Poincar\'e polynomials of moduli spaces of one-dimensional sheaves on the projective plane

Abstract

Let Mβ denote the moduli space of stable one-dimensional sheaves on a del Pezzo surface S, supported on curves of class β with Euler characteristic one. We show that the divisibility property of the Poincar\'e polynomial of Mβ, proposed by Choi-van Garrel-Katz-Takahashi follows from Bousseau's conjectural refined sheaves/Gromov-Witten correspondence. Since this correspondence is known for S=P2, our result proves Choi-van Garrel-Katz-Takahashi's conjecture in this case. For S=P2, our proof also introduces a novel approach to computing the Poincar\'e polynomials using Gromov-Witten invariants of local P2 and a local elliptic curve. Specifically, we compute the Poincar\'e polynomials of Md with degrees d≤ 16 and derive a closed formula for the leading Betti numbers bi(Md) with d≥ 6 and i≤ 4d-22. We also propose a conjectural formula for the leading Betti numbers bi(Md) with d≥ 4 and i≤ 6d-20. In the Appendix (by M. Moreira), a more general conjecture concerning the higher range Betti numbers of Md is presented, along with another conjecture that involves refinements from the perverse/Chern filtration.