Your search keyword '"d'Andecy, L."' showing total 14 results

1. Fused Hecke algebra and one-boundary algebras

Author

d'Andecy, L. Poulain and Zaimi, M.

Subjects

Mathematics - Representation Theory, Mathematical Physics, Mathematics - Quantum Algebra

Abstract

This paper gives an algebraic presentation of the fused Hecke algebra which describes the centraliser of tensor products of the $U_q(gl_N)$-representation labelled by a one-row partition of any size with vector representations. It is obtained through a detailed study of a new algebra that we call the symmetric one-boundary Hecke algebra. In particular, we prove that the symmetric one-boundary Hecke algebra is free over a ring of Laurent polynomials in three variables and we provide a basis indexed by a certain subset of signed permutations. We show how the symmetric one-boundary Hecke algebra admits the one-boundary Temperley-Lieb algebra as a quotient, and we also describe a basis of this latter algebra combinatorially in terms of signed permutations with avoiding patterns. The quotients corresponding to any value of $N$ in $gl_N$ (the Temperley-Lieb one corresponds to $N=2$) are also introduced. Finally, we obtain the fused Hecke algebra, and in turn the centralisers for any value of $N$, by specialising and quotienting the symmetric one-boundary Hecke algebra. In particular, this generalises to the Hecke case the description of the so-called boundary seam algebra, which is then obtained (taking $N=2$) as a quotient of the fused Hecke algebra., Comment: 35 pages

Published

2023

2. Centralisers and Hecke algebras in Representation Theory, with applications to Knots and Physics

Author

d'Andecy, L. Poulain

Subjects

Mathematics - Representation Theory, Mathematical Physics, Mathematics - Geometric Topology, Mathematics - Quantum Algebra

Abstract

This document is a thesis presented for the ``Habilitation \`a diriger des recherches''. The first chapter provides some background and sketch the story of the classical Schur-Weyl duality and its quantum analogue involving the Hecke algebra. Quantum groups and their centralisers are discussed along with their connections with the braid group, the Yang-Baxter equation and the construction of link invariants. A quick review of several related notions of Hecke algebras concludes the first chapter. The second chapter presents the fused Hecke algebras and an application to the construction of solutions for the Yang-Baxter equation. The third chapter summarises recent works on diagonal centralisers of Lie algebras, and gives an application to the study of the missing label for sl(3). The last chapter discusses algebraic results on the Yokonuma-Hecke algebras and their applications to the study of link invariants., Comment: 81 pages

Published

2023

3. Fusion for the Yang-Baxter equation and the braid group

Author

d'Andecy, L. Poulain

Subjects

Mathematics - Representation Theory, Mathematical Physics, Mathematics - Geometric Topology, Mathematics - Quantum Algebra

Abstract

These are the extended notes of a mini-course given at the school WinterBraids X. We discuss algebras simultaneously related to: the braid group, the Yang-Baxter equation and the representation theory of quantum groups. The main goal is to explain the idea of the fusion procedure for the Yang-Baxter equation and to show how it leads to new examples of such algebras: the fused Hecke algebras.

Published

2022

4. Baxterisation of the fused Hecke algebra and R-matrices with gl(N)-symmetry

Author

Crampe, N. and d'Andecy, L. Poulain

Subjects

Mathematical Physics, Mathematics - Quantum Algebra

Abstract

We give an explicit Baxterisation formula for the fused Hecke algebra and its classical limit for the algebra of fused permutations. These algebras replace the Hecke algebra and the symmetric group in the Schur--Weyl duality theorems for the symmetrised powers of the fundamental representation of gl(N) and their quantum version. So the Baxterisation formulas presented in this paper are applicable to the $R$-matrices associated to these representations. In particular all "higher spins" representations of (classical and quantum) sl(2) are covered.

Published

2020

5. Fused braids and centralisers of tensor representations of $U_q(gl_N)$

Author

Crampe, N. and d'Andecy, L. Poulain

Subjects

Mathematics - Representation Theory, Mathematical Physics, Mathematics - Geometric Topology, Mathematics - Quantum Algebra

Abstract

We present in this paper the algebra of fused permutations and its deformation the fused Hecke algebra. The first one is defined on a set of combinatorial objects that we call fused permutations, and its deformation is defined on a set of topological objects that we call fused braids. We use these algebras to prove a Schur--Weyl duality theorem for any tensor products of any symmetrised powers of the natural representation of $U_q(gl_N)$. Then we proceed to the study of the fused Hecke algebras and in particular, we describe explicitely the irreducible representations and the branching rules. Finally, we aim to an algebraic description of the centralisers of the tensor products of $U_q(gl_N)$-representations under consideration. We exhibit a simple explicit element that we conjecture to generate the kernel from the fused Hecke algebra to the centraliser. We prove this conjecture in some cases and in particular, we obtain a description of the centraliser of any tensor products of any finite-dimensional representations of $U_q(sl_2)$., Comment: 52 pages

