INVESTIGADORES
LEDERMAN Claudia Beatriz
artículos
Título:
A mixed semilinear parabolic problem in a noncylindrical space-time domain
Autor/es:
LEDERMAN, CLAUDIA; VÁZQUEZ, JUAN LUIS; WOLANSKI, NOEMÍ
Revista:
DIFFERENTIAL AND INTEGRAL EQUATIONS
Editorial:
Khayyam
Referencias:
Lugar: Athens; Año: 2001 vol. 14 p. 385 - 404
ISSN:
0893-4983
Resumen:
In this paper we prove existence, uniqueness and regularity of the solution to a mixed initial-boundary value problem for a semilinear uniformly parabolic equation with principal part in divergence form,in a noncylindrical space-time domain. We assume only mild regularity on the coefficients and on the non-cylindrical part of the lateral boundary (on which Dirichlet data are given). Also, we assume only mild regularity on the Dirichlet data. We consider two different situations, one with a bounded domain and one with an unbounded domain. This problem is of interest in combustion theory. In that situation, the noncylindrical part of the lateral boundary may be considered as an approximation of a flame front. The second part of the equation is the Laplace operator. In particular, the results in this paper are used in [8] to prove the uniqueness of a "limit" solution to the combustion problem.