2020
DOI: 10.1007/jhep09(2020)152
|View full text |Cite
|
Sign up to set email alerts
|

3d-3d correspondence for mapping tori

Abstract: One of the main challenges in 3d-3d correspondence is that no existent approach offers a complete description of 3d $$ \mathcal{N} $$ N = 2 SCFT T [M3] — or, rather, a “collection of SCFTs” as we refer to it in the paper — for all types of 3-manifolds that include, for example, a 3-torus, Brieskorn spheres, and hyperbolic surgeries on knots. The goal of this paper is to overcome this challenge by a more systematic study of 3d-3d correspondence that, first of all, does not rely heavily on any geometric structu… Show more

Help me understand this report
View preprint versions

Search citation statements

Order By: Relevance

Paper Sections

Select...
4
1

Citation Types

2
45
0

Year Published

2020
2020
2024
2024

Publication Types

Select...
6

Relationship

1
5

Authors

Journals

citations
Cited by 27 publications
(47 citation statements)
references
References 96 publications
(179 reference statements)
2
45
0
Order By: Relevance
“…In this paper, the main goal is to extend the resurgent analysis of the analytically continued SU(2) Chern-Simons partition function defined on a family of Brieskorn spheres Σ(2, 3, 6n + 5) where n ∈ Z + and 6n + 5 is prime. We provide supporting evidence to the claims made in [2] on theẐ-invariants introduced in [3] that has already been initiated in various contexts [4,6,7,[25][26][27]. 4 Similar to the discussion in section 3.4 and 3.5 in [2] and [6], We will start with, in section 2, the general partition function for our interested Brieskorn spheres Σ(2, 3, 6n + 5) from the generating function introduced in [3] along with special cases of [5,27].…”
Section: Jhep02(2021)008supporting
confidence: 89%
See 3 more Smart Citations
“…In this paper, the main goal is to extend the resurgent analysis of the analytically continued SU(2) Chern-Simons partition function defined on a family of Brieskorn spheres Σ(2, 3, 6n + 5) where n ∈ Z + and 6n + 5 is prime. We provide supporting evidence to the claims made in [2] on theẐ-invariants introduced in [3] that has already been initiated in various contexts [4,6,7,[25][26][27]. 4 Similar to the discussion in section 3.4 and 3.5 in [2] and [6], We will start with, in section 2, the general partition function for our interested Brieskorn spheres Σ(2, 3, 6n + 5) from the generating function introduced in [3] along with special cases of [5,27].…”
Section: Jhep02(2021)008supporting
confidence: 89%
“…We provide supporting evidence to the claims made in [2] on theẐ-invariants introduced in [3] that has already been initiated in various contexts [4,6,7,[25][26][27]. 4 Similar to the discussion in section 3.4 and 3.5 in [2] and [6], We will start with, in section 2, the general partition function for our interested Brieskorn spheres Σ(2, 3, 6n + 5) from the generating function introduced in [3] along with special cases of [5,27]. Then, using the resurgence properties of mock modular forms to analyze the homological blocks [2], we will provide a general expression of the Borel transformed Chern-Simons partition function that reveals the structure of poles in the Borel plane for Σ(2, 3, 6n + 5).…”
Section: Jhep02(2021)008supporting
confidence: 89%
See 2 more Smart Citations
“…Furthermore we conjecture that our 0-surgery formula in [7] holds for higher rank as well: Conjecture 3.6 (higher rank 0-surgery formula). Let K ⊂ S 3 be a knot.…”
Section: Higher Rank F Kmentioning
confidence: 84%