Stability and convergence of in time approximations of hyperbolic elastodynamics via stepwise minimization

IF 2.4 2区 数学 Q1 MATHEMATICS
Antonín Češík , Sebastian Schwarzacher
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引用次数: 0

Abstract

We study step-wise time approximations of non-linear hyperbolic initial value problems. The technique used here is a generalization of the minimizing movements method, using two time-scales: one for velocity, the other (potentially much larger) for acceleration. The main applications are from elastodynamics, namely so-called generalized solids, undergoing large deformations. The evolution follows an underlying variational structure exploited by step-wise minimization. We show for a large family of (elastic) energies that the introduced scheme is stable; allowing for non-linearities of highest order. If the highest order can be assumed to be linear, we show that the limit solutions are regular and that the minimizing movements scheme converges with optimal linear rate. Thus this work extends numerical time-step minimization methods to the realm of hyperbolic problems.
通过逐步最小化实现双曲弹性力学及时近似的稳定性和收敛性
我们研究非线性双曲初值问题的分步时间逼近。这里使用的技术是最小化运动法的一般化,使用两个时间尺度:一个用于速度,另一个(可能更大)用于加速度。主要应用于弹性动力学,即发生大变形的所谓广义固体。其演化过程遵循一种潜在的变分结构,并通过逐步最小化的方式加以利用。我们针对大量(弹性)能量证明,引入的方案是稳定的;允许最高阶的非线性。如果可以假定最高阶为线性,我们将证明极限解是有规律的,最小化运动方案将以最佳线性速率收敛。因此,这项工作将数值时间步最小化方法扩展到了双曲问题领域。
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来源期刊
CiteScore
4.40
自引率
8.30%
发文量
543
审稿时长
9 months
期刊介绍: The Journal of Differential Equations is concerned with the theory and the application of differential equations. The articles published are addressed not only to mathematicians but also to those engineers, physicists, and other scientists for whom differential equations are valuable research tools. Research Areas Include: • Mathematical control theory • Ordinary differential equations • Partial differential equations • Stochastic differential equations • Topological dynamics • Related topics
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