# Antichain generating polynomials of posets

**Authors:** Jian Ding, Chao-Ping Dong

arXiv: 1905.06692 · 2019-05-17

## TL;DR

This paper derives a formula for the antichain generating polynomial of certain posets, revealing properties like palindromicity, gamma-positivity, and real-rootedness, with implications for well-known polynomials and conjectures in poset theory.

## Contribution

It provides a new explicit formula for antichain generating polynomials of product posets and explores their algebraic and combinatorial properties, including connections to classical polynomials and conjectures.

## Key findings

- Recovered $B_n$-Narayana and $D_{2n+2}$-Narayana polynomials.
- Conjectured gamma-positivity for palindromic polynomials.
- Suggested real-rootedness and log-concavity properties for specific poset families.

## Abstract

This paper gives a formula for the antichain generating polynomial $\mathcal{N}_{[k]\times Q}$ of the poset $[k]\times Q$, where $[k]$ is an arbitrary chain and $Q$ is any finite graded poset. When $Q$ specializes to be a connected minuscule poet, which was classified by Proctor in 1984, we find that the polynomial $\mathcal{N}_{[k]\times Q}$ bears nice properties. For instance, we will recover the $B_n$-Narayana polynomial and the $D_{2n+2}$-Narayana polynomial. We collect evidence for the conjecture that whenever $\mathcal{N}_{[k]\times P}(x)$ is palindromic, it must be $\gamma$-positive. Moreover, the family $\mathcal{N}_{[2]\times [n]\times [m]}$ should be real-rooted and $\mathcal{N}_{[2]\times [n]\times [n+1]}$ should be $\gamma$-positive. We also conjecture that $\mathcal{N}_{Q}(x)$ is log-concave (thus unimodal) for any connected Peck poset $Q$.

## Full text

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## References

14 references — full list in the complete paper: https://tomesphere.com/paper/1905.06692/full.md

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Source: https://tomesphere.com/paper/1905.06692