Strichartz Estimates and Small-Mass Global Well-Posedness for the Periodic Quintic NLS in 1D

Abstract

We consider the periodic quintic nonlinear Schrödinger and prove small-mass global well-posedness in Hs(T) for s>0. The proof relies on a new derivative-loss-free L6t,x Strichartz estimate which is established using the high-low method, an asymmetric superlevel set estimate and a new refined broad-narrow argument. Although our L6t,x Strichartz estimate is not sharp, being valid on slightly shorter time scales than the optimal logarithmic scale, combining it with the I-method enables the extension of local solutions to arbitrary times.