Pandharipande-Thomas theory of elliptic threefolds, quasi-Jacobi forms and holomorphic anomaly equations

Abstract

Let π : X B be an elliptically fibered threefold satisfying c3(TX ωX)=0. We conjecture that the π-relative generating series of Pandharipande-Thomas invariants of X are quasi-Jacobi forms and satisfy two holomorphic anomaly equations. For elliptic Calabi-Yau threefolds our conjectures specialize to the Huang-Katz-Klemm conjecture. The proposed formulas constitute the first case of holomorphic anomaly equations in Pandharipande-Thomas theory. We prove our conjectures for the equivariant Pandharipande-Thomas theory of C2 × E when specialized to the anti-diagonal action. For K3 × C we state reduced versions of our conjectures. As a corollary we find an explicit conjectural formula for the stationary theory generalizing the Katz-Klemm-Vafa formula for K3 surfaces. Further evidence is available for P2 × E based on earlier work of the second author. To deal with elliptic threefolds with c3(TX ωX) ≠ 0 we show that the moduli space of π-stable pairs is represented by a proper algebraic space. We conjecture that the associated π-stable pair invariants form quasi-Jacobi forms.