Universality of the Crossing Probability for the Potts Model for q=1,2,3,4
Abstract
The universality of the crossing probability πhs of a system to percolate only in the horizontal direction, was investigated numerically by using a cluster Monte-Carlo algorithm for the q-state Potts model for q=2,3,4 and for percolation q=1. We check the percolation through Fortuin-Kasteleyn clusters near the critical point on the square lattice by using representation of the Potts model as the correlated site-bond percolation model. It was shown that probability of a system to percolate only in the horizontal direction πhs has universal form πhs=A(q) Q(z) for q=1,2,3,4 as a function of the scaling variable z= [ b(q)L1(q)(p-pc(q,L)) ]ζ(q). Here, p=1-(-β) is the probability of a bond to be closed, A(q) is the nonuniversal crossing amplitude, b(q) is the nonuniversal metric factor, ζ(q) is the nonuniversal scaling index, (q) is the correlation length index. The universal function Q(x) (-z). Nonuniversal scaling factors were found numerically.
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