New solutions to Schr\"odinger-Poisson-Slater equations in Coulomb-Sobolev spaces

Abstract

We prove existence and multiplicity results for the nonlinear and nonlocal PDE - u + (Iα |u|p)\, |u|p-2\, u = f(|x|,u) in \,\, RN, where N ≥ 2, Iα : RN \0\ → R is the Riesz potential of order α ∈ (1,N), p>1, and the local nonlinearity f: [0,∞) × R → R is subject to a new class of assumptions. We find solutions to this zero-mass problem in a Coulomb-Sobolev space using a new scaling based approach in critical point theory, by which we classify the possibly different behaviour of the nonlinearity f at zero and at infinity in terms of the scaling properties of the left hand side of the equation. This is accomplished identifying a scaling invariant PDE which can be interpreted as a nonlinear eigenvalue problem, for which a sequence of eigenvalues \λk\ is conveniently defined via the Z2-cohomological index of Fadell and Rabinowitz. This index allows us to use new critical group estimates (and scaling-based linking sets) which might not be possible via the classical genus. Within a fairly broad set of parameters N,α, p and class of assumptions on the local nonlinearity f, we establish compactness results for an associated action functional and find multiple solutions as critical points, whose existence and number is sensitive to the ''resonance'' of f with the sequence of eigenvalues for the scaling invariant problem, a construction which is at places reminiscent, in the present nonlinear setting, of the classical Fredholm alternative. As a byproduct of our analysis, letting p≠ 2 allows us to capture general nonlinearities f of Sobolev-subcritical, critical, or supercritical growth.