Random Crank-Nicolson Scheme for Random Heat Equation in Mean Square Sense

Yassen, M. T. and Sohaly, M. A. and Elbaz, Islam (2016) Random Crank-Nicolson Scheme for Random Heat Equation in Mean Square Sense. American Journal of Computational Mathematics, 06 (02). pp. 66-73. ISSN 2161-1203

[thumbnail of AJCM_2016060314312723.pdf] Text
AJCM_2016060314312723.pdf - Published Version

Download (345kB)

Abstract

The goal of computational science is to develop models that predict phenomena observed in nature. However, these models are often based on parameters that are uncertain. In recent decades, main numerical methods for solving SPDEs have been used such as, finite difference and finite element schemes [1]-[5]. Also, some practical techniques like the method of lines for boundary value problems have been applied to the linear stochastic partial differential equations, and the outcomes of these approaches have been experimented numerically [7]. In [8]-[10], the author discussed mean square convergent finite difference method for solving some random partial differential equations. Random numerical techniques for both ordinary and partial random differential equations are treated in [4] [10]. As regards applications using explicit analytic solutions or numerical methods, a few results may be found in [5] [6] [11]. This article focuses on solving random heat equation by using Crank-Nicol- son technique under mean square sense and it is organized as follows. In Section 2, the mean square calculus preliminaries that will be required throughout the paper are presented. In Section 3, the Crank-Nicolson scheme for solving the random heat equation is presented. In Section 4, some case studies are showed. Short conclusions are cleared in the end section.

Item Type: Article
Subjects: Grantha Library > Mathematical Science
Depositing User: Unnamed user with email support@granthalibrary.com
Date Deposited: 15 Jun 2023 11:07
Last Modified: 14 Sep 2024 04:07
URI: http://asian.universityeprint.com/id/eprint/1208

Actions (login required)

View Item
View Item