Connected Order Ideals and P-Partitions

Abstract

Given a finite poset P, we associate a simple graph denoted by GP with all connected order ideals of P as vertices, and two vertices are adjacent if and only if they have nonempty intersection and are incomparable with respect to set inclusion. We establish a bijection between the set of maximum independent sets of GP and the set of P-forests, introduced by F\'eray and Reiner in their study of the fundamental generating function FP(x) associated with P-partitions. Based on this bijection, in the cases when P is naturally labeled we show that FP(x) can factorise, such that each factor is a summation of rational functions determined by maximum independent sets of a connected component of GP. This approach enables us to give an alternative proof for F\'eray and Reiner's nice formula of FP(x) for the case of P being a naturally labeled forest with duplications. Another consequence of our result is a product formula to compute the number of linear extensions of P.