Damped nonlinear Schr\"odinger equation with Stark effect

Abstract

We study the L2-critical damped NLS with a Stark potential. We prove that the threshold for global existence and finite time blowup of this equation is given by \|Q\|2, where Q is the unique positive radial solution of Q + |Q|4/d Q = Q in H1(Rd). Moreover, in any small neighborhood of Q, there exists an initial data u0 above the ground state such that the solution flow admits the log-log blowup speed. This verifies the structural stability for the ``- law'' associated to the NLS mechanism under the perturbation by a damping term and a Stark potential. The proof of our main theorem is based on the Avron-Herbst formula and the analogous result for the unperturbed damped NLS.