The contact process with semi-infected state on the complete graph

Abstract

In this paper we are concerned with the contact process with semi-infected state on the complete graph Cn with n vertices. In our model, each vertex is in one of three states that `healthy', `semi-infected' or `wholly-infected'. Only wholly-infected vertices can infect others. A healthy vertex becomes semi-infected when being infected while a semi-infected vertex becomes wholly-infected when being further infected. Each (semi- and wholly-) infected vertex becomes healthy at constant rate. Our main result shows the phase transition for the time wholly-infected vertices wait for to die out. Conditioned on all the vertices are wholly-infected when t=0, we show that wholly-infected vertices survive for \O(n)\ units of time when the infection rate λ>4 while die out in O( n) units of time when λ<4.