Modular bootstrap for D4-D2-D0 indices on compact Calabi-Yau threefolds

Abstract

We investigate the modularity constraints on the generating series hr(τ) of BPS indices counting D4-D2-D0 bound states with fixed D4-brane charge r in type IIA string theory compactified on complete intersection Calabi-Yau threefolds with b2 = 1. For unit D4-brane, h1 transforms as a (vector-valued) modular form under the action of SL(2,Z) and thus is completely determined by its polar terms. We propose an Ansatz for these terms in terms of rank 1 Donaldson-Thomas invariants, which incorporates contributions from a single D6-anti-D6 pair. Using an explicit overcomplete basis of the relevant space of weakly holomorphic modular forms (valid for any r), we find that for 10 of the 13 allowed threefolds, the Ansatz leads to a solution for h1 with integer Fourier coefficients, thereby predicting an infinite series of DT invariants.For r > 1, hr is mock modular and determined by its polar part together with its shadow. Restricting to r = 2, we use the generating series of Hurwitz class numbers to construct a series han2 with exactly the same modular anomaly as h2, so that the difference h2-han2 is an ordinary modular form fixed by its polar terms. For lack of a satisfactory Ansatz, we leave the determination of these polar terms as an open problem.