Small normalised solutions for a Schr\"odinger-Poisson system in expanding domains: multiplicity and asymptotic behaviour

Abstract

Given a smooth bounded domain ⊂ R3, we consider the following nonlinear Schr\"odinger-Poisson type system equation* \ arrayll - u+ φ u -up-2u = ω u & in λ, -φ =u2& in λ, u>0 & in λ, u =φ=0 & on ∂ (λ), ∫λu2 \,d x=2 array . equation* in the expanding domain λ⊂ R3, λ>1 and p∈ (2,3), in the unknowns (u,φ,ω). We show that, for arbitrary large values of the expanding parameter λ and arbitrary small values of the mass >0, the number of solutions is at least the Ljusternick-Schnirelmann category of λ. Moreover we show that as λ+∞ the solutions found converge to a ground state of the problem in the whole space R3.

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