Phase diagram of a probabilistic cellular automaton with three-site interactions
Abstract
We study a (1+1) dimensional probabilistic cellular automaton that is closely related to the Domany-Kinzel (DKCA), but in which the update of a given site depends on the state of three sites at the previous time step. Thus, compared with the DKCA, there is an additional parameter, p3, representing the probability for a site to be active at time t, given that its nearest neighbors and itself were active at time t-1. We study phase transitions and critical behavior for the activity and for damage spreading, using one- and two-site mean-field approximations, and simulations, for p3=0 and p3=1. We find evidence for a line of tricritical points in the (p1, p2, p3) parameter space, obtained using a mean-field approximation at pair level. To construct the phase diagram in simulations we employ the growth-exponent method in an interface representation. For p3 =0, the phase diagram is similar to the DKCA, but the damage spreading transition exhibits a reentrant phase. For p3=1, the growth-exponent method reproduces the two absorbing states, first and second-order phase transitions, bicritical point, and damage spreading transition recently identified by Bagnoli et al. [Phys. Rev. E 63, 046116 (2001)].
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