d. Waals forces Phys. Lett. A 136, 253(1989)

[182] H. Kleinert Effect of Nonlinear Curvature Stiffness upon Fluctuation Pressure between Membranes FU-Berlin preprint 1988.

[183] H. Kleinert Test of New Melting Criterion - Angular Stiffness and Order of 2D Melting in Lennard-Jones and Wigner Lattices, Phys. Lett. A 136, 468(1989)

[184] W. Janke, H. Kleinert, M. Meinhart Monte Carlo Study of Stack of Self-Avoiding Surfaces with Extrinsic Curvature Stiffness, Phys. Lett. B 217, 525(1989)

[185] G. German and H. Kleinert Comment on ``Effective string tension in the finite-temperature smooth-string mode'' Phys. Rev. D 40, 4199 (1989)

[186] W. Janke and H. Kleinert Finite-Size Scaling Study of the Laplacian Roughening Model, Phys. Lett. A 140, 513 (1989)

[187] H. Kleinert Exact Interaction Energies of Vortices and Disclinations on Triangular Lattice and their Asymptotic Limits Phys. Lett. A 134, 217(1989)

[188] H. Kleinert Exact Temperature Behaviour of Strings with Extrinsic Curvature Stiffness for d ->Infinity. Thermal Deconfinement Transition Phys. Rev. D 40, 473(1989)

[189] W. Janke and H. Kleinert Monte Carlo Study of Two-Step Defect Melting Phys. Rev. B 41, 6848 (1990) (PRB)

[190] G. German and H. Kleinert Two-Loop String Tension of Spontaneous Strings at Finite Temperature in any Dimension Phys. Lett. B 220, 133(1989)

[191] H. Kleinert Relation between Fluctuation Pressure and X-ray Structure of Stack of Membranes Phys. Lett. A 138, 201(1989)

[192] H. Kleinert and F. Langhammer, Lattice Model for the Tricritical Point of the Nematic-Smectic-A Phase Transition Phys. Rev. A 40, 5988 (1989)

[193] H. Kleinert Model for Condensation of Lamellar Phase from Microemulsion Phys. Lett. A 137, 65(1989)

[194] W. Janke and H. Kleinert
Geometrical Origin of Tricritical Points of various U(1) Lattice Models in Proceedings of the Workshop and Conference on ``Frontiers in Non-perturbative Field Theory'' in Eger/Hungary (1988), World Scientific, 1989, p. 279 ( hep-lat/9504010)

[195] H. Kleinert Path Collapse in Feynman Formula - Stable Path Integral Formula from Local Reparametrization Invariant Amplitude Phys. Lett. B 224, 313 (1989)

[196] W. Janke and H. Kleinert
Path Integrals of Fluctuating Surfaces with Curvature Stiffness in Proc. ``Path Integrals from meV to MeV'', Bangkok, Jan. 1989.

[197] H. Kleinert, Path Integral over Fluctuating Non-relativistic Fermion Orbits Phys. Lett. B 225, (4) (1989)

[198] G. German and H. Kleinert Stiffness Dependence of the Deconfinement Transition for Strings with Extrinsic Curvature Term Phys. Lett. B 225, 107(1989)

[199] H. Kleinert Quantum Mechanics and Path Integrals in Spaces with Curvature and Torsion Mod. Phys. Lett. A 4, 2329 (1989)

[200] M. Kiometzis and H. Kleinert Electrostatic Stiffness Properties of Charged Bilayers Phys. Lett. A 140, 520 (1989)

[201] W. Janke and H. Kleinert Large-Order Perturbation Expansion of Three-Dimensional Coulomb Systems from Four-Dimensional Anharmonic Oscillators Phys. Rev. A 42, 2792 (1990) ( PRA ONLINE)

[202] H. Kleinert Path Integral on Spherical Surfaces in D Dimensions and on Group Spaces with Charges and Dirac Monopoles, Phys. Lett. B 236, 315 (1990)

[203] H. Kleinert The Extra Gauge Symmetry of String Deformations in Electromagnetism with Charges and Dirac Monopoles Int. J. Mod. Phys. A 7, 4693 (1992)

[204] H. Kleinert and T. Sauer, Exact Semiclassical Resistance of Thin Superconducting Wire J. of Low Temp. Physics 81, 123 (1990)

[205] H. Kleinert Double-Gauge Invariance and Local Quantum Field Theory of Charges and Dirac Magnetic Monopoles Phys. Lett. B 246, 127 (1990)

[206] H. Kleinert and F. Langhammer Lattice Model for Layered Structures Phys. Rev. A 44, 6686 (1991)

[207] H. Kleinert and I. Mustapic Calculation of Pöschl-Teller and Rosen-Morse Fixed-Energy Amplitudes in Closed Form J. Math. Phys. 33, 643 (1992)

[208] H. Kleinert, J. Neu, V. Schulte-Frohlinde, K.G. Chetyrkin, and S.A. Larin, Five-Loop Renormalization Group Functions of O(n)-symmetric varphi ^4-Theory and varepsilon -Expansions of Critical Exponents up to varepsilon ^5 Phys. Lett. B 272, 39 (1991) (hep-th/9503230) , (printing error) Phys. Lett. B 319, 545 (1993)

[209] G. German, H. Kleinert, and M. Lynker, Temperature Behaviour and Thermal Deconfinement for the Nambu-Goto String Phys. Rev. D 46, 1699 (1992) ( PRD ONLINE)

[210] H. Kleinert Improving the Variational Approach to Path Integrals Phys. Lett. B 280, 251 (1992)

[211] H. Kleinert Abelian Double-Gauge Invariant Continuous Quantum Field Theory of Electric Charge Confinement Phys. Lett. B 293, 168 (1992)

[212] H. Kleinert Quantum Equivalence Principle for Path Integrals in Spaces with Curvature and Torsion in Proceedings of the XXV International Symposium Ahrenshoop on ``Theory of Elementary Particles'' in Gosen/Germany 1991, ed. by H. J. Kaiser ( quant-ph/9511020 ),

[213] H. Kleinert Systematic Corrections to Variational Calculation of Effective Classical Potential Phys. Lett. A 173, 332 (1993)

[214] H. Kleinert Variational Approach to Tunneling. Beyond the Semiclassical Approximation of Langer and Lipatov Phys. Lett. B 300, 261 (1993)

[215] H. Kleinert, A.M.J. Schakel One-loop critical exponents for Ginzburg-Landau theory with Chern-Simons term FU-Berlin preprint 1993

[216] H. Kleinert
Tunneling Beyond the Semiclassical Approximation Lecture Presented at the International Conference on Path Integrals in Physics, Bangkok, January 1993. Proceedings ed. by Virulh Sa-yakanit et al., World Scientific, 1994.

[217] J. Jaenicke and H. Kleinert Loop Corrections to the Effective Classical Potential Phys. Lett. A 176, 409 (1993)

[218] H. Kleinert and A. Zhuk Finite Size and Temperature Properties of Matter and Radiation Fluctuations in Closed Friedmann Universe Teor. Math. Phys. 108, 1236 (1996).

[219] P. Fiziev and H. Kleinert New Action Principle for Classical Particle Trajectories In Spaces with Torsion Europhys. Lett. 35, 241 (1996) ( hep-th/9503074 )

[220] H. Kleinert and H. Meyer Variational Calculation of Effective Classical Potential at T neq 0 to Higher Orders Phys. Lett. A 184, 319 (1994) (hep-th/95040788)

[221] R. Karrlein and H. Kleinert Precise Variational Tunneling Rates for Anharmonic Oscillator with g <0 Phys. Lett. A 187, 133 (1994) ( hep-th/9504048 )

[222] H. Kleinert Group Theory and Orbital Fluctuations of the Hydrogen Atom Found. of Physics 23(5) (1993)

[223] H. Kleinert Higher-Order Variational Approach to Non-Borel Systems. The Energies of the Double-Well Potential. Phys. Lett. A 190, 131 (1994)

[224] P. Fiziev and H. Kleinert
Euler Equations for Rigid Body -- A Case for Autoparallel Trajectories in Spaces with Torsion FU-Berlin preprint 1994 ( hep-th/9503075 )

[225] H. Kleinert and V. Schulte-Frohlinde Exact Five-Loop Renormalization Group Functions of phi^4 -Theory with O(N)-Symmetric and Cubic Interactions. Critical Exponents up to epsilon ^5 Phys. Lett. B 342, 284 (1995) ( cond-mat/9503038) ( PLB ONLINE)

[226] M. Kiometzis, H. Kleinert, A. Schakel Critical Exponents of the Superconducting Phase Transition Phys. Rev. Lett. 73, 1975 (1994) ( cond-mat/9503019 ) ( PRL ONLINE)

[227] H. Kleinert
Theory of Fluctuating Nonholonomic Fields and Applications: Statistical Mechanics of Vortices and Defects and New Physical Laws in Spaces with Curvature and Torsion in: Proceedings of a NATO Advanced Study Institute on Formation and Interactions of Topological Defects at the University of Cambridge, England, in Formation and Interactions of Topological Defects (NATO Asi Series B, Physics, Vol 349) Anne-Christine Davis and R. Brandenberger (eds.) Plenum Press, New York, 1995, p. 201 ( cond-mat/9503030 )

[228] W. Janke and H. Kleinert Convergent Strong-Coupling Expansions from Divergent Weak-Coupling Perturbation Theory Phys. Rev. Lett. 75, 2787 (1995) ( quant-ph/9502019 ) ( PRL ONLINE)

[229] W. Janke and H. Kleinert Scaling property of variational perturbation expansion for general anharmonic oscillator with x^p-potential Phys. Lett. A 199, 287 (1995) ( quant-ph/9502018) ( PLA ONLINE)

[230] H. Kleinert and S.V. Shabanov, Quantum Langevin equation from forward-backward path integral Phys. Lett. A 200, 224 (1995) ( quant-ph/9503004 ) ( PLA ONLINE)

[231] H. Kleinert and I. Mustapic, Decay Rates of Metastable States in Cubic Potential by Variational Perturbation Theory Int. J. Mod. Phys. A 11,4383 (1996) ( quant-ph/9502027 )

[232] M. Kiometzis, H. Kleinert, A. Schakel Dual description of the superconducting phase transition Fortschr. Phys. 43, 697 (1995) (cond-mat/9508142 )

[233] H. Kleinert Path integral for a relativistic spinless Coulomb system Phys. Lett. A 212, 15 (1996) ( hep-th/9504024) ( PLA ONLINE)

[234] H. Kleinert and S.V. Shabanov, Theory of Brownian motion of a massive particle in spaces with curvature and torsion J. Phys. A: Math. Gen. 31, 7005 (1998) ( cond-mat/9504121 ) ( JPA ONLINE)

