Book contents
- Frontmatter
- Contents
- Preface
- Part I Foundations
- Part II Existence and Regularity
- Part III Applications
- Appendix A Operators on Hilbert spaces
- Appendix B C0-semigroups
- Appendix C Regularization of Markov processes
- Appendix D Itô formulae
- Appendix E Lévy–Khinchin formula on [0,+∞)
- Appendix F Proof of Lemma 4.24
- List of symbols
- References
- Index
Preface
Published online by Cambridge University Press: 10 November 2010
- Frontmatter
- Contents
- Preface
- Part I Foundations
- Part II Existence and Regularity
- Part III Applications
- Appendix A Operators on Hilbert spaces
- Appendix B C0-semigroups
- Appendix C Regularization of Markov processes
- Appendix D Itô formulae
- Appendix E Lévy–Khinchin formula on [0,+∞)
- Appendix F Proof of Lemma 4.24
- List of symbols
- References
- Index
Summary
This book is an introduction to the theory of stochastic evolution equations with Lévy noise. The theory extends several results known for stochastic partial differential equations (SPDEs) driven by Wiener processes. We develop a general framework and discuss several classes of examples both with general Lévy noise and with Wiener noise. Our approach is functional analytic and, as in Da Prato and Zabczyk (1992a), SPDEs are treated as ordinary differential equations in infinitedimensional spaces with irregular coefficients. In many respects the Lévy noise theory is similar to that for Wiener noise, especially when the driving Lévy process is a square integrable martingale. The general case reduces to this, owing to the Lévy–Khinchin decomposition. The functional analytic approach also allows us to treat equations with a so-called cylindrical Lévy noise and implies, almost automatically, that solutions to equations with Lévy noise are Markovian. In some important cases, however, a càdlàg version of the solution does not exist.
An important role in our approach is played by a generalization of the concept of the reproducing kernel Hilbert space to non-Gaussian random variables, and its independence of the space in which the random variable takes values. In some cases it proves useful to treat Poissonian random measures, with respect to which many SPDEs have been studied, as Lévy processes properly defined in appropriate state spaces.
The majority of the results appear here for the first time in book form, and the book presents several completely new results not published previously, in particular, for equations driven by homogeneous noise and for dissipative systems.
- Type
- Chapter
- Information
- Stochastic Partial Differential Equations with Lévy NoiseAn Evolution Equation Approach, pp. ix - xiiPublisher: Cambridge University PressPrint publication year: 2007