On the convergence of percolation probability functions to cumulative distribution functions on square lattices with (1,0)-neighborhood

Abstract

We consider a percolation model on square lattices with sites weighted by beta-distributed random variables S Beta(a,b) with a positive real parameters a>0 and b>0. Using the Monte Carlo method, we estimate the percolation probability P∞ as a relative frequency P*∞ averaged over the target subset of sites on a square lattice. As a result of the comparative analysis, we formulate two empirical hypotheses: the first on the correspondence of percolation thresholds pc to p0-quantiles (where p0=0.592746…) of random variables Si weighing sites of the square lattice with (1,0)-neighborhood, and the second on the convergence of statistical estimates of percolation probability functions P*∞(p) to cumulative distribution functions FSi(p) of these variables Si for the supercritical values of the occupation probability p≥ pc.