An Introduction to Modern Enumerative Geometry with Applications to the Banana Manifold

Abstract

The banana manifold Xban is a smooth projective Calabi-Yau threefold fibered over P1 by abelian surfaces. Each singular fiber contains a "banana configuration of curves" which generates the rank-three lattice of curve classes supported in the fibers of Xban1. The Donaldson-Thomas partition function of Xban in fiber classes was computed by J. Bryan (arXiv:1902.08695) to be the infinite product \[ZDT(Xban)= Πd1,d2,d3≥0Πk∈Z(1-Q1d1Q2d2Q3d3tk)-12c(||d||,k)\] where ||d||=2d1d2+2d1d3+2d2d3-d12-d22-d32, and c(||d||,k) are coefficients of the equivariant elliptic genus of C2. We observe that under a change of variables, ZDT(Xban) behaves formally like a Borcherds lift of the equivariant elliptic genus. The main result of this thesis is that the associated Gromov-Witten potentials Fg in genus g≥2 are meromorphic genus two Siegel modular forms of weight 2g-2. They arise as Maass lifts of weak Jacobi forms of weight 2g-2 and index 1 arising in an expansion of the elliptic genus in the equivariant parameter. We show the equivariant elliptic genus of C2 encodes the Gopakumar-Vafa invariants of Xban. Therefore, one can regard Xban as an example where the generating functions of Gromov-Witten and Donaldson-Thomas invariants in fiber classes are produced by standard lifts of a modular object encoding the Gopakumar-Vafa invariants. We note that because this is a Masters thesis, the first six chapters offer an extended introduction to the relevant background material, while the original results are presented in the final chapter.