Determining nodes for extended dissipative systems
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We prove that two close enough points forms a set of determining nodes for the complex Ginzburg-Landau equation on the whole real line. In dimension two, a rectangular lattice of small enough lattice size forms a set of determining nodes, and the averages over the squares of this lattice form a set of determining volume elements. © 1996 IOP Publishing Ltd and LMS Publishing Ltd.
author list (cited authors)
Collet, P., & Titi, E. S.