Sharp weighted fractional Hardy inequalities
Abstract
We investigate the weighted fractional order Hardy inequality ∫∫|f(x)-f(y)|p|x-y|d+spdist(x,∂)-αdist(y,∂)-β\,dy\,dx≥ C∫|f(x)|pdist(x,∂)sp+α+β\,dx, for =Rd-1×(0,∞), being a convex domain or =Rd\0\. Our work focuses on finding the best (i.e. sharp) constant C=C(d,s,p,α,β) in all cases. We also obtain weighted version of the fractional Hardy-Sobolev-Maz'ya inequality. The proofs are based on general Hardy inequalities and the non-linear ground state representation, established by Frank and Seiringer.
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