Nonlinear parabolic equations with soft measure data

Abstract: In this paper we prove existence and uniqueness results for nonlinear parabolic problems with Dirichlet boundary values whose model is [ \left{ \begin{aligned} &b(u)t-\Delta{p}u=\mu\;\mbox{in }(0,T)\times\Omega,\ &b(u(0,x))=b(u_{0})\;\mbox{in }\Omega,\ &u(t,x)=0\;\mbox{on }(0,T)\times\partial\Omega. \end{aligned} \right. ] where $\Delta_{p}u=\text{div}(|\nabla u|^{p-2}\nabla u)$ is the usual $p-$Laplace operator, $b$ is a increasing $C^{1}-$function and $\mu$ is a finite measure which does not charge sets of zero parabolic $p-$capacity, and we discuss their main properties.