On Stability of Pseudo-Conformal Blowup for L2-critical Hartree NLS

Abstract

We consider L2-critical focusing nonlinear Schroedinger equations with Hartree type nonlinearity i t u = - u - ( |u|2 ) u in 4, where (x) is a perturbation of the convolution kernel |x|-2. Despite the lack of pseudo conformal invariance for this equation, we prove the existence of critical mass finite-time blowup solutions u(t,x) that exhibit the pseudo-conformal blowup rate \| ∇ u(t) \|L2x 1|t| as t 0 . Furthermore, we prove the finite-codimensional stability of this conformal blow up, by extending the nonlinear wave operator construction by Bourgain and Wang (see Bourgain+Wang1997) to L2-critical Hartree NLS.