Symmetry, Integrability and Geometry: Methods and Applications (SIGMA)

SIGMA 19 (2023), 011, 27 pages      arXiv:2205.08197      https://doi.org/10.3842/SIGMA.2023.011

Refined and Generalized $\hat{Z}$ Invariants for Plumbed 3-Manifolds

Song Jin Ri ^ab
a) ICTP, Strada Costiera 11, Trieste 34151, Italy
^b) SISSA, Via Bonomea 265, Trieste 34136, Italy

Received September 05, 2022, in final form February 28, 2023; Published online March 19, 2023

Abstract
We introduce a two-variable refinement $\hat{Z}_a(q,t)$ of plumbed 3-manifold invariants $\hat{Z}_a(q)$, which were previously defined for weakly negative definite plumbed 3-manifolds. We also provide a number of explicit examples in which we argue the recovering process to obtain $\hat{Z}_a(q)$ from $\hat{Z}_a(q,t)$ by taking a limit $ t\rightarrow 1 $. For plumbed 3-manifolds with two high-valency vertices, we analytically compute the limit by using the explicit integer solutions of quadratic Diophantine equations in two variables. Based on numerical computations of the recovered $\hat{Z}_a(q)$ for plumbings with two high-valency vertices, we propose a conjecture that the recovered $\hat{Z}_a(q)$, if exists, is an invariant for all tree plumbed 3-manifolds. Finally, we provide a formula of the $\hat{Z}_a(q,t)$ for the connected sum of plumbed 3-manifolds in terms of those for the components.

Key words: $q$-series; $\hat{Z}$ invariants; plumbed 3-manifolds.

pdf (794 kb)   tex (326 kb)  

References

1. Akhmechet R., Johnson P.K., Krushkal V., Lattice cohomology and $q$-series invariants of 3-manifolds, J. Reine Angew. Math. 796 (2023), 269-299, arXiv:2109.14139.
2. Berndt B.C., Hafner J.L., Two remarkable doubly exponential series transformations of Ramanujan, Proc. Indian Acad. Sci. Math. Sci. 104 (1994), 245-252.
3. Cheng M.C.N., Chun S., Ferrari F., Gukov S., Harrison S.M., 3d modularity, J. High Energy Phys. 2019 (2019), no. 10, 010, 93 pages, arXiv:1809.10148.
4. Costantino F., Gukov S., Putrov P., Non-semisimple TQFT's and BPS $q$-series, SIGMA 19 (2023), 010, 71 pages, arXiv:2107.14238.
5. Ekholm T., Gruen A., Gukov S., Kucharski P., Park S., Sułkowski P., $\widehat{Z}$ at large $N$: from curve counts to quantum modularity, Comm. Math. Phys. 396 (2022), 143-186, arXiv:2005.13349.
6. Gukov S., Manolescu C., A two-variable series for knot complements, Quantum Topol. 12 (2021), 1-109, arXiv:1904.06057.
7. Gukov S., Pei D., Putrov P., Vafa C., BPS spectra and 3-manifold invariants, J. Knot Theory Ramifications 29 (2020), 2040003, 85 pages, arXiv:1701.06567.
8. Gukov S., Putrov P., Vafa C., Fivebranes and 3-manifold homology, J. High Energy Phys. 2017 (2017), no. 7, 071, 81 pages, arXiv:1602.05302.
9. Khovanov M., A categorification of the Jones polynomial, Duke Math. J. 101 (2000), 359-426, arXiv:math.QA/9908171.
10. Lickorish W.B.R., A representation of orientable combinatorial $3$-manifolds, Ann. of Math. 76 (1962), 531-540.
11. Neumann W.D., A calculus for plumbing applied to the topology of complex surface singularities and degenerating complex curves, Trans. Amer. Math. Soc. 268 (1981), 299-344.
12. Ozsváth P., Szabó Z., On the Floer homology of plumbed three-manifolds, Geom. Topol. 7 (2003), 185-224, arXiv:math.SG/0203265.
13. Park S., Higher rank $\hat{Z}$ and $F_K$, SIGMA 16 (2020), 044, 17 pages, arXiv:1909.13002.
14. Reshetikhin N., Turaev V.G., Invariants of $3$-manifolds via link polynomials and quantum groups, Invent. Math. 103 (1991), 547-597.
15. Sawilla R.E., Silvester A.K., Williams H.C., A new look at an old equation, in Algorithmic Number Theory, Lecture Notes in Comput. Sci., Vol. 5011, Springer, Berlin, 2008, 37-59.
16. Wallace A.H., Modifications and cobounding manifolds, Canadian J. Math. 12 (1960), 503-528.
17. Witten E., Quantum field theory and the Jones polynomial, Comm. Math. Phys. 121 (1989), 351-399.