Extrapolation for the Lp Dirichlet Problem in Lipschitz domains
Abstract
Let L be a second-order linear elliptic operator with complex coefficients. We show that if the Lp Dirichlet problem for the elliptic system L(u)=0 in a fixed Lipschitz domain in Rd is solvable for some 1<p=p0< 2(d-1)d-2, then it is solvable for all p satisfying p0<p< 2(d-1)d-2 +. The proof is based on a real-variable argument. It only requires that local solutions of L(u)=0 satisfy a boundary Cacciopoli inequality.
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