(t,q)-Series Invariants of Seifert Manifolds
Abstract
Gukov, Pei, Putrov, and Vafa developed a q-series invariant of negative definite plumbed 3-manifolds with spinc structures, building on earlier work of Lawrence and Zagier. This was recently generalized to an an infinite family of two-variable (t,q)-series invariants by Akhmechet, Johnson, and Krushkal (AJK). We calculate one such series for all Seifert manifolds with b1=0. These results extend a previous theorem of Liles and McSpirit to any number of exceptional fibers and the Reduction Theorem of Gukov, Svoboda, and Katzarkov to the two-variable case. As a consequence, a previous result of Liles and McSpirit on modularity properties and radial limits is enhanced to a larger family of manifolds. We also calculate the infinite collection of (t,q)-series invariants for three infinite families of manifolds, finding mixed modularity properties for one such family.
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