Z and Splice Diagrams

Abstract

We study quantum q-series invariants of 3-manifolds Zσ of Gukov-Pei-Putrov-Vafa, using techniques from the theory of normal surface singularities such as splice diagrams. We show that the (suitably normalized) sum of all Zσ depends only on the splice diagram, and in particular, it agrees for manifolds with the same universal abelian cover. We use these ideas to find simple formulas for Zσ invariants of Seifert manifolds. Applications include a better understanding of the vanishing of the q-series Zσ. Additionally, we study moduli spaces of flat SL2(C) connections on Seifert manifolds and their relation to spectra of surface singularities, extending a result of Boden and Curtis for Brieskorn spheres to Seifert rational homology spheres with 3 singular fibers and to Seifert homology spheres with any number of fibers.