Error estimates of a semidiscrete finite element method for fractional stochastic diffusion-wave equations

Guang-an Zou; Abdon Atangana; Yong Zhou

doi:10.1002/num.22252

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$Error estimates of a semidiscrete finite element method for fractional stochastic diffusion-wave equations$

Journal article

Peer reviewed

Error estimates of a semidiscrete finite element method for fractional stochastic diffusion-wave equations

Guang-an Zou, Abdon Atangana and Yong Zhou

Numerical methods for partial differential equations, Vol.34(5), pp.1834-1848

01/09/2018

DOI: https://doi.org/10.1002/num.22252

Abstract

Mathematics

Mathematics, Applied

Physical Sciences

Science & Technology

In this paper, we consider the Galerkin finite element method for solving the fractional stochastic diffusion-wave equations driven by multiplicative noise, which can be used to describe the propagation of mechanical waves in viscoelastic media with random effects. The optimal strong convergence error estimates with respect to the semidiscrete finite element approximation in space are established. Finally, a numerical example is presented to verify the reliability of the theoretical study.

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Title: Error estimates of a semidiscrete finite element method for fractional stochastic diffusion-wave equations
Creators - without role: Guang-an Zou - Henan University
Abdon Atangana - University of the Free State
Yong Zhou - Northwest African American Museum
Publication Details: Numerical methods for partial differential equations, Vol.34(5), pp.1834-1848
Publisher: Wiley
Number of pages: 15
Grant note: 11626085; 11671339 / National Natural Science Foundation of China; National Natural Science Foundation of China (NSFC)
Identifiers: 9934960208331
Academic Unit: King Abdulaziz University
Language: English
Resource Type: Journal article