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Stochastic Integration with Jumps Klaus Bichteler (University of Texas, Austin)

Stochastic Integration with Jumps By Klaus Bichteler (University of Texas, Austin)

Stochastic Integration with Jumps by Klaus Bichteler (University of Texas, Austin)


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Summary

The complete theory of stochastic differential equations driven by jumps, their stability, and numerical approximation theories.

Stochastic Integration with Jumps Summary

Stochastic Integration with Jumps by Klaus Bichteler (University of Texas, Austin)

Stochastic processes with jumps and random measures are importance as drivers in applications like financial mathematics and signal processing. This 2002 text develops stochastic integration theory for both integrators (semimartingales) and random measures from a common point of view. Using some novel predictable controlling devices, the author furnishes the theory of stochastic differential equations driven by them, as well as their stability and numerical approximation theories. Highlights feature DCT and Egoroff's Theorem, as well as comprehensive analogs results from ordinary integration theory, for instance previsible envelopes and an algorithm computing stochastic integrals of caglad integrands pathwise. Full proofs are given for all results, and motivation is stressed throughout. A large appendix contains most of the analysis that readers will need as a prerequisite. This will be an invaluable reference for graduate students and researchers in mathematics, physics, electrical engineering and finance who need to use stochastic differential equations.

Stochastic Integration with Jumps Reviews

Review of the hardback: 'The material in the book is presented well: it is detailed, motivation is stressed throughout and the text is written with an enjoyable pinch of dry humour.' Evelyn Buckwar, Zentralblatt MATH
Review of the hardback: 'The highlights of the monograph are: Girsanov-Meyer theory on shifted martingales, which covers both the Wiener and Poisson setting; a Doob-Meyer decomposition statement providing really deep information that the objects that can go through the Daniell-like construction of the stochastic. This is an excellent and informative monograph for a general mathematical audience.' EMS

Table of Contents

Preface; 1. Introduction; 2. Integrators and martingales; 3. Extension of the integral; 4. Control of integral and integrator; 5. Stochastic differential equations; Appendix A. Complements to topology and measure theory; Appendix B. Answers to selected problems; References; Index.

Additional information

NPB9780521811293
9780521811293
0521811295
Stochastic Integration with Jumps by Klaus Bichteler (University of Texas, Austin)
New
Hardback
Cambridge University Press
2002-05-13
516
N/A
Book picture is for illustrative purposes only, actual binding, cover or edition may vary.
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Customer Reviews - Stochastic Integration with Jumps