Decay estimate for the solution of the evolutionary damped p-Laplace equation
Abstract
In this note, we study the asymptotic behavior, as t tends to infinity, of the solution u to the evolutionary damped p-Laplace equation equation* utt+a\, ut =p u equation* with Dirichlet boundary values. Let u* denote the stationary solution with same boundary values, then the W1,p-norm of u(t) - u* decays for large t like t-1(p-1)p, in the degenerate case p > 2.
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