[235] H. Kleinert and W. Janke, Convergence behavior of variational perturbation expansion--- A method for locating Bender-Wu singularites Phys. Lett. A 206, 283 (1995) (quant-ph/9509005) ( PLA ONLINE)

[236] H. Kleinert Variational Interpolation Algorithm between Weak- and Strong-Coupling Expansions---Application to Polaron Phys. Lett. A 207, 133 (1995) ( quant-ph/9507005 ) ( PLA ONLINE)

[237] H. Kleinert Variational Resummation of Divergent Series with known Large-Order Behavior Phys. Lett. B 360, 65 (1995) ( quant-ph/9507009 ) ( PLB ONLINE)

[238] H. Kleinert and S. Thoms Large-Order Behavior of Two-coupling Constant phi4\phi^4phi4-Theory with Cubic Anisotropy Phys. Rev. D 52, 5926 (1995) (hep-th/9508172) ( PRD ONLINE)

[239] H. Kleinert Nonabelian Bosonization as a Nonholonomic Transformations from Flat to Curved Field Space Ann. Phys. 253, 121 (1997) (hep-th/9606065) (AP ONLINE))

[240] H. Kleinert, G. Lambiase, and V.V. Nesterenko Nambu-Goto String without Tachyons Between a Heavy and a Light Quark - Real Interquark Potential at all Distances Phys. Lett. B. 384,213 (1996) (hep-th/9601019) ( PLB ONLINE)

[241] H. Kleinert and A. Chervyakov Evidence for Negative Stiffness of QCD Strings Phys. Lett. B 381, 286 (1996) (hep-th/9601030) ( PLB ONLINE)

[242] P. Fiziev and H. Kleinert Comment on Path Integral Derivation of Schrödinger Equation in Spaces with Curvature and Torsion J. Phys. A.: Math. Gen. 29, 7619 (1996) (hep-th/9604172 ) ( JPA ONLINE)

[243] H. Kleinert and A. Pelster, Autoparallels From a New Action Principle Gen. Rel. Grav. 31, 1439 (1999) (gr-qc/9605028)

[244] P. Fiziev and H. Kleinert, Anholonomic Transformations of Mechanical Action Principle Proceedings of the Workshop on the Variational and Local Methods in the Study of Hamiltonian Systems, editors A.Ambrosetti and G.F.Dell'Antonio, World Scientific, 1995, pp.166-177 (gr-qc/9605046)

[245] H. Kleinert, S. Thoms, and W. Janke Resummation of anisotropic quartic oscillator. Crossover from anisotropic to isotropic large-order behavior Phys. Rev. A 55, 915 (1997) (quant-ph/9605033) ( PRA ONLINE)

[246] H. Kleinert Classical and Fluctuating Paths in Spaces with Curvature and Torsion FU-Berlin preprint 1996 (quant-ph/9606001)

[247] H. Kleinert and A.M.J. Schakel New Universality Class in Superconductive Phase Transition FU-Berlin preprint 1996 (supr-con/9606001)

[248] A. Pelster and H. Kleinert Transformation Properties of Classical and Quantum Laws under Some Nonholonomic Spacetime Transformations Proceedings of the 5th International Conference on Path Integrals from meV to MeV, Dubna, Russia, May 27 -- 31, 1996}; Edited by V.S. Yarunin, M.A. Smondyrev, Publishing Department Joint Institute for Nuclear Research Dubna, 187--191 (1996) FU-Berlin preprint 1996 (quant-ph/9608037)

[249] A. Pelster and H. Kleinert Relations Between Markov Processes Via Local Time and Coordinate Transformations Phys. Rev. Lett. 78, 565-569 (1997) (cond-mat/9608120) ( PRL ONLINE)

[250] H. Kleinert, S. Thoms, and V. Schulte-Frohlinde Stability of 3D Cubic Fixed Point in Two-Coupling-Constant phi4\phi^4phi4-Theory Phys. Rev. B 56, 14428 (1997) (quant-ph/9611050) ( PRB ONLINE)

[251] H. Kleinert and A. Zhuk Casimir effect at nonzero temperature in closed Friedmann universe Theor. Math. Phys. 109 N2, 307 (1996)

[252] H. Kleinert Quantum Equivalence Principle Lectures presented at the 1996 Cargese Summer School FUNCTIONAL INTEGRATION: BASICS AND APPLICATIONS Berlin preprint 1996 (quant-ph/9612040)

[253] H. Kleinert and S. Shabanov Proper Dirac Quantization of Free Particle on DDD-Dimensional Sphere Phys. Lett. A 232, 327 (1996) (quant-ph/9702006) ( PLA ONLINE)

[254] H. Kleinert and A. Schakel Comment on "Continuum dual theory of the transition in 3D lattice superconductor" Berlin preprint 1997 (cond-mat/9702159)

[255] H. Kleinert Systematic Improvement of Hartree-Fock-Bogoljubov Approximation with Exponentially Fast Convergence from Variational Perturbation Theory Annals of Physics 266, 135 (1998) (APS E-Print aps1997may22_001 ) ( AP ONLINE)

[256] H. Kleinert and S. Shabanov Supersymmetry in Stochastic Processes with Higher-Order Time Derivatives Phys. Lett. A 235, 105 (1997) (quant-ph/9705042) ( PLA ONLINE)

[257] H. Kleinert Strong-Coupling Behavior of Phi^4-Theories and Critical Exponents Phys. Rev. D 57, 2264 (1998) (cond-mat/9801167) Addendum: Phys. Rev. D 58, 107702 (1998) (cond-mat/9803268)

[258] H. Kleinert Nonholonomic Mapping Principle for Classical and Quantum Mechanics in Spaces with Curvature and Torsion Gen. Rel. Grav. 32 , 769 (2000) (gr-qc/0203029) ( GRG ONLINE)

[259] H. Kleinert and S.V. Shabanov Spaces with Torsion from Embedding, and the Special Role of Autoparallel Trajectories Phys. Lett B 428, 315 (1998) ( gr-qc/9709067 ) (PLB ONLINE)

[260] H. Kleinert and A. Chervyakov Functional determinants via Wronski construction of Green functions J. Math. Phys. 40, 6044 (1999) (physics/9712048)

[261] H. Kleinert Nonholonomic Mapping Principle for Classical Mechanics in Spaces with Curvature and Torsion. New Covariant Conservation Law Lectures presented at Workshop Gauge Theories of Gravitation, Jadwisin, Poland, 4-10 September 1997 Short version of Paper 258. Act. Phys. Pol. B 29, 1033 (1998) (gr-qc/9801003)

[262] H. Kleinert and A. Pelster Novel Geometric Gauge Invariance of Autoparallels Lectures presented at Workshop Gauge Theories of Gravitation, Jadwisin, Poland, 4-10 September 1997 Act. Phys. Pol. B 29 , 1015 (1998) (gr-qc/9801030)

[263] H. Kleinert Strong-Coupling phi4\phi^4phi4-Theory in 4−epsilon4- \epsilon4−epsilon Dimensions, and Critical Exponent Phys. Lett. B 434, 74 (1998) (cond-mat/9801167) (PLB ONLINE)

[264] H. Kleinert and A. Chervyakov Simple Explicit Formulas for Gaussian Path Integrals with Time-Dependent Frequencies Phys. Lett. A 245, 345 (1998) (quant-ph/9803016) ( PLA ONLINE)

[265] E. Babaev and H. Kleinert Crossover from Weak- to Strong-Coupling Superconductivity and to Normal State with Pseudogap (Berlin preprint 1998) (cond-mat/9804206)

[266] H. Kleinert Spiky Phases of Smooth Membranes. Implications for Smooth Strings Eur. Phys. J. B 9, 651 (1999) (cond-mat/9805307) ( EPJB ONLINE)

[267] Hagen Kleinert, Werner Kuerzinger, and Axel Pelster Smearing Formula for Higher-Order Effective Classical Potentials J. Phys. A: Math. Gen. 31, 8307 (1998) (quant-ph/9806016) (JPA ONLINE) Short version presented as a lecture at the 1998 Conference on Path Integrals in Florence, Italy

[268] M. C. Diamantini, H. Kleinert, C. A. Trugenberger Smoothening Transition of Rough Surfactant Surfaces FU-Berlin preprint 1998 (cond-mat/9806077)

[269] H. Kleinert and E. Babaev Two Phase Transitions in Chiral Gross-Neveu Model in 2+ eps Dimensions at Low NNN Phys. Lett. B 438, 311 (1998) (hep-th/9809112) (PLB ONLINE)

[270] M. E. S. Borelli, H. Kleinert, and Adriaan M. J. Schakel Derivative Expansion of One-Loop Effective Energy of Stiff Membranes with Tension Phys. Lett. A 253, 239 (1999) (cond-mat/9806184) ( PLA ONLINE)

[271] H. Kleinert Universality Principle for Orbital Angular Momentum and Spin in Gravity with Torsion Gen. Rel. Grav. 32, 1271 (2000) (gr-qc/9807021) ( GRG ONLINE)

[272] H. Kleinert and D.H. Lin Relativistic Trace Formula for Bound States in Terms of Classical Periodic Orbits FU-Berlin preprint 1998 (quant-ph/9807068)

[273] H. Kleinert Solution of Coulomb Path Integral in Momentum Space Phys. Lett. A 252, 277 (1999) (quant-ph/9807073) ( PLA ONLINE)

[274] H. Kleinert Spontaneous Generation of Torsion Coupling of Electroweak Massive Gauge Bosons Phys. Lett. B 440, 283 (1998) (gr-qc/9808022) (PLB ONLINE)

[275] H. Kleinert Variational Resummation of $ \epsilon −ExpansionsofCriticalExponentsofNonlinearO(-Expansions of Critical Exponents of Nonlinear O(−ExpansionsofCriticalExponentsofNonlinearO(N$)-Symmetric $ \sigma −Modelin-Model in −Modelin2+ \epsilon $ Dimensions Phys. Lett A 264 , 357 (2000) (hep-th/9808145) ( PLA ONLINE)

[276] M. C. Diamantini, H. Kleinert, C. A. Trugenberger Strings with Negative Stiffness and Hyperfine Structure FU-Berlin preprint 1998 (hep-th/9810171)

[277] H. Kleinert Fluctuation Pressure of Membrane between Walls Phys. Lett. A 257, 269 (1999) (cond-mat/9811308) ( PLA ONLINE)

[278] H. Kleinert Vortex Line Nucleation of First-Order Phase Transitions in Early Universe Phys. Lett B 460, 36 (1999) (hep-th/9811185) (PLB ONLINE)

[279] H. Kleinert Critical Exponents from Seven-Loop Strong-Coupling phi4\phi^4phi4-Theory in Three Dimensions Phys. Rev. D 60, 085001 (1999) (hep-th/9812197) (PRD ONLINE)

