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Sibirskii Matematicheskii Zhurnal, 2009, Volume 50, Number 1, Pages 175–189
(Mi smj1947)
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This article is cited in 4 scientific papers (total in 4 papers)
Some classes of inverse evolution problems for parabolic equations
S. G. Pyatkov, B. N. Tsybikov Ugra State University
Abstract:
We consider the problem of simultaneously determining coefficients of a second order nonlinear parabolic equation and a solution to this equation. The unknown coefficients occur in the main part and in the nonlinear summand as well. The overdetermination conditions are conditions of the Dirichlet type on a family of planes of arbitrary dimension. It is demonstrated that the problem in question is solvable locally in time in Hölder spaces. When the unknown functions enter the right-hand side and the equation is linear, the theorem of global unique existence (in time) is established.
Keywords:
inverse problem, overdetermination condition, parabolic equation of second order, initial-boundary value problem.
Received: 06.07.2007 Revised: 26.11.2007
Citation:
S. G. Pyatkov, B. N. Tsybikov, “Some classes of inverse evolution problems for parabolic equations”, Sibirsk. Mat. Zh., 50:1 (2009), 175–189; Siberian Math. J., 50:1 (2009), 141–153
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Abstract page: | 497 | Full-text PDF : | 146 | References: | 83 | First page: | 11 |
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