Characterization of fractional Sobolev--Poincar\'e and (localized) Hardy inequalities
Abstract
In this paper, we prove capacitary versions of the fractional Sobolev--Poincar\'e inequalities. We characterize localized variant of the boundary fractional Sobolev--Poincar\'e inequalities through uniform fatness condition of the domain in Rn. Existence type results on the fractional Hardy inequality are established in the supercritical case sp>n for s∈(0,1), p>1. Characterization of the fractional Hardy inequality through weak supersolution of the associate problem is also addressed.
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