On the Schrodinger-Poisson-Slater system: behavior of minimizers, radial and nonradial cases
Abstract
This paper is motivated by the study of a version of the so-called Schrodinger-Poisson-Slater problem: - u + ω u + λ (u2 1|x|) u=|u|p-2u, where u ∈ H1(3). We are concerned mostly with p ∈ (2,3). The behavior of radial minimizers motivates the study of the static case ω=0. Among other things, we obtain a general lower bound for the Coulomb energy, that could be useful in other frameworks. The radial and nonradial cases turn out to yield essentially different situations.
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