Dynamical and variational properties of the NLS-$δ'_s$ equation on the star graph

Abstract: We study the nonlinear Schrödinger equation with δ ′ s coupling of intensity β ∈ R \ {0} on the star graph Γ consisting of N half-lines. The nonlinearity has the form g(u) = |u| p−1 u, p > 1. In the first part of the paper, under certain restriction on β, we prove the existence of the ground state solution as a minimizer of the action functional S ω on the Nehari manifold. It appears that the family of critical points which contains a ground state consists of N profiles (one symmetric and N −1 asymmetric). In … Show more