Emergence of Social Structures via Preferential Selection

Abstract

We examine a weighted-network multi-agent model with preferential selection such that agents choose partners with the probability p(w), where w is the number of their past selections. When p(w) increases sublinearly with the number of past selections (p(w) wα, \ α<1), agents develop a uniform preference for all other agents. At α=1, this state looses stability and more complex structures form. For a superlinear increase (α>1), strong heterogeneities emerge and agents make selections mainly within small and sometimes asymmetric clusters. Even in a few-agent case, formation of such clusters resembles phase transitions with spontaneous symmetry breaking.