A posteriori error estimates for fully discrete finite difference method for linear parabolic equations

IF 2.2 2区数学 Q1 MATHEMATICS, APPLIED Applied Numerical Mathematics Pub Date : 2024-08-08 DOI:10.1016/j.apnum.2024.08.006

Mengli Mao , Wansheng Wang

引用次数: 0

Abstract

In this paper, we study a posteriori error estimates for one-dimensional and two-dimensional linear parabolic equations. The backward Euler method and the Crank–Nicolson method for the time discretization are used, and the second-order finite difference method is employed for the space discretization. Based on linear interpolation and interpolation estimate, a posteriori error estimators corresponding to space discretization are derived. For the backward Euler method and the Crank–Nicolson method, the errors due to time discretization are obtained by exploring linear continuous approximation and two different continuous, piecewise quadratic time reconstructions, respectively. As a consequence, the upper and lower bounds of a posteriori error estimates for the fully discrete finite difference methods are derived, and these error bounds depend only on the discretization parameters and the data of the model problems. Numerical experiments are presented to illustrate our theoretical results.

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线性抛物方程全离散有限差分法的后验误差估计

本文研究了一维和二维线性抛物方程的后验误差估计。时间离散采用后向欧拉法和 Crank-Nicolson 法，空间离散采用二阶有限差分法。基于线性插值和插值估计，得出了与空间离散化相对应的后验误差估计值。对于后向欧拉法和 Crank-Nicolson 法，分别通过探索线性连续近似和两种不同的连续、片断二次时间重构来获得时间离散化引起的误差。因此，得出了完全离散有限差分方法的后验误差估计上下限，这些误差下限仅取决于离散化参数和模型问题的数据。为了说明我们的理论结果，我们进行了数值实验。

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来源期刊

Applied Numerical Mathematics 数学-应用数学

CiteScore

5.60

自引率

7.10%

发文量

225

审稿时长

7.2 months

期刊介绍： The purpose of the journal is to provide a forum for the publication of high quality research and tutorial papers in computational mathematics. In addition to the traditional issues and problems in numerical analysis, the journal also publishes papers describing relevant applications in such fields as physics, fluid dynamics, engineering and other branches of applied science with a computational mathematics component. The journal strives to be flexible in the type of papers it publishes and their format. Equally desirable are: (i) Full papers, which should be complete and relatively self-contained original contributions with an introduction that can be understood by the broad computational mathematics community. Both rigorous and heuristic styles are acceptable. Of particular interest are papers about new areas of research, in which other than strictly mathematical arguments may be important in establishing a basis for further developments. (ii) Tutorial review papers, covering some of the important issues in Numerical Mathematics, Scientific Computing and their Applications. The journal will occasionally publish contributions which are larger than the usual format for regular papers. (iii) Short notes, which present specific new results and techniques in a brief communication.