Regularity of radial stable solutions to semilinear elliptic equations for the fractional Laplacian

Abstract

We study the regularity of stable solutions to the problem \ arrayrcll (-)s u &=& f(u) & in B1\,, u &&0 & in Rn B1\,, array . where s∈(0,1). Our main result establishes an L∞ bound for stable and radially decreasing Hs solutions to this problem in dimensions 2 ≤ n < 2(s+2+2(s+1)). In particular, this estimate holds for all s∈(0,1) in dimensions 2 ≤ n≤ 6. It applies to all nonlinearities f∈ C2. For such parameters s and n, our result leads to the regularity of the extremal solution when f is replaced by λ f with λ > 0. This is a widely studied question for s=1, which is still largely open in the nonradial case both for s=1 and s<1.