arXiv:2409.12934 Abstract | arXiv Analytics

arXiv:2409.12934 [math.CO]Abstract References Reviews Resources

On $e$-positivity of trees and connected partitions

Published 2024-09-19Version 1

We prove that a tree with a vertex of degree at least five must be missing a connected partition of some type and therefore its chromatic symmetric function cannot be $e$-positive. We prove that this also holds for a tree with a vertex of degree four as long as it is not adjacent to any leaf. This brings us very close to the conjecture by Dahlberg, She, and van Willigenburg of non-$e$-positivity for all trees with a vertex of degree at least four. We also prove that spiders with four legs cannot have an $e$-positive chromatic symmetric function.

Comments: 14 pages

Categories: math.CO

Subjects: 05E05, 05C05, 05C15

Keywords: connected partition, positivity, positive chromatic symmetric function, van willigenburg

Related articles: Most relevant | Search more

arXiv:1711.07152 [math.CO] (Published 2017-11-20)

On $e$-positivity and $e$-unimodality of chromatic quasisymmetric functions

Soojin Cho, JiSun Huh

arXiv:2410.07581 [math.CO] (Published 2024-10-10)

Clocks are $e$-positive

L. Chen, Y. T. He, David G. L. Wang

arXiv:1901.02468 [math.CO] (Published 2019-01-08)