On the Linearized Artin Braid Representation

We linearize the Artin representation of the braid group given by (right) automorphisms of a free group providing a linear faithful representation of the braid group. This result is generalized to obtain linear representations for the coloured braid groupoid and pure braid group too. Applications to some areas of two-dimensional physics are mentioned.

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The Interplay between Linear Representations of the Braid Group

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/2007/16186 ◽

2007 ◽

Vol 2007 ◽

pp. 1-9

Author(s):

Mohammad N. Abdulrahim ◽

Nibal H. Kassem

Keyword(s):

Free Group ◽

Braid Group ◽

Burau Representation ◽

Standard Representation ◽

Linear Representations ◽

Standard Action ◽

Composition Factors

We consider Wada's representation as a twisted version of the standard action of the braid group,Bn, on the free group withngenerators. Constructing a free group,Gnm, of ranknm, we compose Cohen's mapBn→Bnmand the embeddingBnm→Aut(Gnm)via Wada's map. We prove that the composition factors of the obtained representation are one copy of Burau representation andm−1copies of the standard representation after changing the parameterttotkin the definitions of the Burau and standard representations. This is a generalization of our previous result concerning the standard Artin representation of the braid group.

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Planar pure braids on six strands

Journal of Knot Theory and Its Ramifications ◽

10.1142/s0218216519500974 ◽

2020 ◽

Vol 29 (01) ◽

pp. 1950097

Author(s):

Jacob Mostovoy ◽

Christopher Roque-Márquez

Keyword(s):

Abelian Group ◽

Fundamental Group ◽

Free Product ◽

Free Group ◽

Configuration Space ◽

Braid Group ◽

Free Abelian Group ◽

Braid Groups ◽

Pure Braid Group

The group of planar (or flat) pure braids on [Formula: see text] strands, also known as the pure twin group, is the fundamental group of the configuration space [Formula: see text] of [Formula: see text] labeled points in [Formula: see text] no three of which coincide. The planar pure braid groups on 3, 4 and 5 strands are free. In this note, we describe the planar pure braid group on 6 strands: it is a free product of the free group on 71 generators and 20 copies of the free abelian group of rank two.

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EXTENDING REPRESENTATIONS OF BRAID GROUPS TO THE AUTOMORPHISM GROUPS OF FREE GROUPS

Journal of Knot Theory and Its Ramifications ◽

10.1142/s0218216505004251 ◽

2005 ◽

Vol 14 (08) ◽

pp. 1087-1098 ◽

Cited By ~ 7

Author(s):

VALERIJ G. BARDAKOV

Keyword(s):

Free Group ◽

Braid Group ◽

Automorphism Groups ◽

Free Groups ◽

Linear Representation ◽

Braid Groups ◽

Burau Representation ◽

Pure Braid Group

We construct a linear representation of the group IA (Fn) of IA-automorphisms of a free group Fn, an extension of the Gassner representation of the pure braid group Pn. Although the problem of faithfulness of the Gassner representation is still open for n > 3, we prove that the restriction of our representation to the group of basis conjugating automorphisms Cbn contains a non-trivial kernel even if n = 2. We construct also an extension of the Burau representation to the group of conjugating automorphisms Cn. This representation is not faithful for n ≥ 2.

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ON THE COMPOSITION OF THE BURAU REPRESENTATION AND THE NATURAL MAP Bn → Bnk

Journal of Algebra and Its Applications ◽

10.1142/s0219498803000465 ◽

2003 ◽

Vol 02 (02) ◽

pp. 169-175 ◽

Cited By ~ 2

Author(s):

MOHAMMAD N. ABDULRAHIM

Keyword(s):

Free Group ◽

Braid Group ◽

Linear Representation ◽

Burau Representation ◽

Standard Representation ◽

Linear Representations ◽

Group B ◽

Composition Factors

A lot of linear representations of the braid group, Bn, arise as a result of treating braids as automorphisms of a free group. In this paper, we consider the composition of F. R. Cohen's map Bn → Bnk and the embedding Bnk → Aut (Fnk). This gives us a linear representation of Bn whose composition factors are one copy of the Burau representation and k - 1 copies of the standard representation, a representation investigated by I. Sysoeva.

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On the Andreadakis Problem for Subgroups of $IA_n$

International Mathematics Research Notices ◽

10.1093/imrn/rnz237 ◽

2019 ◽

Author(s):

Jacques Darné

Keyword(s):

Free Group ◽

Braid Group ◽

Lower Central Series ◽

Central Series ◽

Pure Braid Group ◽

The Difference

Abstract Let $F_n$ be the free group on $n$ generators. Consider the group $IA_n$ of automorphisms of $F_n$ acting trivially on its abelianization. There are two canonical filtrations on $IA_n$: the 1st one is its lower central series $\Gamma _*$; the 2nd one is the Andreadakis filtration $\mathcal A_*$, defined from the action on $F_n$. The Andreadakis problem consists in understanding the difference between these filtrations. Here, we show that they coincide when restricted to the subgroup of triangular automorphisms and to the pure braid group.

