Attainability of the fractional Hardy constant with nonlocal mixed boundary conditions. Applications

Abstract

The first goal of this paper is to study necessary and sufficient conditions to obtain the attainability of the fractional Hardy inequality NN():=∈f\φ∈ Es(, D), φ≠ 0\ ad,s2 ∫Rd ∫Rd |φ(x)-φ(y)|2|x-y|d+2sdx dy ∫ φ2|x|2s\,dx, where is a bounded domain of Rd, 0<s<1, D⊂ Rd a nonempty open set and Es(,D)=\ u ∈ Hs(Rd):\, u=0 in D\. The second aim of the paper is to study the mixed Dirichlet-Neumann boundary problem associated to the minimization problem and related properties; precisely, to study semilinear elliptic problem for the fractional laplacian, that is, Pλ \, \ arrayrcll (-)s u &= & λ u|x|2s +up & in , u & > & 0 & in , Bsu&:=&uD+NsuN=0 & in Rd , \\ array. with N and D open sets in Rd such that N D= and N D= Rd , d>2s, λ> 0 and 0<p 2s*-1, 2s*=2dd-2s. We emphasize that the nonlinear term can be critical. The operators (-)s , fractional laplacian, and Ns, nonlocal Neumann condition, are defined below in (1.5) and (1.6) respectively.