Open AccessExact Finite-Difference Schemes ford-Dimensional Linear Stochastic Systems with Constant Coefficients
Author(s) -
Peng Jiang,
Xiaofeng Ju,
Dan Liu,
Shao-Qun Fan
Publication year - 2013
Publication title -
journal of applied mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.307
H-Index - 43
eISSN - 1687-0042
pISSN - 1110-757X
DOI - 10.1155/2013/830936
Subject(s) - mathematics , constant (computer programming) , finite difference , stochastic differential equation , symplectic geometry , constant coefficients , exact solutions in general relativity , finite difference method , differential equation , linear differential equation , mathematical analysis , finite difference coefficient , stochastic partial differential equation , finite element method , computer science , physics , mixed finite element method , thermodynamics , programming language
The authors attempt to construct the exact finite-difference schemes for linear stochastic differential equations with constant coefficients. The explicit solutions to Itô and Stratonovich linear stochastic differential equations with constant coefficients are adopted with the view of providing exact finite-difference schemes to solve them. In particular, the authors utilize the exact finite-difference schemes of Stratonovich type linear stochastic differential equations to solve the Kubo oscillator that is widely used in physics. Further, the authors prove that the exact finite-difference schemes can preserve the symplectic structure and first integral of the Kubo oscillator. The authors also use numerical examples to prove the validity of the numerical methods proposed in this paper
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