Is the Percolation Probability on Zd with Long Range Connections Monotone?

Abstract

We present a numerical study for the threshold percolation probability, pc, in the bond percolation model with multiple ranges, in the square lattice. A recent Theorem demonstrated by de Lima et al. [B. N. B. de Lima, R. P. Sanchis, R. W. C. Silva, STOCHASTIC PROC APPL 121, 2043-2048 (2011)] states that the limit value of pc when the long ranges go to infinity converges to the bond percolation threshold in the hypercubic lattice, Zd, for some appropriate dimension d. We present the first numerical estimations for the percolation threshold considering two-range and three-range versions of the model. Applying a finite size analysis to the simulation data, we sketch the dependence of pc in function of the range of the largest bond. We shown that, for the two-range model, the percolation threshold is a non decreasing function, as conjectured in the cited work, and converges to the predicted value. However, the results to the three-range case exhibit a surprising non-monotonic behavior for specific combinations of the long range lengths, and the convergence to the predicted value is less evident, raising new questionings on this fascinating problem.