Regularity for entropy solutions of parabolic p-Laplacian type equations
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Autores: José Julián Toledo Melero
, Sergio Segura de León
- Localización: Publicacions matematiques, ISSN 0214-1493, Vol. 43, Nº 2, 1999, págs. 665-683
- Idioma: inglés
- DOI: 10.5565/publmat_43299_08
- Títulos paralelos:
- Regularidad de las soluciones de entropía de ecuaciones de tipo parabólico p-laplaciano
- Enlaces
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Resumen
In this note we give some summability results for entropy solutions of the nonlinear parabolic equation $u_t -\operatorname{div} {\mathbf a}_p (x,\nabla u) = f$ in $]0,T[\times \Omega$ with initial datum in $L^1(\Omega)$ and assuming Dirichlet's boundary condition, where ${\mathbf a}_p(.,.)$ is a Carathéodory function satisfying the classical Leray-Lions hypotheses, $f\in L^1(]0,T[\times \Omega)$ and $\Omega$ is a domain in ${\mathbb R}^N$. We find spaces of type $L^r(0,T; {\cal M}^q(\Omega))$ containing the entropy solution and its gradient. We also include some summability results when $f = 0$ and the $p$-Laplacian equation is considered
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