ON APPROXIMATION OF COEFFICIENT INVERSE PROBLEMS FOR DIFFERENTIAL EQUATIONS IN FUNCTIONAL SPACES

D. G. Orlovsky; S. I. Piskarev

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ON APPROXIMATION OF COEFFICIENT INVERSE PROBLEMS FOR DIFFERENTIAL EQUATIONS IN FUNCTIONAL SPACES

机译：函数空间微分方程的系数逆问题的逼近

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摘要

This paper is devoted to the theory of approximation of coefficient inverse problems for differential equations of parabolic, elliptic, and hyperbolic types in functional spaces. We present general statements of problems and their approximations and review results obtained earlier in the literature.

机译：本文致力于功能空间中抛物型，椭圆型和双曲型微分方程系数逆问题的逼近理论。我们提出问题及其近似值的一般说明，并复习文献中较早获得的结果。

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来源
《Journal of Mathematical Sciences》 |2018年第6期|823-906|共84页
作者
D. G. Orlovsky; S. I. Piskarev;
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作者单位

National Research Nuclear University MEPhI (Moscow Engineering Physics Institute);

Scientific Research Computer Center, M. V. Lomonosov Moscow State University,Russian Institute for Scientific and Technical Information;

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正文语种 eng
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关键词
abstract differential equation; abstract hyperbolic problem; abstract elliptic problem; abstract parabolic problem; C0-semigroup; Banach space; semidiscretization; inverse overdetermined problem; finite-difference scheme; discrete semigroup;

机译：抽象微分方程;抽象双曲型问题;抽象椭圆型问题;抽象抛物型问题;C0-半群;Banach空间;半离散化;反超定问题;有限差分格式;离散半群;

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ON APPROXIMATION OF COEFFICIENT INVERSE PROBLEMS FOR DIFFERENTIAL EQUATIONS IN FUNCTIONAL SPACES

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