Divergence operator and Poincare inequalities on arbitrary bounded domains
Abstract
Let be an arbitrary bounded domain of n. We study the right invertibility of the divergence on in weighted Lebesgue and Sobolev spaces on , and rely this invertibility to a geometric characterization of and to weighted Poincar\'e inequalities on . We recover, in particular, well-known results on the right invertibility of the divergence in Sobolev spaces when is Lipschitz or, more generally, when is a John domain, and focus on the case of s-John domains.
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