Efficient asymptotics of solutions to the Cauchy problem with localized initial data for linear systems of differential and pseudodifferential equations

IF 1.4 4区数学 Q1 MATHEMATICS

Russian Mathematical Surveys Pub Date : 2021-10-01 DOI:10.1070/RM9973

S. Y. Dobrokhotov, V. Nazaikinskii, A. Shafarevich

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引用次数: 6

Abstract

We say that the initial data in the Cauchy problem are localized if they are given by functions concentrated in a neighbourhood of a submanifold of positive codimension, and the size of this neighbourhood depends on a small parameter and tends to zero together with the parameter. Although the solutions of linear differential and pseudodifferential equations with localized initial data constitute a relatively narrow subclass of the set of all solutions, they are very important from the point of view of physical applications. Such solutions, which arise in many branches of mathematical physics, describe the propagation of perturbations of various natural phenomena (tsunami waves caused by an underwater earthquake, electromagnetic waves emitted by antennas, etc.), and there is extensive literature devoted to such solutions (including the study of their asymptotic behaviour). It is natural to say that an asymptotics is efficient when it makes it possible to examine the problem quickly enough with relatively few computations. The notion of efficiency depends on the available computational tools and has changed significantly with the advent of Wolfram Mathematica, Matlab, and similar computing systems, which provide fundamentally new possibilities for the operational implementation and visualization of mathematical constructions, but which also impose new requirements on the construction of the asymptotics. We give an overview of modern methods for constructing efficient asymptotics in problems with localized initial data. The class of equations and systems under consideration includes the Schrödinger and Dirac equations, the Maxwell equations, the linearized gasdynamic and hydrodynamic equations, the equations of the linear theory of surface water waves, the equations of the theory of elasticity, the acoustic equations, and so on. Bibliography: 109 titles.

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具有定域初始数据的线性微分和伪微分方程组Cauchy问题解的有效渐近性

我们说，如果Cauchy问题中的初始数据是由集中在正余维子流形邻域中的函数给出的，则它们是局部化的，并且该邻域的大小取决于一个小参数，并且与该参数一起趋于零。尽管具有局部化初始数据的线性微分方程和伪微分方程的解构成了所有解集合的一个相对狭窄的子类，但从物理应用的角度来看，它们是非常重要的。这种解出现在数学物理学的许多分支中，描述了各种自然现象（水下地震引起的海啸波、天线发射的电磁波等）的扰动的传播，并且有大量的文献致力于这种解（包括对其渐近行为的研究）。当可以用相对较少的计算来足够快地检查问题时，可以很自然地说渐近是有效的。效率的概念取决于可用的计算工具，并且随着Wolfram Mathematica、Matlab和类似计算系统的出现而发生了重大变化，这些计算系统为数学结构的操作实现和可视化提供了全新的可能性，但也对渐近线的构建提出了新的要求。我们概述了在具有局部初始数据的问题中构造有效渐近性的现代方法。所考虑的方程和系统类别包括薛定谔方程和狄拉克方程、麦克斯韦方程、线性化气体动力学和流体动力学方程、地表水波线性理论方程、弹性理论方程、声学方程等。参考文献：109个标题。

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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来源期刊

Russian Mathematical Surveys 数学-数学

CiteScore

1.70

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： Russian Mathematical Surveys is a high-prestige journal covering a wide area of mathematics. The Russian original is rigorously refereed in Russia and the translations are carefully scrutinised and edited by the London Mathematical Society. The survey articles on current trends in mathematics are generally written by leading experts in the field at the request of the Editorial Board.