Enumerative invariants and wall-crossing formulae in abelian categories

Dominic Joyce

arXiv:2111.04694·math.AG·November 9, 2021·5 cites

Enumerative invariants and wall-crossing formulae in abelian categories

Dominic Joyce

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TL;DR

This paper develops a universal framework for enumerative invariants in abelian categories, establishing wall-crossing formulas and applying them to various geometric contexts, confirming several conjectures.

Contribution

It introduces a new universal theory of invariants in abelian categories, defining invariants in homology and proving wall-crossing formulas using Lie algebra structures.

Findings

01

Defined invariants in homology for all stability conditions

02

Proved wall-crossing formulas relating invariants across stability conditions

03

Confirmed conjectures in algebraic geometry related to enumerative invariants

Abstract

Enumerative invariants in Algebraic Geometry 'count' $τ$ -(semi)stable objects $E$ with fixed topological invariants $[E] = a$ in some geometric problem, using a virtual class $[M_{a}^{ss} (τ)]_{virt}$ in homology, for the moduli spaces $M_{a}^{st} (τ) \subseteq M_{a}^{ss} (τ)$ of $τ$ -(semi)stable objects. We get numbers by taking integrals $\int_{[M_{a}^{ss} (τ)]_{virt}} Υ$ for cohomology classes $Υ$ . Let $A$ be a $C$ -linear abelian category in Algebraic Geometry. There are two moduli stacks of objects in $A$ : the usual moduli stack $M$ , and the 'projective linear' moduli stack $M^{pl}$ . We give $H_{*} (M)$ the structure of a vertex algebra, and $H_{*} (M^{pl})$ a Lie algebra. Virtual classes $[M_{a}^{ss} (τ)]_{virt}$ lie in $H_{*} (M^{pl})$ . We…

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Taxonomy

TopicsAlgebraic structures and combinatorial models · Homotopy and Cohomology in Algebraic Topology · Algebraic Geometry and Number Theory