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Main Authors: Kodani, Hisatoshi, Nozaki, Yuta
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2512.19132
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author Kodani, Hisatoshi
Nozaki, Yuta
author_facet Kodani, Hisatoshi
Nozaki, Yuta
contents The Kontsevich invariant of links is independent of the choice of associator, whereas for tangles this is not the case in general. In this paper, we focus on $2$-component string links and investigate to what extent the Kontsevich invariant depends on the choice of associator. As an application, we show that the action of the unipotent part of the Grothendieck--Teichmüller group on the algebra of proalgebraic $2$-component string links is non-trivial, which provides a partial answer to a problem posed by Furusho.
format Preprint
id arxiv_https___arxiv_org_abs_2512_19132
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle The Kontsevich invariant and the action of the Grothendieck--Teichmüller group on $2$-component string links
Kodani, Hisatoshi
Nozaki, Yuta
Quantum Algebra
Geometric Topology
Number Theory
57K16, 14G32 (Primary) 57K10, 17B01 (Secondary)
The Kontsevich invariant of links is independent of the choice of associator, whereas for tangles this is not the case in general. In this paper, we focus on $2$-component string links and investigate to what extent the Kontsevich invariant depends on the choice of associator. As an application, we show that the action of the unipotent part of the Grothendieck--Teichmüller group on the algebra of proalgebraic $2$-component string links is non-trivial, which provides a partial answer to a problem posed by Furusho.
title The Kontsevich invariant and the action of the Grothendieck--Teichmüller group on $2$-component string links
topic Quantum Algebra
Geometric Topology
Number Theory
57K16, 14G32 (Primary) 57K10, 17B01 (Secondary)
url https://arxiv.org/abs/2512.19132