# The local motivic DT/PT correspondence

**Authors:** Ben Davison, Andrea T. Ricolfi

arXiv: 1905.12458 · 2021-05-05

## TL;DR

This paper establishes a motivic framework for the Quot scheme of points on ideal sheaves of lines and curves in threefolds, connecting motivic invariants with wall-crossing and Hall algebra structures.

## Contribution

It introduces a new motivic perspective on the Quot scheme, computes the motivic partition function, and refines the relation between virtual Euler characteristics and symmetric products.

## Key findings

- Quot scheme is a global critical locus.
- Computed motivic partition functions for Quot schemes.
- Established a motivic wall-crossing formula relating invariants.

## Abstract

We show that the Quot scheme $Q_L^n = \textrm{Quot}_{\mathbb A^3}(\mathscr I_L,n)$ parameterising length $n$ quotients of the ideal sheaf of a line in $\mathbb{A}^3$ is a global critical locus, and calculate the resulting motivic partition function (varying $n$), in the ring of relative motives over the configuration space of points in $\mathbb{A}^3$. As in the work of Behrend-Bryan-Szendr\H{o}i this enables us to define a virtual motive for the Quot scheme of $n$ points of the ideal sheaf $\mathscr I_C\subset \mathscr O_Y$, where $C\subset Y$ is a smooth curve embedded in a smooth 3-fold $Y$, and we compute the associated motivic partition function. The result fits into a motivic wall-crossing type formula, refining the relation between Behrend's virtual Euler characteristic of $\textrm{Quot}_Y(\mathscr I_C,n)$ and of the symmetric product $\textrm{Sym}^nC$. Our "relative" analysis leads to results and conjectures regarding the pushforward of the sheaf of vanishing cycles along the Hilbert-Chow map $Q_L^n \rightarrow \textrm{Sym}^n(\mathbb{A}^3)$, and connections with cohomological Hall algebra representations.

## Full text

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## Figures

5 figures with captions in the complete paper: https://tomesphere.com/paper/1905.12458/full.md

## References

42 references — full list in the complete paper: https://tomesphere.com/paper/1905.12458/full.md

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Source: https://tomesphere.com/paper/1905.12458