Virtual Poincar\'e polynomial of the space of stable pairs supported on quintic curves

TL;DR

This paper investigates the moduli space of $ ext{alpha}$-stable pairs on the projective plane for specific parameters, analyzing wall crossing phenomena and computing the virtual Poincaré polynomial for the case $(d, ext{chi})=(5,2)$, revealing new geometric insights.

Contribution

It provides the first detailed study of wall crossing for the space of stable pairs with $(d, ext{chi})=(5,2)$ and computes its virtual Poincaré polynomial, linking to Bridgeland stability.

Findings

Wall crossing analysis for $(d, ext{chi})=(5,2)$

Computation of the virtual Poincaré polynomial

Connection with Bridgeland wall crossing

Abstract

Let $\mathbf{M}^{\alpha}(d,\chi)$ be the moduli space of $\alpha$-stable pairs $(s,F)$ on the projective plane $\mathbb{P}^2$ with Hilbert polynomial $\chi(F(m))=dm+\chi$. For sufficiently large $\alpha$ (denoted by $\infty$), it is well known that the moduli space is isomorphic to the relative Hilbert scheme of points over the universal degree $d$ plane curves. For the general $(d,\chi)$, the relative Hilbert scheme does not have a bundle structure over the Hilbert scheme of points. In this paper, as the first non trivial such a case, we study the wall crossing of the $\alpha$-stable pairs space when $(d,\chi)=(5,2)$. As a direct corollary, by combining with Bridgeland wall crossing of the moduli space of stable sheaves, we compute the virtual Poincar\'e polynomial of $\mathbf{M}^{\infty}(5,2)$.