[280] Michael Bachmann, H. Kleinert, and Axel Pelster Variational Perturbation Theory for Density Matrices Phys. Rev. A 60, 3429 (1999) (quant-ph/9812063) (PRA ONLINE) Short version presented as a lecture at the 1998 Conference on Path Integrals in Florence, Italy

[281] Hagen Kleinert, Axel Pelster, and Michael Bachmann Generating Functionals for Harmonic Expectation Values of Paths with Fixed End Points. Feynman Diagrams for Nonpolynomial Interactions Physical Review E 60, 2510 (1999) (quant-ph/9902051) (PRE ONLINE)

[282] M. C. Diamantini, H. Kleinert, C. A. Trugenberger Floppy Membranes Phys. Lett. A 269, 1 (2000) (cond-mat/9903021) ( PLA ONLINE)

[283] M. C. Diamantini, H. Kleinert, C. A. Trugenberger Universality Class of Confining Strings Phys. Lett. B 457, 87 (1999) (hep-th/9903208) (PLB ONLINE)

[284] M. E. S. Borelli, H. Kleinert, A. M. J. Schakel Quantum Statistical Mechanics of Nonrelativistic Membranes: Crumpling Transition at Finite Temperature Phys. Lett. A 267, 201 (2000) (cond-mat/9905241) ( PLA ONLINE)

[285] M. Bachmann, H. Kleinert, A. Pelster Strong-Coupling Calculation of Fluctuation Pressure of Membrane Between Walls Phys. Lett. A 261, 127 (1999) (cond-mat/9905397) (PLA ONLINE)

[286] Hagen Kleinert Theory and Satellite Experiment for Critical Exponent alpha of lambda-Transitiion in Superfluid Helium Phys. Lett. A 277, 205 (2000) (cond-mat/9906107) ( PLA ONLINE)

[287] Florian Jasch, Hagen Kleinert Fast-Convergent Resummation Algorithm and Critical Exponents of phi4\phi^4phi4-Theory in Three Dimensions J. Math. Phys. 42, 52 (2001) (cond-mat/9906246)

[288] H. Kleinert, A. Chervyakov, B. Hamprecht Perturbation Theory for Particle in a Box Phys. Lett. A 260, 182 (1999) (cond-mat/9906241) ( PLA ONLINE)

[289] H. Kleinert, A. Chervyakov Reparametrization Invariance of Path Integrals Phys. Lett. B 464, 257 (1999) (hep-th/9906156) (PLB ONLINE)

[290] H. Kleinert Critical Exponents without beta-Function Phys. Lett. B 463, 69 (1999) (cond-mat/9906359) (PLB ONLINE)

[291] H. Kleinert, B. Van den Bossche No Spontaneous Breakdown of Chiral Symmetry in Nambu-Jona-Lasinio Model Phys. Lett. B 474 , 336 (2000) (hep-ph/9907274) (PLB ONLINE)

[292] M. Bachmann, H. Kleinert, A. Pelster Recursive Graphical Construction of Feynman Diagrams in Quantum Electrodynamics Phys. Rev. D 61, 085017 (2000) (hep-th/9907044) ( PRD ONLINE)

[293] E. Babaev, H. Kleinert Nonperturbative XYXYXY-Model Approach to Strong-Coupling Superconductivity in Two and Three Dimensions Phys. Rev. B 59, 12083 (1999) (cond-mat/9907138) ( PRB ONLINE)

[294] H. Kleinert, A. Pelster, B. Kastening, M. Bachmann Recursive Graphical Construction of Feynman Diagrams and Their Multiplicities in phi^4- and in phi^2 A-Theory Phys. Rev. E 62, 1537 (2000) (hep-th/9907168) ( PRE ONLINE) Program and its Output for Diagrams

[295] H. Kleinert, V. Schulte-Frohlinde Critical Exponents from Five-Loop Strong-Coupling phi^4-Theory in 4- epsilon Dimensions J. Phys. A 34 1037 (2001) (cond-mat/9907214) ( JPA ONLINE)

[296] H. Kleinert, B. Van den Bossche No Massless Pions in Nambu-Jona-Lasinio Model due to Chiral Fluctuations Berlin Preprint 1999 (hep-ph/9908284)

[297] H. Kleinert Perturbative Calculation of Multi-Loop Feynman Diagrams. New Type of Expansions for Critical Exponents Phys. Lett. B 465, 235 (1999) (hep-th/9908078) (PLB ONLINE)

[298] H. Kleinert Criterion for Dominance of Directional over Size Fluctuations in Destroying Order Phys. Rev. Lett. 84, 286 (2000) (cond-mat/9908239) (PRL ONLINE)

[299] B. Kastening, H. Kleinert Efficient Algorithm for Perturbative Calculation of Multiloop Feynman Integrals Phys. Lett. A 269, 50 (2000) (quant-ph/9909017) ( PLA ONLINE)

[300] H. Kleinert and A. Chervyakov Reparametrization Invariance of Perturbatively Defined Path Integrals. II. Integrating Products of Distributions Phys. Lett. B 477, 373 (2000) (quant-ph/9912056) (PLB ONLINE)

[301] H. Kleinert, B. Van den Bossche Global Derivation of the Fluctuation Determinant from Group Property of Time Evolution. FU-Berlin preprint 2000 (quant-ph/0002008)

[302] F. Ferrari, H. Kleinert, I. Lazzizzera Second Topological Moment < m^2 > of Two Closed Entangled Polymers Phys. Lett. A 276, 1 (2000) (cond-mat/0002049) (PLA ONLINE)

[303] H. Kleinert, A. Chervyakov Rules for Integrals over Products of Distributions from Coordinate Independence of Path Integrals Eur. Phys. J. C 19, 743-747 (2001) (quant-ph/0002067) ( EPJC ONLINE)

[304] M. E. S. Borelli, H. Kleinert Phases of a stack of membranes in a large number of dimensions of configuration space Phys. Rev. B 63, 205414 (2001) (cond-mat/0003362) ( PRB ONLINE)

[305] H. Kleinert, A. Chervyakov Coordinate Independence of Quantum-Mechanical Path Integrals Phys. Lett. A 269, 63 (2000) (second print because of errors caused by publisher in Phys. Lett. A 273, 1 (2000) (quant-ph/0003095) (PLA ONLINE)

[306] F. Ferrari, H. Kleinert, I. Lazzizzera Calculation of Second Topological Moment < m^2 > of Two Entangled Polymers Eur. Phys. J B 18, 645 (2000) (cond-mat/0003355) (EPJB ONLINE)

[307] M. Bachmann, H. Kleinert, and A. Pelster Variational Approach to Hydrogen Atom in Uniform Magnetic Field of Arbitrary Strength Phys. Rev. A 62, 52509 (2000) (quant-ph/0005074) (PRA ONLINE)

[308] F. Ferrari, H. Kleinert, I. Lazzizzera Field Theory of N Entangled Polymers Int. J. Mod. Phys. B 14, 3881 (2000) (cond-mat/0005300)

[309] M. Bachmann, H. Kleinert, A. Pelster Quantum Statistics of Hydrogen in Strong Magnetic Fields Phys. Lett. A 279, 23 (2001) (quant-ph/0005100) (PLA ONLINE)

[310] A. Pelster and H. Kleinert Functional Differential Equations for the Free Energy and the Effective Energy in the Broken-Symmetry Phase of phi^4-Theory and Their Recursive Graphical Solution Physica A 323, 370-400 (2003) (hep-th/0006153) (Physica A ONLINE)

[311] H. Kleinert and H.-J. Schmidt Cosmology with Curvature-Saturated Gravitational Lagrangian R/\sqrt{1 + l^4 R^2} Gen. Rel. Grav. 34, 1295 (2002) (gr-qc/0006074) (GRG ONLINE)

[312] M.E.S. Borelli, H. Kleinert, A.M.J. Schakel Vertical Melting of a Stack of Membranes Eur. Phys. J. E 4, 217 (2001) (cond-mat/0004432) (EPJB ONLINE)

[313] H. Kleinert and A. Chervyakov Covariant Effective Action for Quantum Particle with Coordinate-Dependent Mass Phys. Lett. A 299, 319 (2002) (quant-ph/0206022)

[314] H. Kleinert Fokker-Planck and Langevin Equations from the Forward--Backward Path Integral Ann. Phys. 291, 14 (2001) (quant-ph/0008109) (AP ONLINE)

[315] F. S. Nogueira and H. Kleinert Field Theoretical Approaches to the Superconducting Phase Transition in Order, Disorder, and Criticality - Advanced Problems of Phase Transition Theory, Yurij Holovatch ed., (World Scientific, Singapore, 2004), pp. 253-283. (cond-mat/0303485)

[316] Z. Haba and H. Kleinert Master Equation for Electromagnetic Dissipation and Decoherence of Density Matrices Eur. Phys. J. B 21, 553 (2001) (cond-mat/0011486) (EPJB ONLINE)

[317] M. Bachmann, H. Kleinert, and A. Pelster Fluctuation Pressure of a Stack of Membranes Phys. Rev. E 63, 51709 (2001) (cond-mat/0011281) ( PRE ONLINE)

[318] H. Kleinert, B. Van den Bossche Three-Loop Critical Amplitude Functions and Ratios from Variational Perturbation Theory Phys. Rev. E 63, 056113 (2001) (cond-mat/0011329 ) ( PRE ONLINE)

[319] Z. Haba and H. Kleinert Quantum-Liouville and Langevin Equations for Gravitational Radiation Damping Int. J. Mod. Phys. A 17 3729 (2002) (quant-ph/0101006)

[320] H. Kleinert Five-Loop Critical Temperature Shift in Weakly Interacting Homogeneous Bose-Einstein Condensate Mod. Phys. Lett. B 17, 1011 (2003) (cond-mat/0210162)

[321] H. Kleinert and B. Van den Bossche Two-Loop Effective Potential of O(N)-Symmetric Scalar QED in 4-epsilon Dimensions Nucl. Phys. B 632, 51 (2002) (cond-mat/0104102 )

[322] H. Kleinert and F.S. Nogueira Charged fixed point in the Ginzburg-Landau superconductor and the role of the Ginzburg parameter kappa\kappakappa Nucl. Phys. B 651, 361 (2003) (cond-mat/0104573 )

[323] Z. Haba and H. Kleinert Langevin Equation for Particle in Thermal Photon Bath FU-Berlin preprint 2001 (quant-ph/0106096)

[324] Z. Haba and H. Kleinert Schrödinger Wave Functions from Classical Trajectories Phys. Lett. A 294, 139 (2002) (quant-ph/0106095)

[325] H. Kleinert, A. Pelster, and B. Van den Bossche Recursive Graphical Construction of Feynman Diagrams and Their Weights in Ginzburg-Landau Theory Physica A 312 , 141 (2002) (hep-th/0107017)

