manifolds and cobordisms
cobordism theory, Introduction
Definitions
Genera and invariants
Classification
Theorems
A Seifert 3-manifold is a 3-manifold which is the total space of a circle-fiber bundle (circle bundle) over a 2-dimensional orbifold. Since the circle-fibration structure may not be unique one also speaks more explicitly of Seifert-fibered manifolds.
If already the total space is a 3-orbifold, one correspondingly speaks of a Seifert orbifold etc. (e.g. Mecchia & Seppi 2020 Def. 2.6).
Fully generally one speaks of Seifert fibrations.
(Beware that there is also the un-related notion of Seifert surfaces, also considered in higher dimensions: These are coboundaries of knots.)
Beware that there is also the un-related concept of
The original article:
Lecture notes:
Monographs:
Further survery:
Discussion via diffeological spaces:
See also:
Generalization to the case that already the total space is an orbifold (not just its -quotient):
See also:
On the 3d-3d correspondence for Seifert manifolds:
Sergei Gukov, Du Pei, pp 7 in: Equivariant Verlinde formula from fivebranes and vortices, Commun. Math. Phys. 355 (2017) 1–50 [arXiv:1501.01310, doi:10.1007/s00220-017-2931-9]
Du Pei: 3d-3d correspondence for Seifert manifolds, PhD thesis (2016) [spire:1469350, pdf]
Claim of a relation between Seifert manifolds and topological order in the guise of fusion categories:
Gil Young Cho, Dongmin Gang, Hee-Cheol Kim: M-theoretic Genesis of Topological Phases, J. High Energ. Phys. 2020 115 (2020) [arXiv:2007.01532, doi:10.1007/JHEP11(2020)115]
Shawn X. Cui, Yang Qiu, Zhenghan Wang, From Three Dimensional Manifolds to Modular Tensor Categories, Commun. Math. Phys. 397 (2023) 1191–1235 [doi:10.1007/s00220-022-04517-4, arXiv:2101.01674]
Federico Bonetti, Sakura Schäfer-Nameki, Jingxiang Wu: : 3d Topological Order Labeled by Seifert Manifolds [arXiv:2403.03973]
Last revised on November 26, 2024 at 06:06:01. See the history of this page for a list of all contributions to it.