A rank 2 Dijkgraaf-Moore-Verlinde-Verlinde formula

Abstract

We conjecture a formula for the virtual elliptic genera of moduli spaces of rank 2 sheaves on minimal surfaces S of general type. We express our conjecture in terms of the Igusa cusp form 10 and Borcherds type lifts of three quasi-Jacobi forms which are all related to the Weierstrass elliptic function. We also conjecture that the generating function of virtual cobordism classes of these moduli spaces depends only on (OS) and KS2 via two universal functions, one of which is determined by the cobordism classes of Hilbert schemes of points on K3. We present generalizations of these conjectures, e.g. to arbitrary surfaces with pg>0 and b1=0. We use a result of J. Shen to express the virtual cobordism class in terms of descendent Donaldson invariants. In a prequel we used T. Mochizuki's formula, universality, and toric calculations to compute such Donaldson invariants in the setting of virtual y-genera. Similar techniques allow us to verify our new conjectures in many cases.