[326] A. Pelster, H. Kleinert, and M. Schanz High-Order Variational Calculation for the Frequency of Time-Periodic Solutions Phys. Rev. E 67, 016604 (2003) (math-ph/0208032) ( PRE ONLINE)

[327] A. Pelster, H. Kleinert, and M. Bachmann Functional Closure of Schwinger-Dyson Equations in Quantum Electrodynamics, Part 1: Generation of Connected and One-Particle Irreducible Feynman Diagram Annals of Physics 297, 363 (2002) (hep-th/0109014) ( AP ONLINE)

[328] B. Kastening, H. Kleinert, and B. Van den Bossche Three-Loop Ground-State Energy of O(N)-Symmetric Ginzburg-Landau Theory above T_c in 4-epsilon Dimensions with Minimal Subtraction Phys. Rev. B 65, 174512 (2002) (cond-mat/0109372) ( PRB ONLINE)

[329] H. Kleinert Stochastic Calculus for Assets with Non-Gaussian Price Fluctuations Physica A 311, 536 (2002) (cond-mat/0203157)

[330] H. Kleinert and A. Chervyakov Integrals over Products of Distributions from Perturbation Expansions of Path Integrals in Curved Spaces Int. J. Mod. Phys. A 17, 2019 (2002) (quant-ph/0208067)

[331] V. Folomeev, V. Gurovich, H. Kleinert and H.-J. Schmidt Flashing Dark Matter -- Gamma-Ray Bursts from Relativistic Detonations of Electro-Dilaton Stars Grav.Cosmol. 8, 299-304 (2002) (gr-qc/0206043)

[332] H. Kleinert and F. Nogueira Two different scaling regimes in Ginzburg-Landau model with Chern-Simons term J. Phys. Stud. 5, 327 (2001) (cond-mat/0109539)

[333] H. Kleinert Option Pricing from Path Integral for Non-Gaussian Fluctuations. Natural Martingale and Application to Truncated Lévy Distributions Physica A 312, 217 (2002) (cond-mat/0202311)

[334] H. Kleinert, A. Pelster, and M.V. Putz Variational Perturbation Theory for Markov Processes Phys. Rev. E 65, 066128 (2002) (cond-mat/0202378)

[335] H. Kleinert and A. Chervyakov Integrals over Products of Distributions and Coordinate Independence of Zero-Temperature Path Integrals Phys. Lett. A 308, 85 (2003) (quant-ph/0204067)

[336] H. Kleinert, F.S. Nogueira, and A. Sudbo Deconfinement transition in three-dimensional compact U(1) gauge theories coupled to matter fields Phys. Rev. Lett. 88, 232001 (2002) (hep-th/0201168) ( PRL ONLINE)

[337] H. Kleinert and F.S. Nogueira Critical behavior of Ginzburg-Landau model coupled to massless Dirac fermions Phys. Rev. B 66, 012504 (2002) (cond-mat/0112030) ( PRB ONLINE)

[338] H. Kleinert and A. M. J. Schakel Gauge-invariant critical exponents for the Ginzburg-Landau model Phys. Rev. Lett. 90, 097001 (2003) (cond-mat/0209449) ( PRL ONLINE)

[339] H. Kleinert and A. Chervyakov Perturbatively Defined Effective Classical Potential in Curved Space Int. J. Mod. Phys. A 18 , 5521 (2003) (quant-ph/0301081)

[340] H. Kleinert and Y. Jiang Defect Melting Models for Cubic Lattices and Universal Laws for Melting Temperatures Phys. Lett. A 313, 152 (2003) (cond-mat/0301453)

[341] B. Hamprecht and H. Kleinert Dependence of Variational Perturbation Expansions on Strong-Coupling Behavior. Inapplicability of delta-Expansion to Field Theory Phys. Rev. D 68 065001 (2003) (hep-th/0302116) ( PRD ONLINE)

[342] B. Hamprecht and H. Kleinert Tunneling Amplitudes from Perturbation Expansions Phys. Lett. B 564 111 (2003) (hep-th/0302124)

[343] H. Kleinert, F. S. Nogueira and A. Sudbo Kosterlitz-Thouless-like deconfinement mechanism in the 2+1 dimensional Abelian Higgs model Nucl. Phys. B 666, 361 (2003) (hep-th/0209132) ( Nucl. Phys. B ONLINE)

[344] B. Hamprecht and H. Kleinert Variational Perturbation Theory for Summing Divergent Non-Borel-Summable Tunneling Amplitudes J. Phys. A: Math. Gen. 37, 8561-8574 (2004) (hep-th/0303163)

[345] B. Hamprecht and H. Kleinert End-To-End Distribution Function of Stiff Polymers for all Persistence Lengths Phys. Rev. E 71, 031803 (2005) (Berlin preprint 2004) (cond-mat/0305226)

[346] H. Kleinert and J. Zaanen Nematic World Crystal Model of Gravity Explaining Absence of Torsion in Spacetime Phys. Lett. A 324 , 361 (2004) (gr-qc/0307033) ( Phys. Lett. A ONLINE)

[347] H. Kleinert, S. Schmidt, and A. Pelster Reentrant Phenomenon in Phase Diagram of Mott Insulator Transition in Optical Boson Lattices at Nonzero T Phys. Rev. Lett. 93, 160402 (2004) (cond-mat/0307412 )

[348] B. Hamprecht, W. Janke, and H. Kleinert End-to-End Distribution Function of Two-Dimensional Stiff Polymers for all Persistence Lengths Phys. Lett. A 330, 254 (2004) (cond-mat/0307530)

[349] H. Kleinert and V.I. Yukalov Highly Accurate Critical Exponents from Self-Similar Variational Perturbation Theory Berlin preprint 2004, Phys. Rev. E 71, 026131 (2005) (cond-mat/0402163)

[350] S. F. Brandt, H. Kleinert, A. Pelster Recursive Calculation of Effective Potential and Variational Resummation J. Math. Phys. 46, 032101 (2005) (quant-ph/0406206)

[351] H. Kleinert Option pricing for non-Gaussian price fluctuations Lecture presented at the conference Frontier Science 2003 in Pavia Physica A 338, 151 (2004)

[352] O. Zobay, G. Metikas, H. Kleinert Nonperturbative Effects on TcT_cTc of Interacting Bose Gases in Power Traps Phys. Rev. A 71, 043614 (2005) (cond-mat/0411133)

[353] H. Kleinert Travailler avec Feynman Pour La Science 19, 89-95 (2004) (see also here)

[354] H. Kleinert Order of Superconductive Phase Transition Berlin Preprint 2005 publ. in Festschrift in honor of R. Folk's 60th birthday (2004).

[355] M. Blasone, P. Jizba, and H. Kleinert Path Integral Approach to 't Hooft's Derivation of Quantum from Classical Physics. Berlin Preprint (2004), Phys. Rev. A 71 052507 (2005) (quant-ph/0409021)

[356] H. Kleinert and A.J.M. Schakel Anomalous Dimension of Dirac's Gauge-Invariant Nonlocal Order Parameter in Ginzburg-Landau Field Theory Phys. Lett. B 611, 182 (2005)

[357] H. Kleinert, S. Schmidt, and A. Pelster Quantum Phase Diagram For Homogeneous Bose-Einstein Condensate Ann. Phys. 14 214 (2005) (cond-mat/0308561)

[358] H. Kleinert and A. Chervyakov Perturbation Theory for Path Integrals of Stiff Polymers J. Phys. A: Math. Gen. 39 8231 (2006) (cond-mat/0503100)

[359] H. Kleinert Emerging Gravity from Defects in World Crystal Lecture Presented at the 2004 Conference on Emerging Gravity in Piombino Berlin preprint (2005) (Brazilian Journal of Physics 35, (2005); pdf file)

[360] H. Kleinert Vortex Origin of Tricritical Point in Ginzburg-Landau Theory Europh. Letters 74, 889 (2006) (cond-mat/0509430)

[361] F.S. Nogueira and H. Kleinert Quantum Electrodynamics in 2+1 Dimensions, Confinement, and the Stability of U(1) Spin Liquids Phys. Rev. Lett. 95, 176406 (2005) (cond-mat/0501022) ( PRL ONLINE)

[362] M. Blasone, P. Jizba, and H. Kleinert Quantum Behavior of Deterministic Systems with Information Loss. Path Integral Approach Berlin Preprint (2005), Annals Phys. 320 468 (2005) (quant-ph/0504200)

[363] V.I. Yukalov and H. Kleinert Gapless Hartree-Fock-Bogoliubov Approximation for Bose Gas Berlin Preprint (2005). Phys. Rev. A 73, 063612 (2006) (cond-mat/0606484)

[364] F.S. Nogueira and H. Kleinert Thermally Induced Rotons in Two-Dimensional Dilute Bose Gases Phys. Rev. B 73, 104515 (2006) (cond-mat/0503523)

[365] H. Kleinert and X.J. Chen Boltzmann Distribution and Market Temperature Physica. A 383, 583 (2007) (physics/0609209)

[366] H. Kleinert Field Transformations and Multivalued Fields Berlin preprint 2006

[367] H. Kleinert Stiff Quantum Polymers Phys. Rev. B 76, 052202 (2007) (arXiv:cond-mat/0701030v3)

[368] F. Nogueira and H. Kleinert Compact quantum electrodynamics in 2+1 dimensions and spinon deconfinement: a renormalization group analysis Phys. Rev. B 77, 045107 (2008) (arXiv:0705.3541)

[369] J.W. Zhang, Y. Zhang, and H. Kleinert Power tails of Index Distributions in Chinese Stock Market Physica A 377, 166 (2007)

[370] K. Glaum, A. Pelster, H. Kleinert, and T. Pfau Critical Temperature of Weakly Interacting Dipolar Condensates; Physical Review Letters 98, 080407/1-4 (2007); (cond-mat/0606569);

[371] H. Kleinert and S.-S. Xue Photoproduction in Semiconductors by Onset of Magnetic Field Eur. Phys. Letters 81, 57001 (2008).

[372] H. Kleinert, R. Ruffini, and S.-S. Xue Electron-Positron Pair Production in Space- or Time-Dependent Electric Fields Phys. Rev. D 78, 025011 (2008)

[373] H. Kleinert, From Landau's Order Parameter to Modern Disorder Field Theory in L.D. Landau and his Impact on Contemporary Theoretical Physics, Horizons in World Physics 264 (2008), A. Sakaji and I. Licata (preprint).

