Refined 3D index

Abstract

We introduce a refined version of the 3D index for 3-manifolds, building on the construction of the 3D N=2 gauge theory T[M] by Dimofte-Gaiotto-Gukov and Gang-Yonekura. The refined index is a superconformal index of T[M] equipped with additional gradings that capture enhanced flavor symmetries of the effective theory. Our construction is based on a Dehn surgery presentation of M in terms of an ideally triangulated link complement N. We derive an explicit infinite-sum formula for the refined index and provide nontrivial checks in representative examples, supporting its invariance under changes of triangulation, Dehn surgery presentation, and other auxiliary data. As a strictly stronger invariant, the refined index enables finer distinctions among 3-manifolds and among distinct IR phases of the associated gauge theories. We also introduce a computational tool, Refined Index Calculator, for its explicit evaluation.