English
 
Help Privacy Policy Disclaimer
  Advanced SearchBrowse

Item

ITEM ACTIONSEXPORT
  A basis for the Kauffman skein module of the product of a surface and a circle

Detcherry, R., & Wolff, M. (2021). A basis for the Kauffman skein module of the product of a surface and a circle. Algebraic & Geometric Topology, 21(6), 2959-2993. doi:10.2140/agt.2021.21.2959.

Item is

Files

show Files
hide Files
:
Detcherry-Wolff_A basis for the Kauffman skein module of the product of a surface and a circle_2021.pdf (Publisher version), 3MB
Name:
Detcherry-Wolff_A basis for the Kauffman skein module of the product of a surface and a circle_2021.pdf
Description:
Dieser Beitrag ist mit Zustimmung des Rechteinhabers aufgrund einer Allianz- bzw. Nationallizenz frei zugänglich. / This publication is with permission of the rights owner freely accessible due to an Alliance licence and a national licence respectively.
OA-Status:
Green
Visibility:
Public
MIME-Type / Checksum:
application/pdf / [MD5]
Technical Metadata:
Copyright Date:
-
Copyright Info:
-
License:
-
:
OA_MSP-journals.pdf (Correspondence), 108KB
 
File Permalink:
-
Name:
OA_MSP-journals.pdf
Description:
-
OA-Status:
Visibility:
Private
MIME-Type / Checksum:
application/pdf
Technical Metadata:
Copyright Date:
-
Copyright Info:
-
License:
-

Locators

show
hide
Locator:
https://doi.org/10.2140/agt.2021.21.2959 (Publisher version)
Description:
-
OA-Status:
Not specified
Description:
-
OA-Status:
Green

Creators

show
hide
 Creators:
Detcherry, Renaud1, Author           
Wolff, Maxime, Author
Affiliations:
1Max Planck Institute for Mathematics, Max Planck Society, ou_3029201              

Content

show
hide
Free keywords: Mathematics, Geometric Topology, Quantum Algebra
 Abstract: The Kauffman bracket skein module $S(M)$ of a 3-manifold $M$ is a
$\mathbb{Q}(A)$-vector space spanned by links in $M$ modulo the so-called
Kauffman relations. In this article, for any closed oriented surface $\Sigma$
we provide an explicit spanning family for the skein modules $S(\Sigma\times
S^1)$. Combined with earlier work of Gilmer and Masbaum, we answer their
question about the dimension of $S(\Sigma\times S^1)$ being $2^{2g+1} + 2g -1$.

Details

show
hide
Language(s): eng - English
 Dates: 2021
 Publication Status: Issued
 Pages: -
 Publishing info: -
 Table of Contents: -
 Rev. Type: Peer
 Identifiers: arXiv: 2001.05421
DOI: 10.2140/agt.2021.21.2959
 Degree: -

Event

show

Legal Case

show

Project information

show

Source 1

show
hide
Title: Algebraic & Geometric Topology
Source Genre: Journal
 Creator(s):
Affiliations:
Publ. Info: Mathematical Sciences Publishers
Pages: - Volume / Issue: 21 (6) Sequence Number: - Start / End Page: 2959 - 2993 Identifier: -