Dynamics-dependent criticality in models with q absorbing states
arXiv:cond-mat/0110404 · doi:10.1103/PhysRevE.66.016106
Abstract
We study a one-dimensional, nonequilibrium Potts-like model which has $q$ symmetric absorbing states. For $q=2$, as expected, the model belongs to the parity conserving universality class. For $q=3$ the critical behaviour depends on the dynamics of the model. Under a certain dynamics it remains generically in the active phase, which is also the feature of some other models with three absorbing states. However, a modified dynamics induces a parity conserving phase transition. Relations with branching-annihilating random walk models are discussed in order to explain such a behaviour.
5 pages, 5 eps figures included, Phys.Rev.E (accepted)