Infinitely many positive standing waves for Schr\"odinger equations with competing coefficients

Abstract

The paper deals with the equation - u+a(x) u +b(x)uq -up = 0, u ∈ H1(N), whith N 2, 1<q<p,\ p<N+2 N-2 if N 3, ∈f a>0, a(x) a∞ and b(x) 0 as |x|∞. When a(x) a∞ and b(x) = 0 only a finite number of positive solutions to the problem is reasonably expected. Here we prove that the presence of a nonzero term b(x)uq with b(x)≥ 0, \ b(x)≠ 0, under suitable assumptions on the decay rates of a and b, allows to obtain infinitely many positive solutions.