Reconstruction of the principal coefficient in the damped wave equation from Dirichlet-to-Neumann operator | Sciact - Система учета научной деятельности ИМ СО РАН

Reconstruction of the principal coefficient in the damped wave equation from Dirichlet-to-Neumann operator Научная публикация

Журнал

Inverse Problems
ISSN: 0266-5611

Вых. Данные

Год: 2019, Том: 36, Номер: 2, Страницы: 025003 Страниц : 1 DOI: 10.1088/1361-6420/ab53f3

Ключевые слова

Recovering a potential, damped wave equation, subdomains bounded by characteristics, regularity of the solution, uniqueness of the inverse problem solution, Neumann-to-Dirichlet operator, existence of a quasi-solution, Frechet gradient.

Авторы

Romanov Vladimir ¹ , Hasanov Alemdar ²

Организации

1	Sobolev Institute of Mathematics
2	Kocaeli University

The inverse coefficient problem of recovering the potential q(x) in the damped wave equation subject to the boundary conditions r(0)ux(0; t) = f(t), u(l; t) = 0, from the Dirichlet boundary measured output f(t) := u(0; t), t \in (0; T] is studied. A detailed microlocal analysis of regularity of the direct problem solution in the subdomains bounded by the characteristics as well as along these characteristics is provided. Based on this analysis, necessary regularity results and energy estimates are derived. It is proved that the Dirichlet boundary measured output uniquely determines the potential q(x) in the interval [0; h(T=2)] and this solution belongs to C(0; h(T/2)). Moreover, the global uniqueness theorem is proved.

Romanov V. , Hasanov A.
Reconstruction of the principal coefficient in the damped wave equation from Dirichlet-to-Neumann operator
Inverse Problems. 2019. V.36. N2. P.025003. DOI: 10.1088/1361-6420/ab53f3 WOS Scopus OpenAlex

Поступила в редакцию:	19 июн. 2019 г.
Принята к публикации:	13 окт. 2019 г.

Web of science:	WOS:000509242300001
Scopus:	2-s2.0-85081044092
OpenAlex:	W2986872738

БД	Цитирований
Scopus	4
OpenAlex	6
Web of science	3