A Girsanov Result Through Birkhoff Integral (original) (raw)

Abstract

A vector-valued version of the Girsanov theorem is presented, for a scalar process with respect to a Banach-valued measure. Previously, a short discussion about the Birkhoff-type integration is outlined, as for example integration by substitution, in order to fix the measure-theoretic tools needed for the main result, Theorem 6, where a martingale equivalent to the underlying vector probability has been obtained in order to represent the modified process as a martingale with the same marginals as the original one.

Anna Rita Sambucini: The authors have been supported by Fondo Ricerca di Base 2015 University of Perugia - titles: “\(L^p\) Spaces in Banach Lattices with applications”, “The Choquet integral with respect to fuzzy measures and applications” and by Grant Prot. N. U UFMBAZ2017/0000326 of GNAMPA – INDAM (Italy).

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1. Boccuto, A., Candeloro, D., Sambucini, A.R.: Henstock multivalued integrability in Banach lattices with respect to pointwise non atomic measures. Atti Accad. Naz. Lincei Rend. Lincei Mat. Appl. 26(4), 363–383 (2015). https://doi.org/10.4171/RLM/710
   Article MathSciNet MATH Google Scholar
2. Boccuto, A., Minotti, A.M., Sambucini, A.R.: Set-valued Kurzweil-Henstock integral in Riesz space setting. PanAm. Math. J. 23(1), 57–74 (2013)
   MathSciNet MATH Google Scholar
3. Boccuto, A., Sambucini, A.R.: A note on comparison between Birkhoff and Mc Shane integrals for multifunctions. Real Anal. Exch. 37(2), 3–15 (2012). https://doi.org/10.14321/realanalexch.37.2.0315
   Article Google Scholar
4. Candeloro, D., Croitoru, A., Gavriluţ, A., Sambucini, A.R.: An extension of the Birkhoff integrability for multifunctions. Mediterr. J. Math. 13(5), 2551–2575 (2016). https://doi.org/10.1007/s00009-015-0639-7
   Article MathSciNet MATH Google Scholar
5. Candeloro, D., Di Piazza, L., Musial, K., Sambucini, A.R.: Gauge integrals and selections of weakly compact valued multifunctions. J. Math. Anal. Appl. 441(1), 293–308 (2016). https://doi.org/10.1016/j.jmaa.2016.04.009
   Article MathSciNet MATH Google Scholar
6. Candeloro, D., Di Piazza, L., Musial, K., Sambucini, A.R.: Relations among gauge and Pettis integrals for multifunctions with weakly compact convex values. Annali di Matematica 197(1), 171–183 (2018). https://doi.org/10.1007/s10231-017-0674-z
   Article MathSciNet MATH Google Scholar
7. Candeloro, D., Di Piazza, L., Musial, K., Sambucini, A.R.: Some new results on integration for multifunction. Ricerche di Matematica (in press). https://doi.org/10.1007/s11587-018-0376-x
8. Candeloro, D., Labuschagne, C.C.A., Marraffa, V., Sambucini, A.R.: Set-valued Brownian motion. Ricerche di Matematica (in press). https://doi.org/10.1007/s11587-018-0372-1
9. Candeloro, D., Sambucini, A.R.: Order-type Henstock and Mc Shane integrals in Banach lattice setting. In: Proceedings of the SISY 2014 - IEEE 12th International Symposium on Intelligent Systems and Informatics, pp. 55–59 (2014). https://doi.org/10.1109/SISY.2014.6923557. ISBN 978-1-4799-5995-2
10. Candeloro, D., Sambucini, A.R.: Comparison between some norm and order gauge integrals in Banach lattices. PanAm. Math. J. 25(3), 1–16 (2015)
    MathSciNet MATH Google Scholar
11. Cascales, B., Rodríguez, J.: Birkhoff integral for multi-valued functions. J. Math. Anal. Appl. 297, 540–560 (2004). https://doi.org/10.1016/j.jmaa.2004.03.026
    Article MathSciNet MATH Google Scholar
12. Cascales, B., Rodríguez, J.: The Birkhoff integral and the property of Bourgain. Math. Ann. 331(2), 259–279 (2005). https://doi.org/10.1007/s00208-004-0581-7
    Article MathSciNet MATH Google Scholar
13. Cichoń, K., Cichoń, M.: Some applications of nonabsolute integrals in the theory of differential inclusions in Banach spaces. In: Curbera, G.P., Mockenhaupt, G., Ricker, W.J. (eds.) Vector Measures, Integration and Related Topics. Operator Theory: Advances and Applications, vol. 201, pp. 115–124. BirHauser-Verlag, Basel (2010). https://doi.org/10.1007/978-3-0346-0211-2_11. ISBN: 978-3-0346-0210-5
    Chapter Google Scholar
14. Croitoru, A., Gavriluţ, A.: Comparison between Birkhoff integral and Gould integral. Mediterr. J. Math. 12, 329–347 (2015). https://doi.org/10.1007/50009-014-0410-5
    Article MathSciNet MATH Google Scholar
15. Croitoru, A., Gavriluţ, A., Iosif, A.E.: Birkhoff weak integrability of multifunctions. Int. J. Pure Math. 2, 47–54 (2015)
    Google Scholar
16. Croitoru, A., Iosif, A., Mastorakis, N., Gavriluţ, A.: Fuzzy multimeasures in Birkhoff weak set-valued integrability. In: 2016 Third International Conference on Mathematics and Computers in Sciences and in Industry (MCSI), Chania, pp. 128–135 (2016). https://doi.org/10.1109/MCSI.2016.034
17. Fremlin, D.H.: The Mc Shane and Birkhoff integrals of vector-valued functions, University of Essex Mathematics Department Research Report 92-10 (2004). http://www.essex.ac.uk/maths/staff/fremlin/preprints.htm
18. Marraffa, V.: A Birkhoff type integral and the Bourgain property in a locally convex space. Real Anal. Exch. 32(2), 409–428 (2006–2007). https://doi.org/10.14321/realanalexch.32.2.0409
19. Mikosch, T.: Elementary Stochastic Calculus (with Finance in View). World Scientific Publ. Co., Singapore (1998)
    Book Google Scholar
20. Potyrala, M.M.: The Birkhoff and variational Mc Shane integrals of vector valued functions. Folia Mathematica, Acta Universitatis Lodziensis 13, 31–40 (2006)
    MathSciNet MATH Google Scholar
21. Potyrala, M.M.: Some remarks about Birkhoff and Riemann-Lebesgue integrability of vector valued functions. Tatra Mt. Math. Publ. 35, 97–106 (2007)
    MathSciNet MATH Google Scholar
22. Rodríguez, J.: On the existence of Pettis integrable functions which are not Birkhoff integrable. Proc. Amer. Math. Soc. 133(4), 1157–1163 (2005). https://doi.org/10.1090/S0002-9939-04-07665-8
    Article MathSciNet MATH Google Scholar
23. Rodríguez, J.: Some examples in vector integration. Bull. Aust. Math. Soc. 80(3), 384–392 (2009). https://doi.org/10.1017/S0004972709000367
    Article MathSciNet MATH Google Scholar

