Asymptotics for the best Sobolev constants and their extremal functions
Abstract
Let be a bounded domain of RN, N≥2. Let, for p>N, \[ p():=∈f\ ∇ u pp:u∈ W01,p() and u ∞=1\ . \] We first prove that \[ p→∞p()1p=1 ∞, \] where denotes the distance function to the boundary. Then, we show that, up to subsequences, the extremal functions of p() converge (as p→∞) to the viscosity solutions of a specific Dirichlet problem involving the infinity Laplacian in the punctured .
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