The Donaldson-Thomas partition function of the banana manifold

Abstract

A banana manifold is a compact Calabi-Yau threefold, fibered by Abelian surfaces, whose singular fibers have a singular locus given by a "banana configuration of curves". A basic example is given by Xban, the blowup along the diagonal of the fibered product of a generic rational elliptic surface S P1 with itself. In this paper we give a closed formula for the Donaldson-Thomas partition function of the banana manifold Xban restricted to the 3-dimensional lattice of curve classes supported in the fibers of Xban P1. It is given by \[ Z(Xban) = Πd1,d2,d3≥ 0 Πk (1-pkQ1d1Q2d2Q3d3)-12c(||d ||,k) \] where ||d || = 2d1d2+ 2d2d3+ 2d3d1-d12-d22-d32, and the coefficients c(a,k) have a generating function given by an explicit ratio of theta functions. This formula has interesting properties and is closely realated to the equivariant elliptic genera of Hilb (C2). In an appendix with S. Pietromonaco, it is shown that the corresponding genus g Gromov-Witten potential Fg is a genus 2 Siegel modular form of weight 2g-2 for g≥ 2; namely it is the Skoruppa-Maass lift of a multiple of an Eisenstein series: 6|B2g|g(2g-2)! E2g(τ ).