Counting spinning dyons in maximal supergravity: The Hodge-elliptic genus for tori

Abstract

We consider M-theory compactified on T4 × T2 and describe the count of spinning 1/8-BPS states. This refines the classic count of Maldacena-Moore-Strominger in the physics literature and the recent mathematical work of Bryan-Oberdieck-Pandharipande-Yin, which studied reduced Donaldson-Thomas invariants of abelian surfaces and threefolds. As in previous work on K3 × T2 compactification, we track angular momenta under both the SU(2)L and SU(2)R factors in the 5d little group, providing predictions for the relevant motivic curve counts.