Multilinear smoothing and local well-posedness of a stochastic quadratic nonlinear Schr\"odinger equation

Abstract

In this article, we study a d-dimensional stochastic quadratic nonlinear Schr\"odinger equation (SNLS), driven by a fractional derivative (of order -α<0) of a space-time white noise: \ arrayli∂t u- u= 2 |u|2 + ∇ -αW \, , t∈ [0,T] \, , \, x∈ Rd \, ,\\ u0 = φ\, ,array. where :Rd → R is a smooth compactly-supported function. When α < d2, the stochastic convolution is a function of time with values in a negative-order Sobolev space and the model has to be interpreted in the Wick sense by means of a time-dependent renormalization. When 1≤ d ≤ 3, combining both the classical Strichartz estimates and a deterministic local smoothing, we establish the local well-posedness of (SNLS) for a small range of α, in the spirit of Schaeffer1. Then, we revisit our arguments and establish multilinear smoothing on the second order stochastic term. This allows us to improve our local well-posedness result for some α. We point out that this is the first result concerning a Schr\"odinger equation on Rd driven by such an irregular noise and whose local well-posedness results from both a stochastic multilinear smoothing and a deterministic local one combined with Strichartz inequalities.