Ebook: Harnack Inequalities for Stochastic Partial Differential Equations
Author: Feng-Yu Wang (auth.)
- Tags: Partial Differential Equations, Probability Theory and Stochastic Processes, Analysis
- Series: SpringerBriefs in Mathematics
- Year: 2013
- Publisher: Springer-Verlag New York
- Edition: 1
- Language: English
- pdf
In this book the author presents a self-contained account of Harnack inequalities and applications for the semigroup of solutions to stochastic partial and delayed differential equations. Since the semigroup refers to Fokker-Planck equations on infinite-dimensional spaces, the Harnack inequalities the author investigates are dimension-free. This is an essentially different point from the above mentioned classical Harnack inequalities. Moreover, the main tool in the study is a new coupling method (called coupling by change of measures) rather than the usual maximum principle in the current literature.
In this book the author presents a self-contained account of Harnack inequalities and applications for the semigroup of solutions to stochastic partial and delayed differential equations. Since the semigroup refers to Fokker-Planck equations on infinite-dimensional spaces, the Harnack inequalities the author investigates are dimension-free. This is an essentially different point from the above mentioned classical Harnack inequalities. Moreover, the main tool in the study is a new coupling method (called coupling by change of measures) rather than the usual maximum principle in the current literature.
In this book the author presents a self-contained account of Harnack inequalities and applications for the semigroup of solutions to stochastic partial and delayed differential equations. Since the semigroup refers to Fokker-Planck equations on infinite-dimensional spaces, the Harnack inequalities the author investigates are dimension-free. This is an essentially different point from the above mentioned classical Harnack inequalities. Moreover, the main tool in the study is a new coupling method (called coupling by change of measures) rather than the usual maximum principle in the current literature.
Content:
Front Matter....Pages i-x
A General Theory of Dimension-Free Harnack Inequalities....Pages 1-26
Nonlinear Monotone Stochastic Partial Differential Equations....Pages 27-50
Semilinear Stochastic Partial Differential Equations....Pages 51-77
Stochastic Functional (Partial) Differential Equations....Pages 79-118
Back Matter....Pages 119-125
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