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Authors and Affiliations

1. Department of Mathematics and Computer Science, University of Perugia, Perugia, Italy
   Domenico Candeloro & Anna Rita Sambucini

Authors

1. Domenico Candeloro
2. Anna Rita Sambucini

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Correspondence toAnna Rita Sambucini .

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Editors and Affiliations

1. University of Perugia, Perugia, Italy
   Osvaldo Gervasi
2. University of Basilicata, Potenza, Italy
   Beniamino Murgante
3. Covenant University, Ota, Nigeria
   Sanjay Misra
4. Saint Petersburg State University, Saint Petersburg, Russia
   Elena Stankova
5. Polytechnic University of Bari, Bari, Italy
   Carmelo M. Torre
6. University of Minho, Braga, Portugal
   Ana Maria A.C. Rocha
7. Monash University, Clayton, Victoria, Australia
   David Taniar
8. Kyushu Sangyo University, Fukuoka shi, Fukuoka, Japan
   Bernady O. Apduhan
9. Politecnico di Bari, Bari, Italy
   Eufemia Tarantino
10. Myongji University, Yongin, Korea (Republic of)
    Yeonseung Ryu

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Candeloro, D., Sambucini, A.R. (2018). A Girsanov Result Through Birkhoff Integral. In: Gervasi, O., et al. Computational Science and Its Applications – ICCSA 2018. ICCSA 2018. Lecture Notes in Computer Science(), vol 10960. Springer, Cham. https://doi.org/10.1007/978-3-319-95162-1\_47

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• DOI: https://doi.org/10.1007/978-3-319-95162-1\_47
• Published: 04 July 2018
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• Print ISBN: 978-3-319-95161-4
• Online ISBN: 978-3-319-95162-1
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