Multiple complex-valued solutions for nonlinear magnetic Schrodinger equations

Abstract

We study, in the semiclassical limit, the singularly perturbed nonlinear Schr\"odinger equations LA,V u = f(|u|2)u in RN where N ≥ 3, LA,V is the Schr\"odinger operator with a magnetic field having source in a C1 vector potential A and a scalar continuous (electric) potential V defined by equation LA,V= -2 -2i A · ∇ + |A|2- idivA + V(x). equation Here f is a nonlinear term which satisfies the so-called Berestycki-Lions conditions. We assume that there exists a bounded domain ⊂ RN such that \[ m0 ∈fx ∈ V(x) < ∈fx ∈ ∂ V(x) \] and we set K = \ x ∈ \ | \ V(x) = m0\. For >0 small we prove the existence of at least cuplenght(K) + 1 geometrically distinct, complex-valued solutions whose modula concentrate around K as 0.