[374] H. Kleinert and P. Kienle, Neutrino Mass Differences from Interfering Recoil Ions Lecture presented at the 3rd Stueckelberg Workshop on Relativistic Field Theories ICRANET Stueckelberg July 8-18, 2008 - ICRANet Center, Pescara (Italy), (ed.) EJTP 6, 107 (2009)

[375] A. Chervyakov and H. Kleinert, Exact Pair Production Rate for a Smooth Potential Step (preprint) Phys. Rev. D 80, 065010 (2009)

[376] P. Jizba, H. Kleinert, and P. Haener Perturbation Expansion for Option Pricing with Stochastic Volatility Physica A 388 (2009) 3503 (preprint)

[377] H. Kleinert, Equivalence Principle and Field Quantization in Curved Spacetime (arxiv:0910.4034) EJTP 6, 1 (2009)

[378] J. Dietel and H. Kleinert, Modeling two-dimensional crystals and nanotubes with defects under stress (arXiv:0812.0226) Phys. Rev. B 79, 245415 (2009)

[379] J. Dietel and H. Kleinert, Lindemann parameters for solid membranes focused on carbon nanotubes (arXiv:0806.1656) Phys. Rev. B 79, 075412 (2009)

[380] J. Dietel and H. Kleinert, Phase diagram of vortices in high-Tc superconductors with a melting line in the deep Hc2 region (arXiv:0807.2757) Phys. Rev. B 79, 014512 (2009)

[381] J. Dietel and H. Kleinert, Phase diagram of vortices in high-Tc superconductors from lattice defect model with pinning (arXiv:cond-mat/0612042) Phys. Rev. B 75, 144513 (2007) Erratum: Phys. Rev. B 78, 059901 (2008)

[382] J. Dietel and H. Kleinert, Defect-induced melting of vortices in high- Tc superconductors: A model based on continuum elasticity theory (arXiv:cond-mat/0511710) Phys. Rev. B 74, 024515 (2006)

[383] J. Dietel and H. Kleinert, Triangular lattice model of two-dimensional defect melting (arXiv:cond-mat/0508780) Phys. Rev. B 73, 024113 (2006)

[384] P. Jizba, H. Kleinert, and F. Scardigli Uncertainty Relation on World Crystal and its Applications to Micro Black Holes (arXiv:0912.2253) Phys. Rev. D 81, 084030 (2010)

[385] H. Kleinert New Gauge Symmetry in Gravity and the Evanescent Role of Torsion (arxiv/1005.1460) EJTP 24, 287 (2010)

[386] H. Kleinert The Invisibility of Torsion in Gravity Essay with Honorable Mention at the Gravity Research Foundation (2010)

[387] H. Kleinert Converting Divergent Weak-Coupling into Exponentially Fast Convergent Strong-Coupling Expansions (arXiv:1006.2910) preprint (2010). Lectures at the Centre International de Rencontres Mathematiques in Luminy 2010, publ. in EJTP 8, 15 (2011)

[388] Petr Jizba and Hagen Kleinert Superstatistics approach to path integral for a relativistic particle (arxiv/1007.1007.3922) Phys. Rev. D 82, 085016 (2010) (2010)

[389] J. Dietel and H. Kleinert, Optical phonon lineshapes and transport in metallic carbon nanotubes under high bias voltage (arxiv/1006.5872) Phys. Rev. B 82, 195437 (2010)

[390] A. Karamatskou and H. Kleinert Quantum Maupertuis Principle (quant-ph/0910.4034)

[391] H. Kleinert Hubbard-Stratonovich Transformation: Successes, Failure, and Cure (cond-mat/1104.5161), EJTP 8, 57 (2011) (arXiv:1104.5161).

[392] H. Kleinert Strong-Coupling Bose-Einstein Condensation (cond-mat/1105.5115)

[393] H. Kleinert Extending Bogoliubov's Boson Theory to Strong Couplings preprint 2011

[394] H. Kleinert Challenge to find Quasicrystals with Seven-Fold Symmetry EJTP 8, 169 (2012) preprint 2011

[395] H. Kleinert Is dark matter made entirely of the gravitational field? Phys. Scripta T151 14081 (2012) (gr-qc/1107.2610)

[396] H. Kleinert and A. Chervyakov On Electron-Positron Pair Production by a Spatially Nonuniform Electric Field (arXiv:1112.4120)

[397] H. Kleinert, P. Jizba, and M. Shefaat Renyi's information transfer between financial time series Physica A 391, 2971 (2012)

[398] H. Kleinert Quantum Field Theory of Particle Orbits with Large Fluctuations (preprint)

[399] H. Kleinert Fractional quantum field theory, path integral, and stochastic differential equation for strongly interacting many-particle systems EPL 100 10001 (2012)

[400] H. Kleinert Superpositions of probability distributions Phys. Rev. E 78, 031122 (2008)

[401] P. Jizba, H. Kleinert, and M. Shefaat Rényis information transfer between financial time series Physica A 391, 297 (2012)

[402] M. Fiolhais and H. Kleinert Higgs boson mass from tricritical point of the weak interactions Physics Letters A 377, 2195 (2013)

[403] H. Kleinert Effective Action and Field Equation for BEC from Weak to Strong Couplings J. Phys. B 46, 175401 (2013)

[404] H. Kleinert Conformal Gravity with Fluctuation-Induced Einstein Behavior at Long Distance (preprint)

[405] H. Kleinert Melting of Wigner-like Lattice of Parallel Polarized Dipoles of Parallel Polarized Dipoles EPL 102, 56002 (2013)

[406] H. Kleinert and V. Zatloukal Fractional Fokker-Planck Equations, Stochastic Differential Equations, and Path Integrals for Lévy Random Walks (preprint)

[407] H. Kleinert and Pisin Chen Bohm Trajectories as Approximations to Properly Fluctuating Quantum Trajectories EJTP 13, 1 (2016), (preprint)

[408] C. Gruber and H. Kleinert Observed Cosmological Reexpansion from Minimal QFT with Bose and Fermi Fields Astroparticle Physics 62, 72 (2015)

[409] H. Kleinert Quantum Field Theory of Black-Swan Events Found. Phys. 44, 546 (2014).

[410] H. Kleinert, Z. Narzikulov, and Abdulla Rakhimov Quantum phase transitions in optical lattices beyond the Bogoliubov approximation Phys. Rev. A 85, 063602 (2012)

[411] H. Kleinert, Z. Narzikulov, and Abdulla Rakhimov Phase transitions in three-dimensional bosonic systems in optical lattices J. Stat. Mechanics P01003 (2014)

[412] A. Karamatskou and H. Kleinert, Geometrization of the Schrödinger equation: Application of the Maupertuis Principle to quantum mechanics Int. J. Geom Methods 11, 145006 (2014)

[413] H. Kleinert, The purely Geometric Part of "Dark Matter"---A Fresh Playground for "String Thery" EJTP 8 27 (2011) (arxiv.org/pdf/1107.2610.pdf)

[414] H. Kleinert, The GIMP Nature of Dark Matter Berlin preprint (2016), EJTP 13 (2016) 1-12

[415] S.-S. Xue and H. Kleinert, Composite Fermions and their Pair States in a Strongly-Coupled Fermi Liquid Berlin preprint (2017) (longer version).

[416] S.-S. Xue and H. Kleinert, Photoproduction in semiconductors by onset of magnetic field EPL 81 (2008)

[417] S.-S. Xue and H. Kleinert, Critical fermion density for restoring spontaneously broken symmetry Mod. Phys. Lett. A 30, 1550122 (2015) (https://doi.org/10.1142/S0217732315501229)

[418] Jean-Philippe Aguilar, Cyril Coste, Hagen Kleinert, Jan Korbel Regularization and analytic option pricing under α-stable distribution of arbitrary asymmetry arXiv:1611.04320

Fields of Research

Introduction

A large variety of physical systems can be decribed in a unified way with the help of quantum field theory. The fields represent fluctuating physical quantities such as atomic positions, electric and magnetic fields, directions of molecules, etc., at each spacetime point. The materials can be solids, liquids, liquid crystals, or nuclei. Fields can also be used to study the changing shapes of membranes which are formed by bilipids or detergents in biophysics and chemical physics.

Field fluctuations are described most efficiently with the help of functional integrals, which form a common mathematical framework for explaining the phenomenon encountered in such systems. This description leads to a universal understanding of all continuous phase transitions. It also renders important insights into discontinuous transitions, such as the melting transition of crystals.

The research of this group is devoted to applying the functional techniques to novel systems. The purpose is to improve the available mathematical methods whenever necessary. Parallels are established with the theory of elementary particles.

1. Theory of Defect-Induced Phase Transitions

Solids and superfluids undergo phase transitions which can be explained by the large configurational entropy of line-like defects or vortex lines. In contrast to Landau's order field theory of phase transition, a powerful new disorder field theory has been developed in the textbookGauge Fields in Condensed Matter. There it is shown that the long-range forces between the line structures can conveniently be described by a gauge theory. This makes the ensuing disorder field theories structurally very similar to the well-known Ginzburg-Landau theory of superconductivity, which is advantageous for extracting the physical consequences.

2. Quark Confinement and String Physics

Quarks are held together by color-electric flux tubes. Their formation can be studied best in a dual formulation of the Abelian Higgs model developed in my Book 1, and further in the Theory of Quark Confinement developed in Refs. 203, 205, 211.

The properties of the flux tubes are investigated with the help of a string model with curvature stiffness, which was first proposed by us (Ref. 149) and, independently, by A. M. Polyakov. The paper has instigated much research elsewhere. We have found that contrary to earlier expectations, the color-electric flux tube formed between a quark and an antiquark has a negative stiffness (Ref. 241).

A new model was found which has this property and, in addition, a smooth phase without the undesirabel phenomenon of "plumber's nightmare" (Ref. 276).

3. Quantum Mechanics

A new variational approach to path integrals developed in collaboration with R.P. Feynman (Ref. 159, see also here) has been extended systematically and has lead to_exponentially fast convergent_ perturbation expansions. (Ref. 213, 220, 229 and Book 4). A further recent discovery is a variational approach to tunneling processes (Refs. 214, 221, 231). This help improving resummation techniques for divergent perturbation series (Refs. 228, 220).

It has led to the most precise theoretical predictions of the critical properties of statistical systems near phase transitions. See details the Path Integrals in Quantum Mechanics, Statistics, and Polymer Physics, which has appeared in German under the title Pfadintegrale in Quantenmechanik, Statistik und Polymer Physics, B.I.-Wissenschaftsverlag, Mannheim, 1993 (Book 4). A nonholonomic mapping principle was found by which the laws quantum physics in spaces with curvature and torsion can be determined from the known laws in euclidean space by a nonholonomic mapping (Refs. 199, 202, 258;Path Integrals, Chapters 10, 11).

