The Pohozaev identity for the fractional Laplacian

Abstract

In this paper we prove the Pohozaev identity for the semilinear Dirichlet problem (-)s u = f(u) in , u 0 in Rn. Here, s∈(0,1), (-)s is the fractional Laplacian in Rn, and is a bounded C1,1 domain. To establish the identity we use, among other things, that if u is a bounded solution then u/δs| is Cα up to the boundary ∂, where δ(x)= dist(x,∂). In the fractional Pohozaev identity, the function u/δs|∂ plays the role that ∂ u/∂ plays in the classical one. Surprisingly, from a nonlocal problem we obtain an identity with a boundary term (an integral over ∂) which is completely local. As an application of our identity, we deduce the nonexistence of nontrivial solutions in star-shaped domains for supercritical nonlinearities.