Vortex Dynamics in Dissipative Systems

A. L. Fetter; A. T. Winfree; C. Elphick; D. R. Tilley; E. Madelung; E. P. Gross; Elsebeth Schröder; G. Huber; G. K. Batchelor; I. S. Aranson; J. Dziarmaga; J. P. Keener; J. P. Keener; K. Kawasaki; L. Gil; M. C. Cross; M. Peach; M. Spivak; Ola Törnkvist; P. Coullet; P. S. Hagan; S. Müller; S. Rica; T. Bohr; U. Ben-Ya'acov; U. Ben-Ya'acov; V. T. Ginzburg; Y. Kuramoto

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Vortex Dynamics in Dissipative Systems

Authors: A. L. Fetter
A. T. Winfree
C. Elphick
D. R. Tilley
E. Madelung
E. P. Gross
Elsebeth Schröder
G. Huber
G. K. Batchelor
I. S. Aranson
J. Dziarmaga
J. P. Keener
J. P. Keener
K. Kawasaki
L. Gil
M. C. Cross
M. Peach
M. Spivak
Ola Törnkvist
P. Coullet
P. S. Hagan
S. Müller
S. Rica
T. Bohr
U. Ben-Ya'acov
U. Ben-Ya'acov
V. T. Ginzburg
Y. Kuramoto
Publication date: 4 November 1996
Publisher: 'American Physical Society (APS)'
Doi

Abstract

We derive the exact equation of motion for a vortex in two- and three- dimensional non-relativistic systems governed by the Ginzburg-Landau equation with complex coefficients. The velocity is given in terms of local gradients of the magnitude and phase of the complex field and is exact also for arbitrarily small inter-vortex distances. The results for vortices in a superfluid or a superconductor are recovered.Comment: revtex, 5 pages, 1 encapsulated postscript figure (included), uses aps.sty, epsf.te

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