Crossover from mean-field to 2d Directed Percolation in the contact process

Abstract

We study the contact process on spatially embedded networks, consisting of a regular square lattice with long-range connections. To generate the networks, a long-range connection is randomly added to each node i of a square lattice, following the probability, Pijrij-α , where rij is the Manhattan distance between nodes i and j, and the exponent α is a tunable parameter. Extensive Monte Carlo simulations and a finite-size scaling analysis for different values of α reveal a crossover from the mean-field to 2d Directed Percolation universality class with increasing α, in the range 3<α<4.