Global Well-posedness for the periodic fractional cubic NLS in 1D

Abstract

We consider the defocusing periodic fractional nonlinear Schr\"odinger equation i ∂t u +(-)αu=- u 2 u, where 12< α < 1 and the operator (-)α is the fractional Laplacian with symbol k 2α. We establish global well-posedness in Hs(T) for s≥ 1-α2 and we conjecture this threshold to be sharp as it corresponds to the pseudo-Galilean symmetry exponent. Our proof uses the I-method to control the Hs(T)-norm of solutions with infinite energy initial data. A key component of our approach is a set of improved long-time bilinear Strichartz estimates on the rescaled torus, which allow us to exploit the subcritical nature of the equation.