Existence and uniqueness of minimal blow up solutions to an inhomogeneous mass critical NLS

Abstract

We consider the 2-dimensional focusing mass critical NLS with an inhomogeneous nonlinearity: i∂tu+ u+k(x)|u|2u=0. From standard argument, there exists a threshold Mk>0 such that H1 solutions with \|u\|L2<Mk are global in time while a finite time blow up singularity formation may occur for \|u\|L2>Mk. In this paper, we consider the dynamics at threshold \|u0\|L2=Mk and give a necessary and sufficient condition on k to ensure the existence of critical mass finite time blow up elements. Moreover, we give a complete classification in the energy class of the minimal finite time blow up elements at a non degenerate point, hence extending the pioneering work by Merle who treated the pseudo conformal invariant case k 1.