On the critical value function in the divide and color model

Abstract

The divide and color model on a graph G arises by first deleting each edge of G with probability 1-p independently of each other, then coloring the resulting connected components (i.e., every vertex in the component) black or white with respective probabilities r and 1-r, independently for different components. Viewing it as a (dependent) site percolation model, one can define the critical point rcG(p). In this paper, we mainly study the continuity properties of the function rcG, which is an instance of the question of locality for percolation. Our main result is the fact that in the case G= Z2, rcG is continuous on the interval [0,1/2); we also prove continuity at p=0 for the more general class of graphs with bounded degree. We then investigate the sharpness of the bounded degree condition and the monotonicity of rcG(p) as a function of p.