Entire solutions to nonlinear scalar field equations with indefinite linear part

Abstract

We consider the stationary semilinear Schr\"odinger equation - u + a(x) u = f(x,u), u∈ H1(N), where a and f are continuous functions converging to some limits a∞>0 and f∞=f∞(u) as |x|∞. In the indefinite setting where the Schr\"odinger operator - +a has negative eigenvalues, we combine a reduction method with a topological argument to prove the existence of a solution of our problem under weak one-sided asymptotic estimates. The minimal energy level need not be attained in this case. In a second part of the paper, we prove the existence of ground-state solutions under more restrictive assumptions on a and f. We stress that for some of our results we also allow zero to lie in the spectrum of - + a.