Algunas aplicaciones de la Teor´õa de Lie a la Econom´õa y las Finanzas (original) (raw)

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1. CONCLUSIONES Queremos concluir el presente artículo enfatizando las muchas posibilidades que presenta la aplicación de la Teoría de Lie al ámbito de la Economía y las Finanzas. Aunque en estas páginas solo se muestran explícitamente dos posibles usos de esta Teoría, son muchas más las referencias existentes, las cuales permiten vislumbrar otros muchos temas que podrían abordarse desde la perspectiva de la Teoría de Lie. AGRADECIMIENTOS Los autores quisiéramos agradecer a los revisores y a los editores todas las sugerencias y comentarios realizados, los cuales han resultado sumamente valiosos para mejorar la calidad del presente artículo. REFERENCIAS BIBLIOGRÁFICAS
2. M. Armstrong (1996): Multiproduct Nonlinear Pricing. Econometrica 64, pp. 51-75.
3. S. Basov (2004): Lie groups of partial differential equations and their application to the multidimensional screening problems. Econometric Society 2004 Australasian Meetings 44.
4. T. Björk (2001): A geometric view of interest rate theory. En: E. Jouni, J. Cvitanic and M. Musuela (eds.): Option pricing, Interest Rates and Risk Management, Cambridge University Press, pp. 241-277.
5. T. Björk (2004): On the Geometry of Interest Rate Models. En: R.A. Carmona, E.C. Çinlar, I. Ekeland, E. Jouini, J. A. Scheinkman and N. Touzi (eds.): Paris-Princeton Lectures on Mathematical Finance 2003, Springer-Verlag, pp. 133-216.
6. T. Björk and C. Landén (2002): On the construction of finite dimensional realizations for nonlinear forward rate models. Fin. Stoch. 6, pp. 303-331.
7. J. Cox (1975): Notes on Option Pricing I: Constant Elasticity of Variance Diffusions. Working Paper, Stanford University.
8. J.C. Cox and S.A. Ross (1976): The Valuation of Options for Alternative Stochastic Processes. Journal of Financial Economics 3, pp. 145-166.
9. A. De Sanctis (2007): Lie Theory to Value Financial Derivatives with Time Dependent Parameters. Int. Math. Forum 2:10, pp. 499-503.
10. L.P. Eisenhart (1933): Continuous groups of transformations, Princeton University Press.
11. E.M. Fedriani y Á.F. Tenorio (2006): Progreso técnico: una aproximación desde la Teoría de Grupos de Transformaciones de Lie. Revista de Métodos Cuantitativos para la Economía y la Empresa 1, pp. 5-24.
12. A. Friedman (1964): Partial Differential Equations of Parabolic Type, Prentice-Hall.
13. R.M. Gaspar (2006): Finite Dimensional Markovian Realizations for Forward Price Term Structure Models. En: A.N. Shiryaev, M.R. Grossinho, P.E. Oliveira and M.L. Esquível (eds.): Stochastic Finance, Springer, pp. 265-320.
14. I. Hernández, C. Mateos, J. Núñez and Á.F. Tenorio (2008): Lie Theory: Applications to Problems in Mathematical Finance and Economics. Applied Mathematics and Computation. To appear.
15. I. Karatsas and S. Shreve (1997): Brownian Motion and Stochastic Calculus, Springer-Verlag.
16. C.F. Lo, C.H. Hui and P.H. Yuen (2000a): Constant elasticity of variance option pricing model with time-dependent parameters. Int. J. Theor. Appl. Fin. 3:4, pp. 661-674.
17. C.F. Lo, C.H. Hui and P.H. Yuen (2000b): Option risk measurement with time-dependent parameters. Int. J. Theor. Appl. Fin. 3:3, pp. 581-589.
18. C.F. Lo and C.H. Hui (2001): Valuation of financial derivatives with time-dependent parameters. Quantitative Finance 1, pp. 73-78.
19. C.F. Lo and C.H. Lui (2002): Pricing multi-asset financial derivatives with time-dependent parameters-Lie algebraic approach. Int. J. Math. Math. Sci. 32:7, pp. 401-410.
20. C.F. Lo and C.H. Lui (2006): Lie algebraic approach for pricing moving barrier options with time-dependent parameters, J. Math. Ann. Appl. 323:2, pp. 1455-1464.
21. R. Lu and Y.-H. Hsu (2005): Valuation of Standard Options under the Constant Elasticity of Variance Model, Int. J. Bus. Econ. 4:2, pp. 157-165.
22. T.M. Mitchell (1987): Toward empirical applications of Lie-group technical progress functions, Economics Letters 25, pp. 111-116.
23. S. Polidoro (2003): A Nonlinear PDE in Mathematical Finance. En: F. Brezzi, A. Buffa, S. Corsaro and A. Murli (eds.): Numerical Mathematics and Advanced Application, Springer, pp. 429-433.
24. R. Sato (1980): The impact of technical change on the holotheticity of production functions. Economic Studies 47, pp. 767-776.
25. R. Sato (1981): Theory of technical change and economic invariance. Application of Lie groups, Academic Press.
26. R. Sato and R.V. Ramachandran (1998): Symmetry and Economic Invariance: an introduction, Kluwer.
27. R.M. Solow (1961): Comment on Stigler. En: Output, Input and Productivity Measurement, Princeton University Press, pp. 64-68.
28. G.J. Stigler (1961): Economic problems in measuring changes in productivity. En: Output, Input and Productivity Measurement, Princeton University Press, pp. 47-63.
29. J. Wei and E. Norman (1963): Lie algebraic solution of linear differential equations. Journal of Mathematical Physics 4, pp. 575-581.
30. R. Wilson (1993): Non Linear Pricing, Oxford University Press.