Global L∞ and decay estimate for fractional p-Laplacian equations in Ds,p(N)

Abstract

In this paper we present a new global L∞-estimate for solutions u∈ Ds,p(N) of the fractional p-Laplacian equation % u∈ Ds,p(N): (-p)s u=f(x,u) in N, % of the form % \|u\|∞ C (\|u\|β) % for some β> p, where : + + is a data independent function with s 0+(s)=0. The obtained L∞-estimate is used to prove a decay estimate based on pointwise estimates in terms of nonlinear Wolff potentials. Taking advantage of both the L∞ and decay estimate we prove a Brezis-Nirenberg type result regarding Ds,2(N) versus Cb(N, 1+|x|N-2s) local minimizers.