On the standing waves of the NLS-log equation with point interaction on a star graph

Abstract

We study a nonlinear Schr\"odinger equation with logarithmic nonlinearity on a star graph G. At the vertex an interaction occurs described by a boundary condition of delta type with strength α∈ R. We investigate orbital stability and spectral instability of the standing wave solutions eiω t(x) to the equation when the profile (x) has mixed structure (i.e. has bumps and tails). In our approach we essentially use the extension theory of symmetric operators by Krein - von Neumann, and the analytic perturbations theory.