A Family of Partially Ordered Sets with Small Balance Constant

Abstract

Given a finite poset P and two distinct elements x and y, we let pr P(x y) denote the fraction of linear extensions of P in which x precedes y. The balance constant δ( P) of P is then defined by \[ δ( P) = x ≠ y ∈ P \ pr P(x y), pr P(y x) \. \] The 1/3-2/3 conjecture asserts that δ( P) 13 whenever P is not a chain, but except from certain trivial examples it is not known when equality occurs, or even if balance constants can approach 1/3. In this paper we make some progress on the conjecture by exhibiting a sequence of posets with balance constants approaching 132(93-6697) ≈ 0.3488999, answering a question of Brightwell. These provide smaller balance constants than any other known nontrivial family.