Phase transition for large dimensional contact process with random recovery rates on open clusters

Abstract

In this paper we are concerned with contact process with random recovery rates on open clusters of bond percolation on Zd. Let be a positive random variable, then we assigned i. i. d. copies of on the vertices as the random recovery rates. Assuming that each edge is open with probability p and d vertices are occupied at t=0, we prove that the following phase transition occurs. When the infection rate λ<λc=1/(p E1), then the process dies out at time O( d) with high probability as d→+∞, while when λ>λc, the process survives with high probability.