Nonexistence results for a class of fractional elliptic boundary value problems

Abstract

In this paper we study a class of fractional elliptic problems of the form u= f(x,u) in u=0 in N , where s∈(0,1). We prove nonexistence of positive solutions when is star-shaped and f is supercritical. We also derive a nonexistence result for subcritical f in some unbounded domains. The argument relies on the method of moving spheres applied to a reformulated problem using the Caffarelli-Silvestre extension CSilv of a solution of the above problem. The standard approach in the case s=1 using Pohozaev type identities does not carry over to the case 0<s<1 due to the lack of boundary regularity of solutions.