Threshold theta geq 2 contact processes on homogeneous trees
Abstract
We study the threshold theta geq 2 contact process on a homogeneous tree Tb of degree kappa = b + 1, with infection parameter lambda geq 0 and started from a product measure with density p. The corresponding mean-field model displays a discontinuous transition at a critical point lambdacMF(kappa,theta) and for lambda geq lambdacMF(kappa,theta) it survives iff p geq pcMF(kappa,theta,lambda), where this critical density satisfies 0 < pcMF(kappa,theta,lambda) < 1, limlambda to infty pcMF(kappa,theta,lambda) = 0. For large b, we show that the process on Tb has a qualitatively similar behavior when lambda is small, including the behavior at and close to the critical point lambdac(Tb,theta). In contrast, for large lambda the behavior of the process on Tb is qualitatively distinct from that of the mean-field model in that the critical density has pc(Tb,theta,infty) := limlambda to infty pc(Tb,theta,lambda) > 0. We also show that limb to infty b lambdac(Tb,theta) = Phitheta, where 1 < Phi2 < Phi3 < ..., limtheta to infty Phitheta = infty, and 0 < liminfb to infty btheta(theta-1) pc(Tb,theta,infty) leq limsupb to infty btheta/(theta-1) pc(Tb,theta,infty) < infty.
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