A percolation system with extremely long range connections and node dilution

Abstract

We study the very long-range bond-percolation problem on a linear chain with both sites and bonds dilution. Very long range means that the probability pij for a connection between two occupied sites i,j at a distance rij decays as a power law, i.e. pij = /[rijα N1-α] when 0 α < 1, and pij = /[rij (N)] when α = 1. Site dilution means that the occupancy probability of a site is 0 < ps 1. The behavior of this model results from the competition between long-range connectivity, which enhances the percolation, and site dilution, which weakens percolation. The case α=0 with ps =1 is well-known, being the exactly solvable mean-field model. The percolation order parameter P∞ is investigated numerically for different values of α, ps and . We show that in the ranges 0 α 1 and 0 < ps 1 the percolation order parameter P∞ depends only on the average connectivity γ of sites, which can be explicitly computed in terms of the three parameters α, ps and .