2022 Categorifications of rational Hilbert series and characters of FSop modules
Philip Tosteson
Algebra Number Theory 16(10): 2433-2491 (2022). DOI: 10.2140/ant.2022.16.2433

Abstract

We introduce a method for associating a chain complex to a module over a combinatorial category such that if the complex is exact then the module has a rational Hilbert series. We prove homology-vanishing theorems for these complexes for several combinatorial categories including the category of finite sets and injections, the opposite of the category of finite sets and surjections, and the category of finite-dimensional vector spaces over a finite field and injections.

Our main applications are to modules over the opposite of the category of finite sets and surjections, known as FSop modules. We obtain many constraints on the sequence of symmetric group representations underlying a finitely generated FSop module. In particular, we describe its character in terms of functions that we call character exponentials. Our results have new consequences for the character of the homology of the moduli space of stable marked curves, and for the equivariant Kazhdan–Lusztig polynomial of the braid matroid.

Citation

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Philip Tosteson. "Categorifications of rational Hilbert series and characters of FSop modules." Algebra Number Theory 16 (10) 2433 - 2491, 2022. https://doi.org/10.2140/ant.2022.16.2433

Information

Received: 5 August 2021; Revised: 9 September 2021; Accepted: 10 October 2021; Published: 2022
First available in Project Euclid: 14 February 2023

MathSciNet: MR4546495
zbMATH: 1509.16017
Digital Object Identifier: 10.2140/ant.2022.16.2433

Subjects:
Primary: 16G20
Secondary: 05E05 , 06A07 , 13P10 , 20C30

Keywords: representation stability , surjections

Rights: Copyright © 2022 Mathematical Sciences Publishers

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Vol.16 • No. 10 • 2022
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