4. Classical and Statistical Mechanics in Spaces with Curvature and Torsion

The quantum equivalence principle necessitates the study of its classical limit. A surprising result was that the action principle for the derivation of the equations of motion is changed in an essential way with respect to previous formalisms if a space carries torsion (Ref. 219). As applications of the new action principle, we have derived correctly the Euler equations of motion of a rigid body in the body-fixed coordinate frame (Ref. 224). We have also derived the Fokker-Planck equation governing the Brownian motion of a particle in a space with curvature and torsion which determines the diffusion of classical particles through crystals with defects (Ref. 233).

5. Classical Statistics

The mechanism by which continuous phase transitions in systems with line-like excitations (such as vortex or defect lines) become first-order has been explained with the help of disorder fields (Refs. 131, 194; Books 1 and 2).

An important example is the melting transition, where we have found the first model undergoing two successive continuous melting transitions (Refs. 174, 179; Books 1 and 2).

6. Quantum Statistics

The above variational approach is being used to develop very accurate approximations to quantum statistical partition functions and particle densities (see Chapter 5 in Path Integrals). The operator quantum Langevin equation has been derived for the first time from the forward-backward path integral approach (Ref. 230).

Field Theory of Critical Phenomena The universal critical exponents at a second-order phase transition can be studied by renormalization group techniques. Our group was the first to determine exactly, in collabotration with a Russian group, the epsilon expansion of an O(N)-symmetric phi^4-theory up to five loops (Ref. 208). Also the asymmetric case was solved (Ref. 225). The variational approach to quantum mechanics was extended to quantum field theory resulting in a fully-fledged strong-coupling quantum field thory. This has led to a novel approach to critical phenomena with extremely accurate results for critical exponents, without use of the renormalization group (Refs. 257, 263, 275, 290). The new theory was so successful that it led to Book 6.

7. Polymer Physics

A field theory is under construction to solve the entanglement problem of polymer physics. For a first formulation see the above textbook on Path Integrals.

8. Field Theory of Liquid Crystals

Smectic, nematic, and cholesteric liquid crystals possess interesting phase transitions which are studied by field theoretic techniques. A disorder field theory opens new perspectives for understanding the transition (Ref. 102). A quasicrystalline phase with icosahedral structure was theoretically proposed by us 3 years before the experimental discovery of such a material (Ref. 75). Click here, for more details .

Discovery of Quasicrystals; Icosahedral Phase

The existence of quasicrystals in an icosahedral phase was first conjectured and investigated in 1981 as a candiate for the blue phase in liquid crystals by

H. Kleinert and K. Maki, Lattice Textures in Cholesteric Liquid Crystals Fortschr. Phys. 29, 1 (1981). See p. 242 and 243.

A phase with these properties was discovered experimentally three years later by Shechtman at al. in 1984: D. Shechtman at al., Phys. Rev. Lett. 53, 1951 (1984) in a rapid solidification of the alloy Al86Mn14.

Shechtman's experimental discovery earned him the Nobel Prize 2011 for a "Paradigm Shift in Crystallography". Chemists had a hard time believing in the existence of a five-fold symmetric crystal structure discussed in our 1981 paper with Maki.

See also the citations of Kleinert and Maki in the review article on Liquid Crystals by Tamar Seideman. A picture of the square of the icosahedral order parameter in Eq. (4,22) of above Kleinert and Maki paper can easily be plotted with the help of this short Mathematica script:
nfold=5; k[n_]:=2 Pi *n/nfold phi=Sum[E^(I (Cos[k[n]]*x+Sin[k[n]]*y)),{n,0,nfold-1}] ContourPlot[Abs[phi]^2,{x,-60,60},{y,-60,60}]

By changing the number nfold, the program draws a picture of the density of other two-dimensional quasicrystal symmetries, for instance a picture of the nfold=7 heptagonal order parameter:

9. Fluctuation Effects in Membranes

Many physical systems contain flexible membranes. Examples are red blood cells, soap layers between oil and water, and bilipid vesicles. The phase transition in such systems are studied via a suitably constructed field theory. The universal constant in the pressure law of an ideal gas of layered membranes was first determined by us with great precision via Monte Carlo calculations (Refs. 133, 143, 184), and recently analytically (225). An experimentally-observed spiky superstructure on membranes was found theoretically (266).

10. Superfluid Helium 3

Functional methods have been used to develop a theory of the long-wavelength phenomena in superfluid Helium 3 on the basis of collective fields (Ref. 55). A new texture was discovered theoretically (Ref. 59) and found later experimentally (Refs. 133, 143, 184).

11. Superconductivity

A disorder field theory was developed for superconductors in Refs. 97, 98, 1, and has allowed us to predict a tricritical point in the superconducting phase transition which was confirmed recently by Monte Carlo simulations. It has also permitted a first determination of the critical exponents of the transition (Ref. 226).

12. Mathematical Physics

Exact solution methods are developed for path integrals. The most prominent method was found in 1979 in collaboration with Duru (Refs. 65, 83). It has meanwhile led to the solution of many path integrals which previously appeared unsolvable (Book 11). Recent examples are the path integrals for a point particle on spherical surfaces and on group spaces (Ref. 202), as well as for the relativistic Coulomb system (Ref. 232). Another important result obtained in mathematical physics is the solution of the problem of defining products of distributions such as delta- and Heaviside functions. It results from the requirement of invariance of path integrals under coordinate tranformations. This is necessary for the equivalence to Schroedinger theory. This fixed all products of distributions, as shown in Ref. 303. The result is the same as can be found from dimensional resularization (see Ref. 305, also Chapter 10 of the textbook on Path Integrals).

13. Stochastic Physics

The powerful Duru-Kleinert method for solving path integrals is being extended to Markov processes. In collaboration withA. Pelster, a transformation has been found in Ref. 249, by which Fokker-Planck equations of different Markov processes can be transformed into each other. This allows us to relate unsolved to solved problems, and may the key to finding solutions for many as yet untackled equations.

14. Supersymmetry in Nuclear Physics

Nuclear spectra show broken supersymmetry as was first pointed out by us in the 1978 Erice School on The New Aspects in Nuclear Physics. For details see here.

15. Financial Markets

Path integrals are a powerful tool for studying fluctuations in financial markets which are non-Gaussian. The traditional assumption of Gaussian distribution severely underestimates the probability of large jumps in asset prices and this was the main reason for the catastrophic failure in the early fall of 1998 of the hedge fund Long Term Capital Investment, which had the Nobel price winners Scholes and Merton on the advisory board (and as shareholders). The fund contained derivative with a notional value of 1,250 Billion US$. The fund collected 2% for administrative expenses and 25% of the profits, and was initially extremely profitable. It offered its shareholders returns of 42.8% in 1995, 40.8% in 1996, and 17.1% even in the disastrous year of the Asian crisis 1997. But in September 1998, after mistakenly gambling on a convergence in interest rates, it almost went bankrupt. A number of renowned international banks and Wall Street institutions had to bail it out with 3.5 Billion US$ to avoid a chain reaction of credit failures. Starting from a path integral formulation, we have developed a generalization of Ito's stochastic calculus to non-Gaussian fluctuations (Ref. 329) and derived a new option pricing formula from this (Ref. 333). A detailed theory is contained inmy textbook on path integrals.

Theories

• Path Integrals in Quantum Mechanics, Statistics, and Polymer Physics
• Duru-Kleinert Transformation for Exact Solution of Path Integrals
• Feynman-Kleinert Variational Approach (see Collaboration with R.P.Feynman)
• Disorder Field Theory of Phase Transitions
• Dual Theory of Superconductivity
• Five-Loop Calculation of Critical Exponents in 4-epsilon Dimensions
• Strong-Coupling Theory of Critical Behavior (more here)
• Kleinert Criterion for Onset of Phase Decoherence
• Variational Perturbation Theory for Field Theory with Anomalous Dimensions turning Divergent Weak-Coupling to Convergent Strong-Couling Expansions
• Vortex Gauge Field Theory of Superfluid Phase Transition
• Defect Gauge Field Theory of Crystal Melting
• Monopole Gauge Field Theory of Confinement
  • The Extra Gauge Symmetry of String Deformations in Electromagnetism with Charges and Dirac Monopoles
  • Double-Gauge Invariance and Local Quantum Field Theory of Charges and Dirac Magnetic Monopoles
  • Abelian Double-Gauge Invariant Continuous Quantum Field Theory of Electric Charge Confinement
• Collective Quantum Fields in Superconductors and Superfluid He3
• Hadronization of Quark Theories
• Polyakov-Kleinert Stiff String
• Pressure Constant for Stacks of Membranes
• Most Accurate Specific Heat Exponent alpha of Superfluid Helium
• Algebra of Regge Couplings
• Group Dynamics of Hydrogen Atom [the group O(4,2)]
• Supersymmetry in Nuclear Physics

Discovery of Supersymmetry in Nuclei

There is experimental evidence for supersymmetry in nuclei (see citations below). Its existence (in broken form) was first proposed by Hagen Kleinert during a discussion session after a lecture of Sergio Ferrara on_Supersymmetric Theories of Fundamental Interactions_ held at the 1978 Erice School. It is published in:
The New Aspects of Subnuclear Physics , Plenum Press, N.Y., 1980 (ed. by A. Zichichi), pp. 1--37., pp. 39--58.
The discussion sessions are reprinted on pp. 39--58.
It documents that upon a question posed by the Yale student Yuan K. HA (now professor at Temple University), whether there could be supersymmetry in nuclei, was answered affirmatively by Kleinert who pointed out that a simple model of even and odd nuclei exhibits broken supersymmetry. Kleinert had previously presented auch a model at the 1977 Erice Summer School on Low Temperature Physics for a different purpose [lecture is published under the title Collective Quantum Fields, Fortschr. Physik 26, 565-671 (1978). (Start to read at bottom page 5)].
Discussion manuscript, Erice 1978

Experimental Evidence

Evidence for the Existence of Supersymmetry in Atomic Nuclei, Metz1 et al., Phys. Rev. Letters 83, 1542 (1999)
For experimetal evidence of supersymmetry in nuclei see:
Nuclear structure of 196Au: More evidence for its supersymmetric description, J. Groeger et al., Physical Review C 62, 643044 (2000)

• New Stochastic Calculus for Non-Gaussian Processes
• Financial Markets---Option Pricing for Non-Gaussian Price Fluctuations
• A World Crystal

World Crystal

The World Crystal was proposed as a toy model of the universe in the paper:
H. Kleinert, Gravity as Theory of Defects in a Crystal with Only Second-Gradient Elasticity, Ann. d. Physik, 44, 117 (1987)
It is supposed to illustrate that curvature and torsion may arise from defects and that the universe may have a short-distance structure which may completely surprise us when we shall be able to do experiments at Planck distances. More is explained in the textbook.
The Italian artist Laura Pesce was inspired by the theory and created three glass paintings of the world crystal.

