A note on truncated long-range percolation with heavy tails on oriented graphs

Abstract

We consider oriented long-range percolation on a graph with vertex set Zd × Z+ and directed edges of the form (x,t), (x+y,t+1), for x,y in Zd and t ∈ Z+. Any edge of this form is open with probability py, independently for all edges. Under the assumption that the values py do not vanish at infinity, we show that there is percolation even if all edges of length more than k are deleted, for k large enough. We also state the analogous result for a long-range contact process on Zd.