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doi:10.1016/j.cam.2005.11.028 
Copyright © 2005 Elsevier B.V. All rights reserved.
Fourier spectral approximation to long-time behaviour of the derivative three-dimensional Ginzburg–Landau equation
Received 12 July 2005;
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Abstract
In this paper, we consider a derivative Ginzburg–Landau equation with periodic initial-value condition in three-dimensional space. A fully discrete Galerkin–Fourier spectral approximation scheme is constructed, and then the dynamical behaviour of the discrete system is analysed. Firstly, the existence of global attractors of the discrete system are proved by a priori estimate of the discrete solution. Next, the convergence of approximate attractors is proved by error estimates of the discrete solution. Furthermore, the long-time convergence as N→∞ and τ→0 simultaneously as well as the numerical long-time stability of the discrete scheme are obtained.
Keywords: Derivative Ginzburg–Landau equation; Global attractor; Spectral methods; Long-time stability; Long-time convergence
Mathematical subject codes: 65M60; 65N35; 65N30
