Almost Sure Global Well-posedness for Fractional Cubic Schr\"odinger equation on torus

Abstract

In [12], we proved that 1-d periodic fractional Schr\"odinger equation with cubic nonlinearity is locally well-posed in Hs for s>1-α2 and globally well-posed for s>5α-16. In this paper we define an invariant probability measure μ on Hs for s<α-12, so that for any ε>0 there is a set ⊂ Hs such that μ(c)<ε and the equation is globally well-posed for initial data in . We see that this fills the gap between the local well-posedness and the global well-posedness range in almost sure sense for 1-α2<α-12, i.e. α>23 in almost sure sense.