Artículo
Tykhonov well-posedness of a heat transfer problem with unilateral constraints
Fecha de publicación:
07/2022
Editorial:
Acad Sciences Czech Republic
Revista:
Applications Of Mathematics
ISSN:
0862-7940
Idioma:
Inglés
Tipo de recurso:
Artículo publicado
Clasificación temática:
Resumen
We consider an elliptic boundary value problem with unilateral constraints and subdifferential boundary conditions. The problem describes the heat transfer in a domain D ⊂ ℝd and its weak formulation is in the form of a hemivariational inequality for the temperature field, denoted by P. We associate to Problem P an optimal control problem, denoted by Q. Then, using appropriate Tykhonov triples, governed by a nonlinear operator G and a convex K˜ , we provide results concerning the well-posedness of problems P and Q. Our main results are Theorems 4.2 and 5.2, together with their corollaries. Their proofs are based on arguments of compactness, lower semicontinuity and pseudomonotonicity. Moreover, we consider three relevant perturbations of the heat transfer boundary valued problem which lead to penalty versions of Problem P, constructed with particular choices of G and K˜. We prove that Theorems 4.2 and 5.2 as well as their corollaries can be applied in the study of these problems, in order to obtain various convergence results.
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Articulos(CCT - ROSARIO)
Articulos de CTRO.CIENTIFICO TECNOL.CONICET - ROSARIO
Articulos de CTRO.CIENTIFICO TECNOL.CONICET - ROSARIO
Citación
Sofonea, Mircea; Tarzia, Domingo Alberto; Tykhonov well-posedness of a heat transfer problem with unilateral constraints; Acad Sciences Czech Republic; Applications Of Mathematics; 67; 2; 7-2022; 167-197
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