The Hodge-elliptic genus, spinning BPS states, and black holes

Abstract

We perform a refined count of BPS states in the compactification of M-theory on K3 × T2, keeping track of the information provided by both the SU(2)L and SU(2)R angular momenta in the SO(4) little group. Mathematically, this four variable counting function may be expressed via the motivic Donaldson-Thomas counts of K3 × T2, simultaneously refining Katz, Klemm, and Pandharipande's motivic Donaldson-Thomas counts on K3 and Oberdieck-Pandharipande's Gromov-Witten counts on K3 × T2. This provides the first full answer for motivic curve counts of a compact Calabi-Yau threefold. Along the way, we develop a Hodge-elliptic genus for Calabi-Yau manifolds -- a new counting function for BPS states that interpolates between the Hodge polynomial and the elliptic genus of a Calabi-Yau.