Quasi invariant Gaussian measures for the nonlinear Schr\"odinger equation on T2

Abstract

We study the transport of Gaussian measures under the flow of the 2-dimensional defocusing Schr\"odinger equation i ∂t u + u = |u|2k u posed on T2. In particular, we show that the Gaussian measures with inverse covariance \|u\|Hs2, are quasi-invariant under the flow for s>2. Moreover, we show that the Radon-Nykodim density belongs to every Lp space, locally in space. The proof relies on the physical-space energies introduced in [52], as well as a new abstract quasi-invariance argument that allows us to combine space-time estimates, along the flow with probabilistic bounds on the support of the measure.

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