Opinion dynamics for an increasing population of agents. A symmetric continuous agent model

Abstract

In this paper we formulate a continuous opinion model that takes into account population growth, i.e. increase with time in the number of interacting agents N(t). In our setting the population growth is governed by a generic growth rate function b(t, N(t)). The two main components of our model are the growth rate b(t, N(t)), as well as the opinions of the incoming agents which are modeled in our system as boundary conditions in a free boundary problem. We give results on the well-posedness of the model and results that showcase how these two components affect the long time asymptotic behavior of our system. Moreover, we provide a kinetic (probabilistic) description of our model and give results on well-posedness and asymptotics for the kinetic model.