1. One of these can be seen on thehome page of the artist. The Italian title (Mondo Cristallizzato) can be seen on this page (picture lower left corner).
2. A second picture of the world crystal can be seen here on the photo with the artist on this page (photo on the right).
   

• No-Go Theorem for Tachyons

No-Go Theorem for tachyons

A physical theory cannot have any tachyon. A propagator has at a nonzero value of q2 a pole implies the existence of particle moving with a velocity faster than light, a so-called tachyon. The possible existence of such states was conjectured for a long time since it was an allowed state in an irreducible representation of the_Poincare group_. They were an imporant output of infinite-component wave equations which were a popular subject of study in the sixties. See for example this paper. They also exist in the best existing quantum field theory so far, the quantum electrodynamics of electrons and photons (QED).
The textbook can be read online here. There they appear at very large masses which lie far above the validity of this theory. They are called Landau ghosts. They also appear in attempts to quantize gravity by making it emerge from a conformally invariant action.
At the end of Chapter 18 of the above book a no-tachyon theorem is stated as follows:
A particle moving faster then light is removed in nature by the system undergoing a phase transition to a state of lower energy. In field theory this is usually a state with another vacuum expectation value of the fields. This is the typical way how nature deals with all unstable physical systems: For example, a timber-framed house will be unstable if its small vibrations have some eigenfrequency with a negative square value. Upon a small vibration, the amplitudes of such oscillations grow large exponentially fast in time. As a consequence, the structure will collapse into a state of lower energy. If there is again a negative square frequency, the intermediate state will collapse again. This process will go on until the stucture has settled as a stable ruin. In the ruin, all frequencies have positive square values, and no tachyon is left.

• Dark Matter and GIMPs

Collaboration with R.P. Feynman at Caltech

Richard Feynman was one of the most fascinating characters of the 20th century, both as a physicist and as a person. My friendship with him had a rather slow start, mostly due to the respect he inspired to me and the other young people around him. I met him first in 1973 when spending a sabbatical winter semester at Caltech. I was invited byMurray Gell-Mann after he had heard a lecture of mine on Current Algebra at a winter school in Schladming, Austria (reporting on the results of a paper I had written at CERN, Geneva).

Caltech was an extremely exciting place. The theory department met every Wednesday for a luncheon seminar where everyone had a chance of presenting his problems and solutions. At that time, experimentalists had discovered point-like constituents in hadrons with the help of deep inelastic scattering of electrons. The point-like structure had been explained phenomenologically by Feynman with hisparton model. Gell-Mann was trying to go further by constructing a fundamental quantum field theory which would combine the point-like structure with well-known results of his Current Algebra. So he gave partons the quantum numbers ofquarks and described them by fundamental fermion fields. Together withHarald Fritzsch he had just shown that currents constructed from free quark fields would explain most of the data. What was missing at that time was an explanation why free fields worked so well although nobody was able to detect quarks as particles in the laboratory! The model had, however, an important weakness, as was immediately noticed by Feynman: It did not account for the fact that high-energy collisions produced jets of particles --- the free-quark model would lead to uniform distributions. It was Gell-Mann who realized that local color gauge fields could provide them with the necessary glue to keep them forever inside the hadrons. The point-like structure was assured by what is called asymptotic freedom of color gauge theory, which ensures that quarks inside hadrons would behave almost like free particles. This property had just been discovered independently by't Hooft, Politzer, and by Gross and Wilczek.

Unfortunately, I did not participate in this fundamental endeavor since I was working on a field-theoretic derivation of theAlgebra of Regge Residues (see also here), which had been postulated seven years earlier on phenomenological grounds by Cabibbo, Horwitz, and Ne'emann [Phys. Lett. 166, 1786 (1968)]. I found a derivation by generalizing Current Algebra to an algebra of bilocal quark charges of free quark fields. In fact,Yuval Ne'eman [who had discovered in 1961, simultaneously with Gell-Mann, the fact that mesons and nucleons occur in multiplets representing the symmetry group SU(3) and who became later Israel's Minister of Science and development (1982--1984) and of Energy (1990--1992)] was my office mate at Caltech in 1980 and was very happy about my derivation. We became close friends, and whenever he appeared on a ministerial visit in Berlin, he always found some spare time to meet me and discuss physics (protected by several body guards sitting at the tables around us).

Gell-Mann, however, convinced me that according to my derivation, the algebra was not exact but only approximately true due to logarithmic corrections. This made it uninteresting to him. He always said "Don't waste your time with theories which do not have a chance of being true.". He taught me that theories which are only approximate from the beginning are not worth pursuing.

This was quite different with Feynman who loved simple models which can explain things approximately. Feynman appeared regularly at the seminars, and it was an experience to witness the pointed discussions evolving between him and Gell-Mann. There was always a tension between them, a certain rivalry, which led to interesting exchanges. Some of them were plainly silly: for instance, a speaker said on the blackboard: "I am now using Feynman's parton model" and was interrupted by Gell-Mann with the provocative question "What's that?" (whose answer he knew, of course). Feynman responded with a boyish smile: "It's published"! Upon which Gell-Mann said "You mean that phenomenological model which I superseded with my quark field theory?".

The students thoroughly enjoyed seeing the greatest physicists of that time fighting like kids.

In this environment I had the opportunity of participating in a series of seminars Feynman gave to graduate students and postdocs on path integrals with applications to quantum electrodynamics. He told us that when he had first come to Caltech as a young professor he had used path integrals quite extensively in his course on quantum mechanics. Later, however, he had given up on this since he was tired of confessing to the students that he was unable solve the path integral of the most fundamental atomic system, the hydrogen atom, whose solution is so easy in Schrödinger wave mechanics. Feynman knew that I had developed the group theory of the hydrogen atom in my 1967 Ph. D. Thesis, so he challenged me to try my luck with the path integral. We tried a number of things on the blackboard which, however, did not lead to anything.

When I returned home to Berlin in spring 1974 the problem stuck in my head while I was working out my 1976 Erice Lecture "On the Hadronization of Quark Theories" [in which I calculated the mass differences between current and constituent quarks and various current algebra relations]. The hydrogen atom sufaced again in 1978 when a Turkish postdoc, H. Duru, came to me as a Humboldt fellow. He was familiar with my thesis, so I told him Feynman's challenge, and we began searching for the solution. It turned out that Feynman's definition of path integrals as a product of a large but finite number of ordinary integrals was in principle unable to describe the hydrogen atom. The situation is similar to ordinary integrals: if a function is too singular, these can not be approximated by finite sums. We published the solution in 1979, and it became the basis for solving all path integrals whose Schrödinger equation can be solved analytically (see my textbook on this subject).

This success encouraged me to loose my shyness when meeting Feynman again on another sabbatical which I spent mostly in Santa Barbara in 1984. I frequently drove to Pasadena, and met with him to discuss physics, and he always had time for me. We talked for a few hours and usually went to a diner to have a soup together. He was sometimes very funny. Once he said conspiratively to me: "Hagen, I know you have a loose mouth. I shall show you a secret, but only if you promise to tell it to everybody." I did, and he pulled out a photo which showed him in a huge bathtub with three(!) beautiful long-haired California beauties in his arms.

His office had a wall full of tightly filled notebooks which he occasionally pulled one to show me some calculations he had done earlier on the topic we were discussing. He showed me, in particular, long calculations which had not produced any interesting results so far. I still possess a copy of such notes where he calculated the properties of an analog of a polaron, where the role of the particle coupled to phonons is played by a spin. He always wanted me to find a nice physical system where his model could be applied, but I did not succeed. He put a message to his secretary Helen Tuck to send me these notes on his blackboard, which remained there until he died in February 1989. It is visible in Fig. 1a:"Feynman's last blackboard" in the February issue of Physics Today in 1989, page 88. The relevant section of the blackboard is pictured in Fig. 1. Right bottom shows note to his secretary Helen Tuck asking her to send his calculations on self-coupled spin system to Kleinert.

Fig. 1a: Feynman's last blackboard in Physics Today, February 1989 issue, p. 88.

Fig. 1b: Feynman's last blackboard (zoom to the red frame shown in a)

Feynman's notes were always filled with lots of numerical calculations, with long columns of numbers obtained with the help of a pocket calculator. It reminded me of Riemann's notes, which are filled with such columns. Feynman told me that he liked to get numerical results. This was necessary back in the forties when working in Los Alamos on the Manhattan Project. At that time the machines were quite primitive by today's standards. Students often believe that great theoreticians design only abstract formulas and leave the calculations to others. But this is not so. Feynman always insisted in going to the end to get numbers, And when these did not fit the data, this was an important source of discoveries.

One of the set of notes which he showed me to in 1982 was easier to turn into physical results. These contained the variational calculations which are published in his 1972 Benjamin book on "Statistical Mechanics". Feynman suggested to me to work out a simple generalization, leading to what we called theeffective classical potential. Fortunately, a simple cheap computer (theSinclair ZX81, see Fig. 2) had become available a year earlier, and was just becoming very cheap in the supermarkets (15$ at Woolworth).

Fig. 2 TheSinclair ZX81 Computer bought at Woolworth for 15 US$.

It connected to a television set and worked at a frequency of 3.25 MHz with a memory of 1 Kilobyte. With this little machine, I easily did the necessary calculations and wrote up the manuscript in Spring 1983. When I told him I had written up the paper Feynman came to visit me at the ITP in Santa Barbara to discuss the results. When he arrived everybody wanted to talk to him and he was pressed to give a seminar. He finally agreed, although he was not in good shape at that time. He began his talk with the words: "Sorry, that I am unprepared but I came here only to finish a paper with my friend Hagen". His talk dealt with the proliferation of vortex lines explaining the critical properties of superfluid helium. He had proposed this mechanism in a lecture in 1955, probably inspired by a similar proposal by Shockley in 1952 that the proliferation of defect lines should drive the melting transition. Both have probably known the pioneering 1949 paper by Onsager who had explained the phase transition of the two-dimensional Ising model by the proliferation of the line-like domain walls between up and down spins, and conjectured a similar mechanism for the vortex lines in superfluid helium. To his surprise, Feynman encountered strong but unjustified criticism from the young people in the audience who wanted to show that they were smart.

They had just learned to calculate critical properties by applying the renormalization group to complex scalar field theory, and did not believe that vortex lines were relevant. At that time, the disorder field description of superfluid helium was not yet common knowledge. These describe ensembles of vortex lines by fields whose Feynman diagrams are direct pictures of these lines. I had inroduced these fields in 1982 and published a full theory in a textbook in 1989 (Gauge Fields in Condensed Matter, Vols. I and II). After his talk and the fights, Feynman was extremely exhausted and disappointed by the aggressiveness of the audience. He lay down in my office and sighed "I should not have talked! Why am I doing this to myself?". When he returned to Caltech he felt quite ill and I was very worried. Of course, I did not dare to press him to go through our paper and permit me to send it off to a journal.

