Percolation transitions with nonlocal constraint

Abstract

We investigate percolation transitions in a nonlocal network model numerically. In this model, each node has an exclusive partner and a link is forbidden between two nodes whose r-neighbors share any exclusive pair. The r-neighbor of a node x is defined as a set of at most Nr neighbors of x, where N is the total number of nodes. The parameter r controls the strength of a nonlocal effect. The system is found to undergo a percolation transition belonging to the mean field universality class for r< 1/2. On the other hand, for r>1/2, the system undergoes a peculiar phase transition from a non-percolating phase to a quasi-critical phase where the largest cluster size G scales as G Nα with α = 0.74 (1). In the marginal case with r=1/2, the model displays a percolation transition that does not belong to the mean field universality class.