Splitting the voter criticality

A. Lipowski; A. Lipowski; A. Lipowski; Adam Lipowski; Antonio L. Ferreira; B. Berge; F.Y. Wu; G. Grinstein; G. Kamieniarz; G. Szabo; H. Eikmans; H. Hinrichsen; H. Hinrichsen; H. Park; H. Takayasu; H.K. Janssen; I. Dornic; I. Jensen; K. Binder; K.E. Bassler; L. Frachebourg; M. Scheucher; M.H. Kim; M.J. de Oliveira; Michel Droz; N. Menyhárd; P. Grassberger; P. Grassberger; P. Grassberger; S. Fishman; U.C. Täuber

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Splitting the voter criticality

Authors: A. Lipowski
A. Lipowski
A. Lipowski
Adam Lipowski
Antonio L. Ferreira
B. Berge
F.Y. Wu
G. Grinstein
G. Kamieniarz
G. Szabo
H. Eikmans
H. Hinrichsen
H. Hinrichsen
H. Park
H. Takayasu
H.K. Janssen
I. Dornic
I. Jensen
K. Binder
K.E. Bassler
L. Frachebourg
M. Scheucher
M.H. Kim
M.J. de Oliveira
Michel Droz
N. Menyhárd
P. Grassberger
P. Grassberger
P. Grassberger
S. Fishman
U.C. Täuber
Publication date: 16 January 2003
Publisher: 'American Physical Society (APS)'
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Abstract

Recently some two-dimensional models with double symmetric absorbing states were shown to share the same critical behaviour that was called the voter universality class. We show, that for an absorbing-states Potts model with finite but further than nearest neighbour range of interactions the critical point is splitted into two critical points: one of the Ising type, and the other of the directed percolation universality class. Similar splitting takes place in the three-dimensional nearest-neighbour model.Comment: 4 pages, eps figures include

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