In February 1984 I returned to Berlin to my regular teaching duties, and forgot all about our manuscript, when in a night of May 1986 the telephone rang and Helen Tuck, Feynman's secretary, told me that Feynman found the paper OK as it was and wanted me to submit it to Physical Review A. It was interesting to observe the reaction of the referees to a paper with Feynman as an author: One wrote: "The manuscript shows the clarity and conciseness typical for Feynman's writing". The paper appeared inDecember 1986. Feynman never expected the method would be applicable to quantum field theory. However, I have found a way of doing this, and developed what I have named Field-Theoretic Variational Perturbation Theory .

This theory allows for the arbitrarily precise calculations of strong-coupling properties of quantum field theories. In particular, it enables one to find critical exponents near second-order phase transitions in a simple way without using renormalization group theory. It makes essential use of the Wegner exponent governing the approach to scaling (which Pade and Pade-Borel methods are unable to do) and determines it with high accuracy. The theory is based on an essential extension of the originalFeynman-Kleinert Variational Approach in two steps.

1. The Peierls inequality was abandoned in order to deal with expansions of any order. This turns divergent weak-coupling expansions into convergent strong-coupling expansions. The convergence is mostly exponentially fast.
   The details are described in Chapter 5 of my textbook Path Integrals in Quantum Mechanics, Statistics, Polymer Physics, and Financial Markets.
2. A simple trick was found to accommodate the anomalous dimensions of quantum field theory. The result is Field-Theoretic Variational Perturbation Theory which has led to themost reliable results of strong-coupling properties of field theories so far. The most-accurately measured strong-coupling property is the critical exponent that governs the singularity of the specific heat of superfluid helium, which was performed with great effort in a microgravity environment in a satellite by J. Lipa and collaborators. This experiment found precisely the value which I predicted in aseven-loop calculation. For details, see my textbook on this subject Critical Properties of phi4 Theories.
   The relevant papers are:
   • Strong-Coupling Behavior of Phi^4-Theories and Critical Exponents
   • Critical Exponents from Seven-Loop Strong-Coupling phi4\phi^4phi4-Theory in Three Dimensions
   • Strong-Coupling phi^4-Theory in 4 -- epsilon Dimensions, and Critical Exponents
   • Critical Exponents without beta-Function
   • Theory and Satellite Experiment for Critical Exponent alpha of lambda-Transition in Superfluid Helium
   • Variational Resummation of epsilon-Expansions of Critical Exponents of Nonlinear O(N)-Symmetric sigma-Model in 2+ epsilon Dimensions

This led to the most reliable calculations of critical properties of systems near phase transitions so far. In particular, the most-accurately known singularity of the specific heat of superfluid helium which has been measured with great effort in a satellite experiment byJ. Lipa and collaborators was precisely predicted, and I have written a textbook on this subject (Critical Properties of phi4 Theories).

Inspired by the collaboration with Feynman I published in 1990 the first edition of my textbook onPath Integrals in Quantum Mechanics, Statistics, and Polymer Physics which has become a real best seller. It also contains applications to financial markets. Without him, this book would have never appeared and many problems would have remained unsolved.

Another system we discussed many times was a stack of biomembranes. If they are contained between two walls they exert a pressure obeying a law very similar to the ideal gas law (Helfrich's law: p d^3=c T^2/k, where p=pressure, d=distance between the walls, T=temperature, k=stiffness of membranes). The challenge was to find the proportionality constant c which was only known fromMonte-Carlo simulations. Unfortunately we could not find a solution at that time. The problem was not forgotten, however, and many years later I succeeded insolving it with the help of field-theoretic variational perturbation theory. Of all the physicists I have known, Feynman impressed me most with the simplicity and elegance with which he articulates and solves complicated problems. His course I attended was extremely clear. He never used camouflaging mathematical language to express physical facts. If someone did, he always stopped him with the question "what's that?", and insisted on a down-to-earth explanation. He never made the student feel stupid (unless he really was) and always explained his ideas to exhaustion. He was a perfect teacher. It is somewhat amazing that he has produced only a relatively small number of excellent postdocs of his own, in comparison with J.A. Wheeler or J. Schwinger. I guess the reason must be that too few students had the courage to approach him. Feynman has certainly shaped the thinking of all Caltech students who went through his classes even if they graduated with other thesis advisors. And, of course, the many students and colleagues around the world who have studied his fascinating textbooks on physics.

Documents on H. Kleinert's Collaboration with R.P. Feynman

• This is Kleinert's and Feynman's joint paper:
  Effective Classical Partition Functions Phys. Rev. A 34, 6, 5080 (1986)
• Excerpt on this collaboration from the biography by John and Mary Gribbin:
  "RICHARD FEYNMAN, A Life in Science", Viking, NY, 1997
• The article "Travailler avec Feynman" in the French journalPOUR LA SCIENCE: download
• Printing errors in the book on path integrals by Feynman and Hibbs (collected by Tim Hatamian)

picture gallery

with P.-G. De Gennes in a Discussion in 1998 in Berlin

with Walter Kohn at a party in Santa Barbara in 1982 (together with Annemarie Kleinert, Douglas Scalapino, and his wife)

with Cecile De Witt-Morette in a Discussion in 1998 in Berlin

Signing the Documents for the IRAP Programm in 2002 with the president of the University Nice-Sophia Antipolis (seated between me and Remo Ruffini).

with Jim Hartle and Thomas Elze at Conference Party at Piombino, Italy, in Summer 2004 (together with Annemarie Kleinert (l) and Laura Pesce (r), alias Ms. Elze)

with Jack Steinberger at Cern Cafeteria in May 2005

with Murray Gell-Mann (together with Annemarie Kleinert)

with Gerard 't Hooft (together with Josef Devreese at Devreese's birthday festival in 2002)

with Annemarie Kleinert (together with Hagen Kleinert at Sebastian Brandt's Diploma party in 2003)

with Annemarie Kleinert (together with Hagen Kleinert at party in 2006)

with Annemarie Kleinert (together with Hagen Kleinert receiving the Max-Born-Prize 2008 in London)

with Gerard 't Hooft and Frank Wilczek (at 't Hooft's 60th Birthday Conference together with Betteke 't Hooft and Wilczek's wife, Betsy Devine, 2004)

with Gerard 't Hooft (at 't Hooft's 60th Birthday Conference together with Betteke 't Hooft and Annemarie Kleinert, 2004)

at 't Hooft's 60th Birthday Conference together with Julius Wess and Annemarie Kleinert, 2004

with Remo Ruffini (at Marcel Grossmann Meeting 11 in Berlin together with Anita Ehlers, 2004)

with Sasha Polyakov (at Marcel Grossmann Meeting 11 in Berlin 2004)

with Francis Everitt (at Marcel Grossmann Meeting 11 in Berlin together with Annemarie Kleinert and Wolfard Janke, 2004)

with a picture of world crystal by Italian artist Laura Pesce 2005

with Laura Pesce and the picture of Instanton, 2005

with Gerard 't Hooft (at Kleinert's 60th birthday party)

with Gerard 't Hooft (at Kleinert's 60th birthday party)

with Gerard 't Hooft (at Kleinert's 60th birthday party)

with Gerard 't Hooft (at a 1978 party in Kleinert's home)

with Gerard 't Hooft (at Kleinert's 60th birthday party)

with Gerard 't Hooft (at Lisbon 1981 conference, photo taken by a street photographer for newly-married couples with an ancient plate camera)

Annemarie Kleinert with Murray Gell-Mann und Harald Fritzsch at Harald's Emeritus Party in Hofbräuhaus in 2008 (Foto taken by Ted Hänsch) )

with Academic Senate of West University of Timisoara at Dr. h.c. -ceremony in Timisoara 2009

with Rector of West University of Timisoara at Dr. h.c. -ceremony in Timisoara 2009

with Annemarie Kleinert at a Table exhibiting my books in the library of West University of Timisoara at the Dr. h.c. -ceremony in Timisoara 2009

Political discussion with the King of Romania his Majesty Mihai I at Dr. h.c. -ceremony in Timisoara 2009

Representing the Specola Vaticana at the ICRANet board of directors meeting in 2009. The rightmost person is Riccardo Giacconi, one of the fathers of X-ray astronomy.

with Murray Gell-Mann and his lady friend Michelle Gaugy (left), Agnès Rampal (Maire-Adjoint déléguée à l´Enseignement Supérieur et aux Rapatriés), Remo Ruffini, Thibault Damour, and Annemarie Kleinert in Villa Ratti, Nizza during Gell-Mann's visit in June 2012 signing Villa Ratti's wall of fame

with Murray Gell-Mann greeting Agnès Rampal (Maire-Adjoint déléguée à l´Enseignement Supérieur et aux Rapatriés), Annemarie Kleinert in garden of Villa Ratti, Nizza during Gell-Mann's visit in June 2012

with Gerard 't Hooft, Annemarie Kleinert, and Betteke 't Hooft in Taipeh at the conference "Horizons"

Kleinert's research group 1996

Kleinert's research group 1998

Kleinert's research group 2000

Kleinert's research group 2003

Kleinert's research group 2006

Kleinert's research group 2009

Kleinert's research group 2010

Kleinert's research group 2011

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Contact

Prof. Dr. Hagen Kleinert
Liebensteinstr. 6
14195 Berlin
Germany

privacy policy

The protection of your privacy and your personal data is one of our highest priorities.

Responsible contact for any questions regarding our privacy policy:
Michael Kleinert, Liebensteinstr. 6, 14195 Berlin, GERMANY

Collection of general information

When you access this website through your web browser, the data of your specific request is submitted to our systems. The data contains the requested web page, the type of your web browser, your computer's operating system, the hostname of your internet service provider, and your current internet protocol address (IP address). The data itself does not allow a direct reconstruction of who you are. However, collecting the data is technically required to deliver the content of the page you requested to you. This is how the internet works. Since the protection of your privacy is one of our highest priorities, your data is not stored in a permanent way on our systems. All your data is deleted after delivering the requested content to you. Since the data is not stored on a hard disk, and just kept in our system's memory for the short time of your request, it becomes unlikely that, e.g., in the worst case of a successful cyber attack, your data may be compromised.

Transport encryption

All the data exchanged between your web browser and our systems is protected by modern encryption technologies (TLS).

When is your data deleted?

We collect data that is necessary to process your request and deliver the content to your web browser. The data is deleted immediately after the connection between your web browser and our systems is closed.

Your rights of information

You have the rights to be informed about all your data that is stored on our systems. Furthermore, you have the rights that we change or delete your data upon your request.

Changes to our privacy policy

This privacy policy may be changed in the future to always fulfill the laws. In any case, for each request of our website the currently valid privacy policy may be found on this page.