The first higher Stasheff-Tamari orders are quotients of the higher Bruhat orders

Williams, Nicholas J. (2020) The first higher Stasheff-Tamari orders are quotients of the higher Bruhat orders. Other. UNSPECIFIED.

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Abstract

We prove the conjecture that the higher Tamari orders of Dimakis and M\"uller-Hoissen coincide with the first higher Stasheff--Tamari orders. To this end, we show that the higher Tamari orders may be conceived as the image of an order-preserving map from the higher Bruhat orders to the first higher Stasheff--Tamari orders. This map is defined by taking the first cross-section of a cubillage of a cyclic zonotope. We provide a new proof that this map is surjective and show further that the map is full, which entails the aforementioned conjecture. We explain how order-preserving maps which are surjective and full correspond to quotients of posets. Our results connect the first higher Stasheff--Tamari orders with the literature on the role of the higher Tamari orders in integrable systems.

Item Type:
Monograph (Other)
Additional Information:
42 pages (1.35x line spacing), 7 figures. v2: added references and improved notation in final two sections, along with other minor changes. v3: edited paper to reflect discovery that surjectivity was already known; changed formatting
Subjects:
?? math.coprimary: 06a07, secondary: 05b45 ??
ID Code:
211592
Deposited By:
Deposited On:
15 Dec 2023 15:50
Refereed?:
No
Published?:
Published
Last Modified:
26 Sep 2024 01:11