Sohalya MA, Yassena MT and Elbaza IM
The random partial differential equations have a wide range of physical, chemical, and biological applications. The finite difference method offers an attractively simple approximations for these equations. In this paper, the finite difference technique is performed in order to find an approximation solutions for the linear one dimensional convection-diffusion equation with random variable coefficient. We study the consistency and stability of the finite difference scheme under mean square sense. A statistical measure such as mean for the numerical approximation, and the exact solution based on different statistical distributions is computed.
Поделиться этой статьей
English 
Spanish 
Chinese 
German 
French 
Japanese 
Portuguese 
Hindi 