利用算子不等式研究非线性增长非线性边界问题差分方案的稳定性

Pub Date : 2024-09-19 DOI:10.1134/s0012266124060089

P. P. Matus

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引用次数: 0

摘要

摘要文章发展了数学物理中运算符不等式和非线性非稳态初界值问题的线性运算符方案的稳定性理论。基于萨马尔斯基（A.A. Samarskii）的两级和三级差分方案稳定性的充分条件，在所考虑的差分方案临界性条件下，即当差分解及其第一次时间导数在网格域的所有节点均为非负时，得到了算子不等式的相应先验估计。所获得的结果被用于分析近似非线性右边的费雪方程和克莱因-戈登方程的差分方案的稳定性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Using Operator Inequalities in Studying the Stability of Difference Schemes for Nonlinear Boundary Value Problems with Nonlinearities of Unbounded Growth

Abstract

The article develops the theory of stability of linear operator schemes for operator inequalities and nonlinear nonstationary initial–boundary value problems of mathematical physics with nonlinearities of unbounded growth. Based on sufficient conditions for the stability of A.A. Samarskii’s two- and three-level difference schemes, the corresponding a priori estimates for operator inequalities are obtained under the condition of the criticality of the difference schemes under consideration, i.e., when the difference solution and its first time derivative are nonnegative at all nodes of the grid domain. The results obtained are applied to the analysis of the stability of difference schemes that approximate the Fisher and Klein–Gordon equations with nonlinear right-hand sides.

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