Finite time extinction for the strongly damped nonlinear Schr\"odinger equation in bounded domains

Abstract

We prove the finite time extinction property (u(t) 0 on for any t T, for some T>0) for solutions of the nonlinear Schr\"odinger problem i ut+ u+a|u|-(1-m)u=f(t,x), on a bounded domain of RN, N 3, a∈C with (a)>0 (the damping case) and under the crucial assumptions 0<m<1 and the dominating condition 2 m\,(a)(1-m)|(a)|. We use an energy method as well as several a priori estimates to prove the main conclusion. The presence of the non-Lipschitz nonlinear term in the equation introduces a lack of regularity of the solution requiring a study of the existence and uniqueness of solutions satisfying the equation in some different senses according to the regularity assumed on the data.