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- Autorius: Chuchu Chen, Guoting Song, Jialin Hong, Tonghe Dang
- Leidėjas: Springer Verlag, Singapore
- Metai: 2026
- Puslapiai: 300
- ISBN-10: 9819215919
- ISBN-13: 9789819215911
- Kalba: Anglų
Numerical Analysis of Stochastic Functional Differential Equations (el. knyga) (skaityta knyga) | knygos.lt
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Aprašymas
This book presents the latest developments and progress in the numerical study of the stochastic functional differential equation, with a particular emphasis on the longtime asymptotics and probabilistic characteristics of numerical methods used to solve such equation. The longtime asymptotics under investigation include the time-independent convergence analysis in both the strong and weak senses, the numerical invariant measure, and the ergodicity of numerical methods. Additionally, the probabilistic characteristics of numerical solutions explored in this book encompass the density function, limit theorems, and the Freidlin-Wentzell type large deviation principle. The topics presented here lie at the intersection of several fascinating areas: numerical analysis, stochastic analysis, ergodicity theory, Malliavin calculus, large deviation theory, and probability theory, providing a rich framework to deepen our understanding of stochastic functional differential equations from both theoretical and numerical perspectives. This book will appeal to researchers interested in these topics.
- Autorius: Chuchu Chen, Guoting Song, Jialin Hong, Tonghe Dang
- Leidėjas: Springer Verlag, Singapore
- Metai: 2026
- Puslapiai: 300
- ISBN-10: 9819215919
- ISBN-13: 9789819215911
- Kalba: Anglų
This book presents the latest developments and progress in the numerical study of the stochastic functional differential equation, with a particular emphasis on the longtime asymptotics and probabilistic characteristics of numerical methods used to solve such equation. The longtime asymptotics under investigation include the time-independent convergence analysis in both the strong and weak senses, the numerical invariant measure, and the ergodicity of numerical methods. Additionally, the probabilistic characteristics of numerical solutions explored in this book encompass the density function, limit theorems, and the Freidlin-Wentzell type large deviation principle. The topics presented here lie at the intersection of several fascinating areas: numerical analysis, stochastic analysis, ergodicity theory, Malliavin calculus, large deviation theory, and probability theory, providing a rich framework to deepen our understanding of stochastic functional differential equations from both theoretical and numerical perspectives. This book will appeal to researchers interested in these topics.
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