A Computation of the Expected Number of Posts in a Finite Random Graph Order

Abstract

A random graph order is a partial order achieved by independently sprinkling relations on a vertex set (each with probability p) and adding relations to satisfy the requirement of transitivity. A post is an element in a partially ordered set which is related to every other element. Alon et al.\ Alon proved a result for the average number of posts among the elements \1,2,...,n\ in a random graph order on Z. We refine this result by providing an expression for the average number of posts in a random graph order on \1,2,...,n\, thereby quantifying the edge effects associated with the elements Z\1,2,...,n\. Specifically, we prove that the expected number of posts in a random graph order of size n is asymptotically linear in n with a positive y-intercept. The error associated with this approximation decreases monotonically and rapidly in n, permitting accurate computation of the expected number of posts for any n and p. We also prove, as a lemma, a bound on the difference between the Euler function and its partial products that may be of interest in its own right.