Luis Silvestre
Published 2015-11-10Version 1
We consider a parabolic equation in nondivergence form, defined in the full space $[0,\infty) \times \mathbb R^d$, with a power nonlinearity as the right hand side. We obtain an upper bound for the solution in terms of a weighted control in $L^p$. This upper bound is applied to the homogeneous Landau equation with moderately soft potentials. We obtain an estimate in $L^\infty(\mathbb R^d)$ for the solution of the Landau equation, for positive time, which depends only on the mass, energy and entropy of the initial data.
$C^0$-estimates and smoothness of solutions to the parabolic equation defined by Kimura operators
The tusk condition and Petrovski criterion for the normalized $p\mspace{1mu}$-parabolic equation
A numerical method for an inverse source problem for parabolic equations and its application to a coefficient inverse problem
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