Contact process on regular tree with random vertex weights

This paper is concerned with the contact process with random vertex weights on regular trees, and studies the asymptotic behavior of the critical infection rate as the degree of the trees increasing to infinity. In this model, the infection propagates through the edge connecting vertices x and y at rate λρ(x)ρ(y) for some λ > 0, where {ρ(x), x ∈ T d } are independent and identically distributed (i.i.d.) vertex weights. We show that when d is large enough, there is a phase transition at λc(d) ∈ (0,∞) such that for λ λc(d), the contact process survives with a positive probability. Moreover, we also show that there is another phase transition at λe(d) such that for λ < λe(d), the contact process dies out at an exponential rate. Finally, we show that these two critical values have the same asymptotic behavior as d increases.