Compactness and existence results in weighted Sobolev spaces of radial functions. Part II: Existence

Abstract

We prove existence and multiplicity results for finite energy solutions to the nonlinear elliptic equation \[ - u+V( | x| ) u=g( | x| ,u) in ⊂eq RN,\ N≥ 3, \] where is a radial domain (bounded or unbounded) and u satisfies u=0 on ∂ if ≠ RN and u→ 0 as | x| → ∞ if is unbounded. The potential V may be vanishing or unbounded at zero or at infinity and the nonlinearity g may be superlinear or sublinear. If g is sublinear, the case with g( | · | ,0) ≠ 0 is also considered.