The threshold for the full perfect matching color profile in a random coloring of random graphs

Abstract

Consider a graph G with a coloring of its edge set E(G) from a set Q = c1,c2, …, cq. Let Qi be the set of all edges colored with ci. Recently, Frieze defined a notion of the perfect matching color profile denoted by (G), which is the set of vectors (m1, m2, …, mq) ∈ [n]q such that there exists a perfect matching M in G with |Qi M| = mi for all i. Let 1, 2, …, q be positive constants such that Σi=1q i = 1. Let G be the random bipartite graph Gn,n,p. Suppose the edges of G are independently colored with color ci with probability αi. We determine the threshold for the event (G) = (m1, …, mq) ∈ [0,n]q : m1 + ·s + mq = n, answering a question posed by Frieze. We further extend our methods to find the threshold for the same event in a randomly colored random graph Gn,p.