On fractional Hardy-type inequalities in general open sets

Abstract

We show that, when sp>N, the sharp Hardy constant hs,p of the punctured space RN\0\ in the Sobolev-Slobodecki space provides an optimal lower bound for the Hardy constant hs,p() of an open ⊂neq RN. The proof exploits the characterization of Hardy's inequality in the fractional setting in terms of positive local weak supersolutions of the relevant Euler-Lagrange equation and relies on the construction of suitable supersolutions by means of the distance function from the boundary of . Moreover, we compute the limit of hs,p as s 1, as well as the limit when p ∞. Finally, we apply our results to establish a lower bound for the non-local eigenvalue λs,p() in terms of hs,p when sp>N, which, in turn, gives an improved Cheeger inequality whose constant does not vanish as p ∞.

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