Existence and global behaviour of solutions of a parabolic problem involving the fractional p-Laplacian in porous medium
Abstract
In this paper, we prove the existence and the uniqueness of a weak and mild solution of the following nonlinear parabolic problem involving the porous p-fractional Laplacian: equation* cases ∂t u+(-)sp(|u|m-1u)=h(t,x,|u|m-1u) & in \; (0,T)× ,\\ u=0 & in \; (0,T) × Rd , \\ u(0,·)=u0 & in \; . cases\ equation* We also study further the the homogeneous case h(u)=|u|q-1u with q>0. In particular we investigate global time existence, uniqueness, global behaviour of weak solutions and stabilization.
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