Approximation solution of two-dimensional linear stochastic Volterra integral equation by applying the Haar wavelet

Numerical solution of one-dimensional stochastic integral equations because of the randomness has its own problems, i.e. some of them no have analytically solution or finding their analytic solution is very difficult. This problem for two-dimensional equations is twofold. Thus, finding an efficient...

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Bibliographic Details
Published in:arXiv.org 2015-05
Main Authors: Fallahpour, M, Khodabin, M, Maleknejad, K
Format: Article
Language:English
Subjects:
Exact solutions
Integral equations
Randomness
Volterra integral equations
Wavelet analysis
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Summary:Numerical solution of one-dimensional stochastic integral equations because of the randomness has its own problems, i.e. some of them no have analytically solution or finding their analytic solution is very difficult. This problem for two-dimensional equations is twofold. Thus, finding an efficient way to approximate solutions of these equations is an essential requirement. To begin this important issue in this paper, we will give an efficient method based on Haar wavelet to approximate a solution for the two-dimensional linear stochastic Volterra integral equation. We also give an example to demonstrate the accuracy of the method.
ISSN:2331-8422