A fractional Hadamard formula and applications

Abstract

We consider the domain dependence of the best constant in the subcritical fractional Sobolev constant, λs,p():=∈f \ [u]Hs(RN)2,\,\, u∈ C∞c(),\,\, \|u\|Lp()=1 \, where s∈ (0,1), is bounded of class C1,1 and p∈ [1, 2NN-2s) if 2s<N, p∈ [1, ∞) if 2s≥ N=1. Explicitly, we derive formula for the one-sided shape derivative of the mapping λs,p() under domain perturbations. In the case where λs,p() admits a unique positive minimizer (e.g. p=1 or p=2), our result implies a nonlocal version of the classical variational Hadamard formula for the first eigenvalue of the Dirichlet Laplacian on . Thanks to the formula for our one-sided shape derivative, we characterize smooth local minimizers of λs,p() under volume-preserving deformations, and we find that they are balls if p∈ \1\ [2,∞). Finally, we consider the maximization problem for λs,p() among annular-shaped domains of fixed volume of the type B B', where B is a fixed ball and B' is ball whose position is varied within B. We prove that, for p∈ \1,2\, the value λs,p(B B') is maximal when the two balls are concentric.