Spiders and their Kin: An Investigation of Stanley's Chromatic Symmetric Function for Spiders and Related Graphs.

Autor:	Foley, Angèle M., Kazdan, Joshua, Kröll, Larissa, Martínez Alberga, Sofía, Melnyk, Oleksii, Tenenbaum, Alexander
Předmět:	LIMULIDAE SYMMETRIC functions FIDDLER crabs GRAPH theory
Zdroj:	Graphs & Combinatorics; 2021, Vol. 37 Issue 1, p87-110, 24p
Abstrakt:	We study the chromatic symmetric functions of graph classes related to spiders, namely generalized spider graphs (line graphs of spiders), and what we call horseshoe crab graphs. We show that no two generalized spiders have the same chromatic symmetric function, thereby extending the work of Martin, Morin and Wagner. Additionally, we establish Query ID="Q3" Text="Please confirm if the inserted city name in affiliation [3] is correct. Amend if necessary." that a subclass of generalized spiders, which we call generalized nets, has no e-positive members, providing a more general counterexample to the necessity of the claw-free condition. We use yet another class of generalized spiders to construct a counterexample to a problem involving the e-positivity of claw-free, P 4 -sparse graphs, showing that Tsujie's result on the e-positivity of claw-free, P 4 -free graphs cannot be extended to graphs in this set. Finally, we investigate the e-positivity of another type of graphs, the horseshoe crab graphs (a class of unit interval graphs), and prove the positivity of all but one of the coefficients. This has close connections to the work of Gebhard and Sagan and Cho and Huh. [ABSTRACT FROM AUTHOR]
Databáze:	Complementary Index
Externí odkaz:	Zobrazit plný text záznamu Plný text ve formátu HTML
Nepřihlášeným uživatelům se plný text nezobrazuje	K zobrazení výsledku je třeba se přihlásit.