Sharp non-existence results of prescribed L2-norm solutions for some class of Schr\"odinger-Poisson and quasilinear equations

Abstract

In this paper we study the existence of minimizers for F(u) = \1/2∫3 |∇ u|2 dx + 1/4∫3∫3| u(x) |2| u(y) |2| x-y |dxdy-1p∫3| u |p dx on the constraint S(c) = \u ∈ H1(3) : ∫3|u|2 dx = c \, where c>0 is a given parameter. In the range p ∈ [3, 10/3] we explicit a threshold value of c>0 separating existence and non-existence of minimizers. We also derive a non-existence result of critical points of F(u) restricted to S(c) when c>0 is sufficiently small. Finally, as a byproduct of our approaches, we extend some results of CJS where a constrained minimization problem, associated to a quasilinear equation, is considered.