Stochastic CGL equations without linear dispersion in any space dimension

We consider the stochastic CGL equation $$ \dot u- \nu\Delta u+(i+a) |u|^2u =\eta(t,x),\;\;\; \text {dim} \,x=n, $$ where $\nu>0$ and $a\ge 0$, in a cube (or in a smooth bounded domain) with Dirichlet boundary condition. The force $\eta$ is white in time, regular in $x$ and non-degenerate. We study this equation in the space of continuous complex functions $u(x)$, and prove that for any $n$ it defines there a unique mixing Markov process. So for a large class of functionals $f(u(\cdot))$ and for any solution $u(t,x)$, the averaged observable $\E f(u(t,\cdot))$ converges to a quantity, independent from the initial data $u(0,x)$, and equal to the integral of $f(u)$ against the unique stationary measure of the equation.

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Source https://hal.science/hal-00694470
Author Kuksin, Sergei, Nersesyan, Vahagn
Maintainer CCSD
Last Updated May 19, 2026, 21:39 (UTC)
Created May 19, 2026, 21:39 (UTC)
Identifier hal-00694470
Language en
Rights https://about.hal.science/hal-authorisation-v1/
contributor Centre de Mathématiques Laurent Schwartz (CMLS) ; École polytechnique (X) ; Institut Polytechnique de Paris (IP Paris)-Institut Polytechnique de Paris (IP Paris)-Centre National de la Recherche Scientifique (CNRS)
creator Kuksin, Sergei
date 2012-05-04T00:00:00
harvest_object_id 222156cc-c472-4ab1-9090-506bb46466b7
harvest_source_id 3374d638-d20b-4672-ba96-a23232d55657
harvest_source_title test moissonnage SELUNE
metadata_modified 2025-09-04T00:00:00
set_spec type:UNDEFINED