On stable and finite Morse index solutions of the nonlocal H\'enon-Gelfand-Liouville equation

Abstract

We consider the nonlocal H\'enon-Gelfand-Liouville problem (-)s u = |x|a eu Rn, for every s∈(0,1), a>0 and n>2s. We prove a monotonicity formula for solutions of the above equation using rescaling arguments. We apply this formula together with blow-down analysis arguments and technical integral estimates to establish non-existence of finite Morse index solutions when ( n2)(s)(n-2s2)(s+ a2)> 2(n+2s4)2(n-2s4).