Data di Pubblicazione:
2014
Abstract:
We consider parabolic equations of porous medium type of the form
$$u_t − div A(x,t,u,Du) = \mu in E_T,$$
in some space time cylinder $E_T$. The most prominent example covered by our assumptions is the classical porous medium equation
$$u_t − \Delta u^m = \mu in E_T,$$
with $m\ge1$. We establish a sufficient condition for the continuity of $u$ in terms of a natural Riesz potential of the right-hand side measure $\mu$. As an application we come up with a borderline condition ensuring the continuity of u: more precisely, if $\mu\in L((N+2)/2,1)$, then u is continuous in $E_T$.
$$u_t − div A(x,t,u,Du) = \mu in E_T,$$
in some space time cylinder $E_T$. The most prominent example covered by our assumptions is the classical porous medium equation
$$u_t − \Delta u^m = \mu in E_T,$$
with $m\ge1$. We establish a sufficient condition for the continuity of $u$ in terms of a natural Riesz potential of the right-hand side measure $\mu$. As an application we come up with a borderline condition ensuring the continuity of u: more precisely, if $\mu\in L((N+2)/2,1)$, then u is continuous in $E_T$.
Tipologia CRIS:
1.1 Articolo in rivista
Keywords:
Porous medium equation; Continuity
Elenco autori:
Boegelein, V.; Duzaar, F.; Gianazza, UGO PIETRO
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