Full-Discrete Weak Galerkin Finite Element Method for Solving Diffusion-Convection Problem.
Journal Title: JOURNAL OF ADVANCES IN MATHEMATICS - Year 2017, Vol 13, Issue 4
Abstract
This paper applied and analyzes full discrete weak Galerkin (WG) finite element method for non steady two dimensional convection-diffusion problem on conforming polygon. We approximate the time derivative by backward finite difference method and the elliptic form by WG finite element method. The main idea of WG finite element methods is the use of weak functions and their corresponding discrete weak derivatives in standard weak form of the model problem. The theoretical evidence proved that the error estimate in norm, the properties of the bilinear form, (v-elliptic and continuity), stability, and the energy conservation law.
Authors and Affiliations
Asmaa Hamdan
Keywords
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- EP ID EP651809
- DOI 10.24297/jam.v13i4.6312
- Views 189
- Downloads 0
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