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Title
Birational geometry of generalized Hessenberg varieties and the generalized Shareshian-Wachs conjecture
KIAS Author
Kiem, Young-Hoon
Journal
JOURNAL OF COMBINATORIAL THEORY SERIES A, 2024
Archive
Abstract
We introduce generalized Hessenberg varieties and establish basic facts. We show that the Tymoczko action of the symmetric group S-n on the cohomology of Hessenberg varieties extends to generalized Hessenberg varieties and that natural morphisms among them preserve the action. By analyzing natural morphisms and birational maps among generalized Hessenberg varieties, we give an elementary proof of the Shareshian-Wachs conjecture. Moreover we present a natural generalization of the Shareshian-Wachs conjecture that involves generalized Hessenberg varieties and provide an elementary proof. As a byproduct, we propose a generalized Stanley-Stembridge conjecture for weighted graphs. Our investigation into the birational geometry of generalized Hessenberg varieties enables us to modify them into much simpler varieties like projective spaces or permutohedral varieties by explicit sequences of blowups or projective bundle maps. Using this, we provide two algorithms to compute the S-n- representations on the cohomology of generalized Hessenberg varieties. As an application, we compute representations on the low degree cohomology of some Hessenberg varieties. (c) 2024 Elsevier Inc. All rights reserved.