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 on homogeneous trees the critical values λ1 and λ2 for global and local survival were different. He also considered trees with periodic degree sequences, and Galton-Watson trees. Here, we will consider periodic trees in which the number of children in successive generation is (n,a1,…, ak) with i ai Cn1-δ and (a1 ·s ak)/ n b as n∞. We show that the critical value for local survival is asymptotically c ( n)/n where c=(k-b)/2. This supports Pemantle's claim that the critical value is largely determined by the maximum degree, but it also shows that the smaller degrees can make a significant contribution to the answer.