Nonexistence results for nonlocal equations with critical and supercritical nonlinearities

Abstract

We prove nonexistence of nontrivial bounded solutions to some nonlinear problems involving nonlocal operators of the form \[Lu(x)=Σ aij∂iju+ PV∫n(u(x)-u(x+y))K(y)dy.\] These operators are infinitesimal generators of symmetric L\'evy processes. Our results apply to even kernels K satisfying that K(y)|y|n+σ is nondecreasing along rays from the origin, for some σ∈(0,2) in case aij0 and for σ=2 in case that (aij) is a positive definite symmetric matrix. Our nonexistence results concern Dirichlet problems for L in star-shaped domains with critical and supercritical nonlinearities (where the criticality condition is in relation to n and σ). We also establish nonexistence of bounded solutions to semilinear equations involving other nonlocal operators such as the higher order fractional Laplacian (-)s (here s>1) or the fractional p-Laplacian. All these nonexistence results follow from a general variational inequality in the spirit of a classical identity by Pucci and Serrin.