Boundary control problem for a hyperbolic equation loaded along one of its characteristics

A. Attaev
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引用次数: 1

Abstract

This paper investigates the unique solvability of the boundary control problem for a one-dimensional wave equation loaded along one of its characteristic curves in terms of a regular solution. The solution method is based on an analogue of the d’Alembert formula constructed for this equation. We point out that the domain of definition for the solution of DE, when the initial and final Cauchy data given on intervals of the same length is a square. The side of the squire is equal to the interval length. The boundary controls are established by the components of an analogue of the d’Alembert formula, which, in turn, are uniquely established by the initial and final Cauchy data. It should be noted that the normalized distribution and centering are employed in the final formulas of sought boundary controls, which is not typical for initial and boundary value problems initiated by equations of hyperbolic type.
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一类双曲型方程的边界控制问题
本文用正则解的形式研究了沿其特征曲线加载的一维波动方程边界控制问题的唯一可解性。求解方法是基于对该方程构造的达朗贝尔公式的模拟。我们指出当相同长度的区间上的初值和终值柯西数据为正方形时,解的定义域。乡绅的边长等于间隔长度。边界控制是由达朗贝尔公式的模拟分量建立的,而达朗贝尔公式又是由初始和最终的柯西数据唯一地建立的。值得注意的是,所寻求的边界控制的最终公式采用了归一化分布和定心,这对于由双曲型方程引发的初始和边值问题来说并不典型。
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来源期刊
CiteScore
1.20
自引率
50.00%
发文量
50
期刊最新文献
A Novel Numerical Scheme for a Class of Singularly Perturbed Differential-Difference Equations with a Fixed Large Delay On the class of pointwise and integrally loaded differential equations Erratum to: “Coefficients of multiple Fourier-Haar series and variational modulus of continuity” [Bulletin of the Karaganda University. Mathematics series, No. 4(112), 2023, pp. 21–29] Some properties of the one-dimensional potentials Factorization of abstract operators into two second degree operators and its applications to integro-differential equations
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