TWO-GRID CHARACTERISTIC FINITE VOLUME METHODS FOR NONLINEAR PARABOLIC PROBLEMS＊

作     者：Tong Zhang 

作者机构：School of Mathematics and Information Science Henan Polytechnic University Jiaozuo China 

出 版 物：《Journal of Computational Mathematics》 (计算数学（英文）)

年 卷 期：2013年第31卷第5期

页      面：470-487页

核心收录：

学科分类：07[理学] 070104[理学-应用数学] 070102[理学-计算数学] 0701[理学-数学] 

基　　金：Acknowledgments. The work was supported by the Natural Science Foundation of China (No.11126117)  CAPES and CNPq of Brazil  and the Doctor Fund of Henan Polytechnic Univer- sity (B2012-098). The author is very grateful to Professor JinYun Yuan for his kind invitation to visit the Universidade Federal do Paran  Brazil 

主　　题：Two-grid Characteristic finite volume method Nonlinear parabolic problem,Error estimate Numerical example. 

摘      要：In this work, two-grid characteristic finite volume schemes for the nonlinear parabolic problem are considered. In our algorithms, the diffusion term is discretized by the finite volume method, while the temporal differentiation and advection terms are treated by the characteristic scheme. Under some conditions about the coefficients and exact solution, optimal error estimates for the numerical solution are obtained. Furthermore, the two- grid characteristic finite volume methods involve solving a nonlinear equation on coarse mesh with mesh size H, a large linear problem for the Oseen two-grid characteristic finite volume method on a fine mesh with mesh size h = O（H2） or a large linear problem for the Newton two-grid characteristic finite volume method on a fine mesh with mesh size h = 0（I log hll/2H3）. These methods we studied provide the same convergence rate as that of the characteristic finite volume method, which involves solving one large nonlinear problem on a fine mesh with mesh size h. Some numerical results are presented to demonstrate the efficiency of the proposed methods.