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On the irreducibility of linear representations of the pure braid group

Tamkang Journal of Mathematics ◽

10.5556/j.tkjm.41.2010.727 ◽

2010 ◽

Vol 41 (3) ◽

pp. 283-292

Author(s):

Mohammad N. Abdulrahim

Keyword(s):

Tensor Product ◽

Braid Group ◽

Sufficient Condition ◽

Pure Braid Group ◽

Linear Representations

Following up on our result in [1], we find a milder sufficient condition for the tensor product of specializations of the reduced Gassner representation of the pure braid group to be irreducible. We prove that $G_n(x_1, \ldots, x_n) \otimes G_n(y_1, \ldots, y_n) : P_n \to GL(\mathbb{C}^{n-1} \otimes \mathbb{C}^{n-1})$ is irreducible if $x_i \neq \pm y_i $ and $x_j \neq \pm {{y_j}^{-1}} $ for some $i$ and $j$.

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Tensor Products of the Gassner Representation of The Pure Braid Group

The Open Mathematics Journal ◽

10.2174/1874117700902010012 ◽

2009 ◽

Vol 2 (1) ◽

pp. 12-15

Author(s):

Mohammad N. Abdulrahim

Keyword(s):

Braid Group ◽

Tensor Products ◽

Pure Braid Group

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The normal closure of a power of a half-twist has infinite index in the mapping class group of a punctured sphere

Journal of Topology and Analysis ◽

10.1142/s1793525319500122 ◽

2019 ◽

Vol 11 (02) ◽

pp. 273-292

Author(s):

Charalampos Stylianakis

Keyword(s):

Free Group ◽

Braid Group ◽

Mapping Class Group ◽

Abelian Subgroup ◽

Infinite Order ◽

Class Group ◽

Normal Closure ◽

Mapping Class ◽

Infinite Index ◽

Half Twist

In this paper we show that the normal closure of the [Formula: see text]th power of a half-twist has infinite index in the mapping class group of a punctured sphere if [Formula: see text] is at least five. Furthermore, in some cases we prove that the quotient of the mapping class group of the punctured sphere by the normal closure of a power of a half-twist contains a free abelian subgroup. As a corollary we prove that the quotient of the hyperelliptic mapping class group of a surface of genus at least two by the normal closure of the [Formula: see text]th power of a Dehn twist has infinite order, and for some integers [Formula: see text] the quotient contains a free group. As a second corollary we recover a result of Coxeter: the normal closure of the [Formula: see text]th power of a half-twist in the braid group of at least four strands has infinite index. Our method is to reformulate the Jones representation of the mapping class group of a punctured sphere, using the action of Hecke algebras on [Formula: see text]-graphs, as introduced by Kazhdan–Lusztig.

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Representation Stability of Power Sets and Square Free Polynomials

Canadian Journal of Mathematics ◽

10.4153/cjm-2014-029-2 ◽

2015 ◽

Vol 67 (5) ◽

pp. 1024-1045

Author(s):

Samia Ashraf ◽

Haniya Azam ◽

Barbu Berceanu

Keyword(s):

Symmetric Group ◽

Braid Group ◽

Point Of View ◽

Pure Braid Group ◽

Representation Stability ◽

Stability Point ◽

Power Set ◽

The Stability

AbstractThe symmetric group 𝓢n acts on the power set 𝓟(n) and also on the set of square free polynomials in n variables. These two related representations are analyzed from the stability point of view. An application is given for the action of the symmetric group on the cohomology of the pure braid group.

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FERMIONS AND LINK INVARIANTS

International Journal of Modern Physics A ◽

10.1142/s0217751x92003914 ◽

1992 ◽

Vol 07 (supp01a) ◽

pp. 493-532 ◽

Cited By ~ 3

Author(s):

L. Kauffman ◽

H. Saleur

Keyword(s):

Braid Group ◽

Degrees Of Freedom ◽

Knot Theory ◽

Alexander Polynomial ◽

Baxter Equation ◽

Group Representations ◽

R Matrix ◽

Link Invariants ◽

Linear Representations ◽

State Models

This paper deals with various aspects of knot theory when fermionic degrees of freedom are taken into account in the braid group representations and in the state models. We discuss how the Ř matrix for the Alexander polynomial arises from the Fox differential calculus, and how it is related to the quantum group Uqgl(1,1). We investigate new families of solutions of the Yang Baxter equation obtained from "linear" representations of the braid group and exterior algebra. We study state models associated with Uqsl(n,m), and in the case n=m=1 a state model for the multivariable Alexander polynomial. We consider invariants of links in solid handlebodies and show how the non trivial topology lifts the boson fermion degeneracy that is present in S3. We use "gauge like" changes of basis to obtain invariants in thickened surfaces Σ×[0,1].

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