Recovering a Rapidly Oscillating Lower-Order Coefficient and a Source in a Hyperbolic Equation from Partial Asymptotics of a Solution

Pub Date : 2024-05-29 DOI:10.1134/s0037446624030200

V. B. Levenshtam

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Abstract

We consider the Cauchy problem for a one-dimensional hyperbolic equation whose lower-order coefficient and right-hand side oscillate in time with a high frequency and the amplitude of the lower-order coefficient is small. Under study is the reconstruction of the cofactors of these rapidly oscillating functions independent of the space variable from a partial asymptotics of a solution at some point of the space. The classical theory of inverse problems examines the numerous problems of determining unknown sources, and coefficients without rapid oscillations for various evolutionary equations, where the exact solution to the direct problem appears in the additional overdetermination condition. Equations with rapidly oscillating data are often encountered in modeling the physical, chemical, and other processes that occur in media subjected to high-frequency electromagnetic, acoustic, vibrational, and others fields, which demonstrates the topicality of perturbation theory problems on the reconstruction of unknown functions in high-frequency equations. We give some nonclassical algorithm for solving such problems that lies at the junction of asymptotic methods and inverse problems. In this case the overdetermination condition involves a partial asymptotics of solution of a certain length rather than the exact solution.

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从解的部分渐近线恢复双曲线方程中快速振荡的低阶系数和源值

我们考虑的是一元双曲方程的考奇问题，该方程的低阶系数和右侧在时间上以高频率振荡，而低阶系数的振幅很小。研究的重点是根据空间某一点解的部分渐近线，重建这些与空间变量无关的快速振荡函数的协元。逆问题的经典理论研究了各种演化方程的未知源和无快速振荡系数的确定问题，其中直接问题的精确解出现在附加的过度确定条件中。在模拟受高频电磁场、声场、振动场和其他场影响的介质中发生的物理、化学和其他过程时，经常会遇到具有快速振荡数据的方程，这表明扰动理论问题在重建高频方程中的未知函数方面具有现实意义。在这种情况下，超定条件涉及一定长度的部分渐近解，而不是精确解。

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