The Gromov-Witten invariants of the Hilbert schemes of points on surfaces with pg > 0

Abstract

In this paper, we study the Gromov-Witten theory of the Hilbert schemes X[n] of points on smooth projective surfaces X with positive geometric genus pg. Using cosection localization technique due to Y. Kiem and J. Li [KL1, KL2], we prove that if X is a simply connected surface admitting a holomorphic differential two-form with irreducible zero divisor, then all the Gromov-Witten invariants of X[n] defined via the moduli space g, r(X[n], β) vanish except possibly when β = d0 βKX - d βn where d is an integer, d0 0 is a rational number, and βn and βKX are defined in (3.2) and (3.3) respectively. When n=2, the exceptional cases can be further reduced to the invariants: <1>0, βKX - dβ2X[2] with KX2 = 1 and d 3, and <1>1, dβ2X[2] with d 1. We show that when KX2 = 1, <1>0, βKX - 3 β2X[2] = (-1)( OX) which is consistent with a well-known formula of Taubes [Tau]. In addition, for an arbitrary smooth projective surface X and d 1, we verify that <1>1, dβ2X[2] = KX2/(12d).