Classification of stable solutions to a non-local Gelfand-Liouville equation

Wen Yang

Classification of stable solutions to a non-local Gelfand-Liouville equation

Abstract

We study finite Morse index solutions to the non-local Gelfand-Liouville problem (-)su=eu Rn, for every s∈(0,1) and n>2s. Precisely, we prove non-existence of finite Morse index solutions whenever the singular solution un,s(x)=-2s|x|+ (22s(n2)(1+s)(n-2s2)) is unstable.

0

Discussion (0)

Sign in to join the discussion.

Loading comments…