Polynomial mixing for the stochastic Schr\"odinger equation with large damping in the whole space

Abstract

We study the long-time mixing behavior of the stochastic nonlinear Schr\"odinger equation in Rd, d 3. It is well known that, under a sufficiently strong damping force, the system admits unique ergodicity, although the rate of convergence toward equilibrium has remained unknown. In this work, we address the mixing property in the regime of large damping and establish that solutions are attracted toward the unique invariant probability measure at polynomial rates of arbitrary order. Our approach is based on a coupling strategy with pathwise Strichartz estimates.

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