Stochastic Analysis for Gaussian Random Processes and Fields

Name: Stochastic Analysis for Gaussian Random Processes and Fields
Brand: Taylor & Francis Inc
SKU: 9781498707817
Price: 117.99 EUR
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Vidyadhar S. Mandrekar | Leszek Gawarecki

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A01=Leszek Gawarecki

A01=Vidyadhar S. Mandrekar

advanced Gaussian field analysis

Author_Leszek Gawarecki

Author_Vidyadhar S. Mandrekar

basis

Bayes' formula

brownian

Category=PBT

chaos expansion method

Conditional Expectation

Dirichlet forms

Dirichlet Space

Disjoint Supports

eq_isMigrated=1

eq_isMigrated=2

eq_nobargain

equivalence of probability measures

fractional

fractional Brownian motion

Gaussian Fields

Gaussian Random

Gaussian Random Field

Gaussian random fields

Gaussian Space

Heath Jarrow Morton Model

hilbert

Hilbert Schmidt Operators

Hilbert space theory

integration

Ito integral

kernel

Malliavin calculus

Malliavin Derivative

Markov processes

Markov Property

Maturity Specific Risk

measure indexed processes

motion

Negative Definite Function

Open Subsets

orthonormal

Orthonormal Basis

Radon Nikodym Densities

reproducing

reproducing kernel Hilbert spaces

Skorokhod integral

Smooth Functional

space

stochastic differentiation in finance

Stochastic Duration

stochastic filtering

Stochastic Integral

T0 Gta

T2 T1

Product details

ISBN 9781498707817
Weight: 430g
Dimensions: 156 x 234mm
Publication Date: 23 Jun 2015
Publisher: Taylor & Francis Inc
Publication City/Country: US
Product Form: Hardback

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Stochastic Analysis for Gaussian Random Processes and Fields: With Applications presents Hilbert space methods to study deep analytic properties connecting probabilistic notions. In particular, it studies Gaussian random fields using reproducing kernel Hilbert spaces (RKHSs).

The book begins with preliminary results on covariance and associated RKHS before introducing the Gaussian process and Gaussian random fields. The authors use chaos expansion to define the Skorokhod integral, which generalizes the Itô integral. They show how the Skorokhod integral is a dual operator of Skorokhod differentiation and the divergence operator of Malliavin. The authors also present Gaussian processes indexed by real numbers and obtain a Kallianpur–Striebel Bayes' formula for the filtering problem. After discussing the problem of equivalence and singularity of Gaussian random fields (including a generalization of the Girsanov theorem), the book concludes with the Markov property of Gaussian random fields indexed by measures and generalized Gaussian random fields indexed by Schwartz space. The Markov property for generalized random fields is connected to the Markov process generated by a Dirichlet form.

Vidyadhar Mandrekar is a professor in the Department of Statistics and Probability at Michigan State University. He earned a PhD in statistics from Michigan State University. His research interests include stochastic partial differential equations, stationary and Markov fields, stochastic stability, and signal analysis.

Leszek Gawarecki is head of the Department of Mathematics at Kettering University. He earned a PhD in statistics from Michigan State University. His research interests include stochastic analysis and stochastic ordinary and partial differential equations.

Stochastic Analysis for Gaussian Random Processes and Fields

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