The Contact Process on Periodic Trees

Abstract

A little over 25 years ago Pemantle pioneered the study of the contact process on trees, and showed that the critical values λ1 and λ2 for global and local survival were different. Here, we will consider the case of trees in which the degrees of vertices are periodic. We will compute bounds on λ1 and λ2 and for the corresponding critical values λg and λ for branching random walk. Much of what we find for period two (a,b) trees was known to Pemantle. However, two significant new results give sharp asymptotics for the critical value λ2 of (1,n) trees and generalize that result to the (a1,…, ak, n) tree when i ai n1-ε and a1 ·s ak = nb. We also give results for λg and λ on (a,b,c) trees. Since the values come from solving cubic equations, the explicit formulas are not pretty, but it is surprising that they depend only on a+b+c and abc.