3-Manifolds and VOA Characters

Miranda C.N. Cheng; Sungbong Chun; Boris Feigin; Francesca Ferrari; Sergei Gukov; Sarah M. Harrison; Davide Passaro

doi:10.1007/s00220-023-04889-1

3-Manifolds and VOA Characters

Miranda C.N. Cheng, Sungbong Chun, Boris Feigin, Francesca Ferrari, Sergei Gukov, Sarah M. Harrison, Davide Passaro

Research output: Contribution to journal › Article › peer-review

Abstract

By studying the properties of q-series Z^-invariants, we develop a dictionary between 3-manifolds and vertex algebras. In particular, we generalize previously known entries in this dictionary to Lie groups of higher rank, to 3-manifolds with toral boundaries, and to BPS partition functions with line operators. This provides a new physical realization of logarithmic vertex algebras in the framework of the 3d-3d correspondence and opens new avenues for their future study. For example, we illustrate how invoking a knot-quiver correspondence for Z^-invariants leads to many infinite families of new fermionic formulae for VOA characters.

Original language	English
Article number	44
Journal	Communications in Mathematical Physics
Volume	405
Issue number	2
DOIs	https://doi.org/10.1007/s00220-023-04889-1
State	Published - Feb 2024
Externally published	Yes

All Science Journal Classification (ASJC) codes

Statistical and Nonlinear Physics
Mathematical Physics

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10.1007/s00220-023-04889-1

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title = "3-Manifolds and VOA Characters",

abstract = "By studying the properties of q-series Z\textasciicircum{}-invariants, we develop a dictionary between 3-manifolds and vertex algebras. In particular, we generalize previously known entries in this dictionary to Lie groups of higher rank, to 3-manifolds with toral boundaries, and to BPS partition functions with line operators. This provides a new physical realization of logarithmic vertex algebras in the framework of the 3d-3d correspondence and opens new avenues for their future study. For example, we illustrate how invoking a knot-quiver correspondence for Z\textasciicircum{}-invariants leads to many infinite families of new fermionic formulae for VOA characters.",

author = "Cheng, \{Miranda C.N.\} and Sungbong Chun and Boris Feigin and Francesca Ferrari and Sergei Gukov and Harrison, \{Sarah M.\} and Davide Passaro",

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doi = "10.1007/s00220-023-04889-1",

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TY - JOUR

T1 - 3-Manifolds and VOA Characters

AU - Cheng, Miranda C.N.

AU - Chun, Sungbong

AU - Feigin, Boris

AU - Ferrari, Francesca

AU - Gukov, Sergei

AU - Harrison, Sarah M.

AU - Passaro, Davide

PY - 2024/2

Y1 - 2024/2

N2 - By studying the properties of q-series Z^-invariants, we develop a dictionary between 3-manifolds and vertex algebras. In particular, we generalize previously known entries in this dictionary to Lie groups of higher rank, to 3-manifolds with toral boundaries, and to BPS partition functions with line operators. This provides a new physical realization of logarithmic vertex algebras in the framework of the 3d-3d correspondence and opens new avenues for their future study. For example, we illustrate how invoking a knot-quiver correspondence for Z^-invariants leads to many infinite families of new fermionic formulae for VOA characters.

AB - By studying the properties of q-series Z^-invariants, we develop a dictionary between 3-manifolds and vertex algebras. In particular, we generalize previously known entries in this dictionary to Lie groups of higher rank, to 3-manifolds with toral boundaries, and to BPS partition functions with line operators. This provides a new physical realization of logarithmic vertex algebras in the framework of the 3d-3d correspondence and opens new avenues for their future study. For example, we illustrate how invoking a knot-quiver correspondence for Z^-invariants leads to many infinite families of new fermionic formulae for VOA characters.

UR - http://www.scopus.com/inward/record.url?scp=85186699831&partnerID=8YFLogxK

U2 - 10.1007/s00220-023-04889-1

DO - 10.1007/s00220-023-04889-1

M3 - مقالة

SN - 0010-3616

VL - 405

JO - Communications in Mathematical Physics

JF - Communications in Mathematical Physics

IS - 2

M1 - 44

ER -

3-Manifolds and VOA Characters

Abstract

All Science Journal Classification (ASJC) codes

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