Minimal mass blow-up solutions for nonlinear Schr\"odinger equations with a Hartree nonlinearity

Abstract

We consider the following nonlinear Schr\"odinger equation with a Hartree nonlinearity: \[ i∂ u∂ t+ u+|u|4Nu(1|x|2σ|u|2)u=0 \] in RN. We are interested in the existence and behaviour of minimal mass blow-up solutions. Previous studies have shown the existence of minimal mass blow-up solutions with an inverse power potential and investigated the behaviour of the solution. In this paper, we investigate Hartree nonlinearity, which is a nonlinear term similar to the inverse power-type potential in terms of scaling.