摘要
In this paper, the convergence of segment explicit-implicit difference scheme forthe parabolic equation with discontinuous coefficients is discussed. The truncationerror of the difference scheme neighboring the points of discontinuity of the coefficients is O(1). It is shown that the solution of the difference scheme tends to thesolution of the differential equation in the sense of the maximum norm and therate of convergence is O(τ + ). Moreover, the numerical flux of the differencescheme tends to the flux of the differential equation in the mean, while the rate ofconvergence is O(τ + h).
In this paper, the convergence of segment explicit-implicit difference scheme forthe parabolic equation with discontinuous coefficients is discussed. The truncationerror of the difference scheme neighboring the points of discontinuity of the coefficients is O(1). It is shown that the solution of the difference scheme tends to thesolution of the differential equation in the sense of the maximum norm and therate of convergence is O(τ + ). Moreover, the numerical flux of the differencescheme tends to the flux of the differential equation in the mean, while the rate ofconvergence is O(τ + h).
出处
《计算数学》
CSCD
北大核心
1997年第2期193-204,共12页
Mathematica Numerica Sinica
基金
中国工程物理研究院科学基金
