THE BASIC REPRODUCTION RATIO R(0) FOR A SEXUALLY-TRANSMITTED-DISEASE IN A PAIR FORMATION MODEL WITH 2 TYPES OF PAIRS

We study a model for pair formation and separation with two types of p airs which differ in average duration. A fraction f of all newly forme d pairs have a long duration (denoted by ''steady''), the remaining fr action 1 - f have a short duration (''casual''). This distinction is m otivated by data about the survival times of partnerships in a sociolo gical survey. In this population we consider a sexually transmitted di sease, which can have different transmission rates in steady and in ca sual partnerships. We investigate under which conditions an epidemic c an occur after introduction of the disease into a population where the process of pair formation and separation is at equilibrium. If there is no recovery we can compute an explicit expression for the basic rep roduction ratio R(0); if we take recovery into account we can derive a condition for the stability of the disease-free equilibrium which is equivalent to R(0) < 1. We discuss how R, depends on various model par ameters.