English

Weakly nonlinear stochastic CGL equations

Mathematical Physics 2013-09-20 v1 Analysis of PDEs math.MP

Abstract

We consider the linear Schr\"odinger equation under periodic boundary condition, driven by a random force and damped by a quasilinear damping: ddtu+i(Δ+V(x))u=ν(Δu\gru2pui\giu2qu)+νη(t,x).() \frac{d}{dt}u+i\big(-\Delta+V(x)\big) u=\nu \Big(\Delta u-\gr |u|^{2p}u-i\gi |u|^{2q}u \Big) +\sqrt\nu\, \eta(t,x).\qquad (*) The force η\eta is white in time and smooth in xx. We are concerned with the limiting, as ν0\nu\to0, behaviour of its solutions on long time-intervals 0tν1T0\le t\le\nu^{-1}T, and with behaviour of these solutions under the double limit tt\to\infty and ν0\nu\to0. We show that these two limiting behaviours may be described in terms of solutions for the {\it system of effective equations for ()(*)} which is a well posed semilinear stochastic heat equation with a non-local nonlinearity and a smooth additive noise, written in Fourier coefficients. The effective equations do not depend on the Hamiltonian part of the perturbation i\giu2qu-i\gi|u|^{2q}u (but depend on the dissipative part \gru2pu-\gr|u|^{2p}u). If pp is an integer, they may be written explicitly.

Keywords

Cite

@article{arxiv.1106.1158,
  title  = {Weakly nonlinear stochastic CGL equations},
  author = {Sergei B. Kuksin},
  journal= {arXiv preprint arXiv:1106.1158},
  year   = {2013}
}
R2 v1 2026-06-21T18:18:32.465Z