Stability of a Nonequilibrium Interface in a Driven Phase Segregating
  System

A. J. Bray; A. M. Lacasta; B. Schmittmann; C. L. Emmot; C. Yeung; Claude A. Laberge; F. J. Alexander; G. Giacomin; J. D. Gunton; J. S. Langer; J. S. Langer; J. W. Cahn; K. Kitahara; L. K. Wickham; R. L. Pego; S. Puri; Sven Sandow

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Stability of a Nonequilibrium Interface in a Driven Phase Segregating System

Authors: A. J. Bray
A. M. Lacasta
B. Schmittmann
C. L. Emmot
C. Yeung
Claude A. Laberge
F. J. Alexander
G. Giacomin
J. D. Gunton
J. S. Langer
J. S. Langer
J. W. Cahn
K. Kitahara
L. K. Wickham
R. L. Pego
S. Puri
Sven Sandow
Publication date: 20 May 1997
Publisher: 'American Physical Society (APS)'
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Abstract

We investigate the dynamics of a nonequilibrium interface between coexisting phases in a system described by a Cahn-Hilliard equation with an additional driving term. By means of a matched asymptotic expansion we derive equations for the interface motion. A linear stability analysis of these equations results in a condition for the stability of a flat interface. We find that the stability properties of a flat interface depend on the structure of the driving term in the original equation.Comment: 14 pages Latex, 1 postscript-figur

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