Bootstrap percolation on a graph with random and local connections

Abstract

Let Gn,p1 be a superposition of the random graph Gn,p and a one-dimensional lattice: the n vertices are set to be on a ring with fixed edges between the consecutive vertices, and with random independent edges given with probability p between any pair of vertices. Bootstrap percolation on a random graph is a process of spread of "activation" on a given realisation of the graph with a given number of initially active nodes. At each step those vertices which have not been active but have at least r ≥ 2 active neighbours become active as well. We study the size of the final active set in the limit when n→ ∞ . The parameters of the model are n, the size A0=A0(n) of the initially active set and the probability p=p(n) of the edges in the graph. Bootstrap percolation process on Gn,p was studied earlier. Here we show that the addition of n local connections to the graph Gn,p leads to a more narrow critical window for the phase transition, preserving however, the critical scaling of parameters known for the model on Gn,p. We discover a range of parameters which yields percolation on Gn,p1 but not on Gn,p.