Constrained volume-difference site percolation model on the square lattice

Abstract

We study a percolation model with restrictions on the opening of sites on the square lattice. In this model, each site s ∈ Z2 starts closed and an attempt to open it occurs at time t=ts, where (ts)s ∈ Z2 is a sequence of independent random variables uniformly distributed on the interval [0,1]. The site will open if the volume difference between the two largest clusters adjacent to it is greater than or equal to a constant r or if it has at most one adjacent cluster. Through numerical analysis, we determine the critical threshold tc(r) for various values of r, verifying that tc(r) is non-decreasing in r and that there exists a critical value rc=5 beyond which percolation does not occur. Additionally, we find that the correlation length exponent of this model is equal to that of the ordinary percolation model. For t = 1 and 1 ≤ r ≤ 9, we estimate the averages of the density of open sites, the number of distinct cluster volumes, and the volume of the largest cluster.