Title :
An analysis of numerical solution of diffusion equation with nonlocal boundary condition
Author :
Methi, Giriraj ; Jain, Vinesh
Author_Institution :
Dept. of Math., Poornima Coll. of Eng., Jaipur, India
Abstract :
Aim of the paper is to develop finite difference method for solving the heat equation in two- dimensional space with non-local boundary condition. An explicit second order forward time centered method is considered which is well suited for parabolic partial differential equation with continuous boundary conditions. Suitability of the method is presented through an example and relative error is determined. Also Adomian decomposition method has been used to find analytical solution of the problem.
Keywords :
boundary-value problems; diffusion; finite difference methods; partial differential equations; Adomian decomposition method; diffusion equation; finite difference method; heat equation; nonlocal boundary condition; numerical solution; parabolic partial differential equation; second order forward time centered method; Heating; Adomian decomposition method; Diffusion equation; Finite difference method; Forward Euler method; Simposon´s Integration;
Conference_Titel :
Recent Advances and Innovations in Engineering (ICRAIE), 2014
Conference_Location :
Jaipur
Print_ISBN :
978-1-4799-4041-7
DOI :
10.1109/ICRAIE.2014.6909242
