Nonlinear Filtering and Smoothing: An Introduction to Martingales, Stochastic Integrals and Estimation
(eBook)
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Format
eBook
Language
English
ISBN
9780486781839
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Citations
APA Citation, 7th Edition (style guide)
Venkatarama Krishnan., & Venkatarama Krishnan|AUTHOR. (2013). Nonlinear Filtering and Smoothing: An Introduction to Martingales, Stochastic Integrals and Estimation . Dover Publications.
Chicago / Turabian - Author Date Citation, 17th Edition (style guide)Venkatarama Krishnan and Venkatarama Krishnan|AUTHOR. 2013. Nonlinear Filtering and Smoothing: An Introduction to Martingales, Stochastic Integrals and Estimation. Dover Publications.
Chicago / Turabian - Humanities (Notes and Bibliography) Citation, 17th Edition (style guide)Venkatarama Krishnan and Venkatarama Krishnan|AUTHOR. Nonlinear Filtering and Smoothing: An Introduction to Martingales, Stochastic Integrals and Estimation Dover Publications, 2013.
MLA Citation, 9th Edition (style guide)Venkatarama Krishnan, and Venkatarama Krishnan|AUTHOR. Nonlinear Filtering and Smoothing: An Introduction to Martingales, Stochastic Integrals and Estimation Dover Publications, 2013.
Note! Citations contain only title, author, edition, publisher, and year published. Citations should be used as a guideline and should be double checked for accuracy. Citation formats are based on standards as of August 2021.
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Grouping Information
| Grouped Work ID | fa37013b-462b-e1bf-6b32-cd2310ab248e-eng |
|---|---|
| Full title | nonlinear filtering and smoothing an introduction to martingales stochastic integrals and estimation |
| Author | krishnan venkatarama |
| Grouping Category | book |
| Last Update | 2022-10-18 21:40:45PM |
| Last Indexed | 2024-04-18 03:16:54AM |
Book Cover Information
| Image Source | hoopla |
|---|---|
| First Loaded | Jul 20, 2023 |
| Last Used | Jul 20, 2023 |
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[synopsis] => Most useful for graduate students in engineering and finance who have a basic knowledge of probability theory, this volume is designed to give a concise understanding of martingales, stochastic integrals, and estimation. It emphasizes applications. Many theorems feature heuristic proofs; others include rigorous proofs to reinforce physical understanding. Numerous end-of-chapter problems enhance the book's practical value. After introducing the basic measure-theoretic concepts of probability and stochastic processes, the text examines martingales, square integrable martingales, and stopping times. Considerations of white noise and white-noise integrals are followed by examinations of stochastic integrals and stochastic differential equations, as well as the associated Ito calculus and its extensions. After defining the Stratonovich integral, the text derives the correction terms needed for computational purposes to convert the Ito stochastic differential equation to the Stratonovich form. Additional chapters contain the derivation of the optimal nonlinear filtering representation, discuss how the Kalman filter stands as a special case of the general nonlinear filtering representation, apply the nonlinear filtering representations to a class of fault-detection problems, and discuss several optimal smoothing representations.
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