Infinitely many positive solutions for the nonlinear Shcrodinger equations in RN

Abstract

We consider the following nonlinear problem in N eq - u +V(|y|)u=up, u>0 in N, u ∈ H1(N) where V(r) is a positive function, 1<p <N+2N-2. We show that if V(r) has the following expansion: There are constants a>0, m>1, θ>0, and V0>0, such that \[ V(r)= V0+ a rm +O(1rm+θ), as r +∞, \] then eq has infinitely many non-radial positive solutions, whose energy can be made arbitrarily large.