Sobolev extensions, interpolation inequalities and consequences
Abstract
We prove Sobolev interpolation inequalities on extension domains that have a form reminiscent of the corresponding whole-space inequalities. This form is crucial in certain applications, which we discuss as well. The technical key ingredient is the notion of a Lebesgue W1,p-extension domain, which we introduce here, and our proof that, for 1<p<∞, any W1,p-extension domain is a Lebesgue W1,p-extension domain.
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