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Symmetry, Integrability and Geometry: Methods and Applications, 2020, Volume 16, 044, 17 pp.
DOI: https://doi.org/10.3842/SIGMA.2020.044
(Mi sigma1581)
 

This article is cited in 15 scientific papers (total in 15 papers)

Higher Rank $\hat{Z}$ and $F_K$

Sunghyuk Park

California Institute of Technology, Pasadena, USA
References:
Abstract: We study $q$-series-valued invariants of $3$-manifolds that depend on the choice of a root system $G$. This is a natural generalization of the earlier works by Gukov–Pei–Putrov–Vafa [arXiv:1701.06567] and Gukov–Manolescu [arXiv:1904.06057] where they focused on $G={\rm SU}(2)$ case. Although a full mathematical definition for these “invariants” is lacking yet, we define $\hat{Z}^G$ for negative definite plumbed $3$-manifolds and $F_K^G$ for torus knot complements. As in the $G={\rm SU}(2)$ case by Gukov and Manolescu, there is a surgery formula relating $F_K^G$ to $\hat{Z}^G$ of a Dehn surgery on the knot $K$. Furthermore, specializing to symmetric representations, $F_K^G$ satisfies a recurrence relation given by the quantum $A$-polynomial for symmetric representations, which hints that there might be HOMFLY-PT analogues of these $3$-manifold invariants.
Keywords: $3$-manifold, knot, quantum invariant, complex Chern–Simons theory, TQFT, $q$-series, colored Jones polynomial, colored HOMFLY-PT polynomial.
Funding agency Grant number
Kwanjeong Educational Foundation
The author was supported by Kwanjeong Educational Foundation.
Received: January 15, 2020; in final form May 11, 2020; Published online May 24, 2020
Bibliographic databases:
Document Type: Article
MSC: 57K16, 57K31, 81R50
Language: English
Citation: Sunghyuk Park, “Higher Rank $\hat{Z}$ and $F_K$”, SIGMA, 16 (2020), 044, 17 pp.
Citation in format AMSBIB
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\by Sunghyuk~Park
\paper Higher Rank $\hat{Z}$ and $F_K$
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\vol 16
\papernumber 044
\totalpages 17
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  • This publication is cited in the following 15 articles:
    Citing articles in Google Scholar: Russian citations, English citations
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