Asymptotic Results for Solutions of a weighted p-Laplacian evolution Equation with Neumann Boundary Conditions

Abstract

The purpose of this paper is to investigate the time behavior of the solution of a weighted p-Laplacian evolution equation, given by align eveq cases ut = div (γ |∇ u|p-2∇ u ) & on (0,∞)× S, \\ γ|∇ u|p-2∇ u·η=0 & on (0,∞)× ∂ S, \\ u(0,·)=u0 & on S,cases align where n ∈ N \1\, p ∈ (1,∞) \2\, S⊂eq Rn is an open, bounded and connected set of class C1, η is the unit outer normal on ∂ S , and γ: S → (0,∞) is a bounded function which can be extended to an Ap-Muckenhoupt weight on Rn. It will be proven that the solution converges in L1(S) to the average of the initial value u0 ∈ L1(S). Moreover, a conservation of mass principle, an extinction principle and a decay rate for the solution will be derived.