Connectivity of a Family of Bilateral Agreement Random Graphs

Abstract

Bilateral agreement based random undirected graphs were introduced and analyzed by La and Kabkab in 2015. The construction of the graph with n vertices in this model uses a (random) preference order on other n-1 vertices and each vertex only prefers the top k other vertices using its own preference order; in general, k can be a function of n. An edge is constructed in the ensuing graph if and only if both vertices of a potential edge prefer each other. This random graph is a generalization of the random kth-nearest neighbor graphs of Cooper and Frieze that only consider unilateral preferences of the vertices. Moharrami et al. studied the emergence of a giant component and its size in this new random graph family in the limit of n going to infinity when k is finite. Connectivity properties of this random graph family have not yet been formally analyzed. In their original paper, La and Kabkab conjectured that for k(t)=t n, with high probability connectivity happens at t>1 and the graph is disconnected for t<1. We provide a proof for this conjecture. We will also introduce an asymptotic for the average degree of this graph.