Published

2020

6. Clifford theory for Yokonuma--Hecke algebras and deformation of complex reflection groups

Author

Jacon, N. and d'Andecy, L. Poulain

Subjects

Mathematics - Representation Theory, Mathematics - Group Theory, Mathematics - Quantum Algebra

Abstract

We define and study an action of the symmetric group on the Yokonuma--Hecke algebra. This leads to the definition of two classes of algebras. The first one is connected with the image of the algebra of the braid group inside the Yokonuma--Hecke algebras, and in turn with an algebra defined by Aicardi and Juyumaya known as the algebra of braids and ties. The second one can be seen as new deformations of complex reflection groups of type G(d,p,n). We provide several presentations for both algebras and a complete study of their representation theories using Clifford theory., Comment: 22 pages

Published

2016

7. The HOMFLYPT polynomials of sublinks and the Yokonuma-Hecke algebras

Author

d'Andecy, L. Poulain and Wagner, E.

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra, Mathematics - Representation Theory

Abstract

We describe completely the link invariants constructed using Markov traces on the Yokonuma-Hecke algebras in terms of the linking matrix and the HOMFLYPT polynomials of sublinks., Comment: 8 pages

Published

2016

8. Young tableaux and representations of Hecke algebras of type ADE

Author

d'Andecy, L. Poulain

Subjects

Mathematics - Representation Theory, Mathematics - Combinatorics, Mathematics - Quantum Algebra

Abstract

We introduce and study some affine Hecke algebras of type ADE, generalising the affine Hecke algebras of GL. We construct irreducible calibrated representations and describe the calibrated spectrum. This is done in terms of new families of combinatorial objects equipped with actions of the corresponding Weyl groups. These objects are built from and generalise the usual standard Young tableaux, and are controlled by the considered affine Hecke algebras. By restriction and limiting procedure, we obtain several combinatorial models for representations of finite Hecke algebras and Weyl groups of type ADE. Representations are constructed by explicit formulas, in a seminormal form., Comment: 41 pages

Published

2016

9. Invariants for links from classical and affine Yokonuma--Hecke algebras

Author

d'Andecy, L. Poulain

Subjects

Mathematics - Geometric Topology, Mathematics - Quantum Algebra, Mathematics - Representation Theory

Abstract

We present a construction of invariants for links using an isomorphism theorem for affine Yokonuma--Hecke algebras. The isomorphism relates affine Yokonuma--Hecke algebras with usual affine Hecke algebras. We use it to construct a large class of Markov traces on affine Yokonuma--Hecke algebras, and in turn, to produce invariants for links in the solid torus. By restriction, this construction contains the construction of invariants for classical links from classical Yokonuma--Hecke algebras. In general, the obtained invariants form an infinite family of 3-variables polynomials. As a consequence of the construction via the isomorphism, we reduce the number of invariants to study, given the number of connected components of a link. In particular, if the link is a classical link with N components, we show that N invariants generate the whole family., Comment: 15 pages

Published

2016

10. An isomorphism Theorem for Yokonuma--Hecke algebras and applications to link invariants

Author

Jacon, N. and d'Andecy, L. Poulain

Subjects

Mathematics - Representation Theory, Mathematics - Geometric Topology, Mathematics - Quantum Algebra

Abstract

We develop several applications of the fact that the Yokonuma--Hecke algebra of the general linear group GL is isomorphic to a direct sum of matrix algebras associated to Iwahori--Hecke algebras of type A. This includes a description of the semisimple and modular representation theory of the Yokonuma--Hecke algebras of GL and a complete classification of all the Markov traces for them. Finally, from these Markov traces, we construct 3-variables polynomials which are invariants for framed and classical knots and links, and investigate their properties with the help of the isomorphism., Comment: 34 pages

Published

2015

11. Induced representations and traces for chains of affine and cyclotomic Hecke algebras

Author

Ogievetsky, O. V. and d'Andecy, L. Poulain

Subjects

Mathematics - Quantum Algebra, Mathematical Physics

Abstract

Properties of relative traces and symmetrizing forms on chains of cyclotomic and affine Hecke algebras are studied. The study relies on a use of bases of these algebras which generalize a normal form for elements of the complex reflection groups $G(m,1,n)$, $m=1,2,\dots,\infty$, constructed by a recursive use of the Coxeter--Todd algorithm. Formulas for inducing, from representations of an algebra in the chain, representations of the next member of the chain are presented.

Published

2013

12. Alternating subalgebras of Hecke algebras and alternating subgroups of braid groups

Author

Ogievetsky, O. V. and d'Andecy, L. Poulain

Subjects

Mathematics - Quantum Algebra, Mathematics - Group Theory

Abstract

For a Coxeter system (G,S) the multi-parametric alternating subalgebra H^+(G) of the Hecke algebra and the alternating subgroup B^+(G) of the braid group are defined. Two presentations for H^+(G) and B^+(G) are given; one generalizes the Bourbaki presentation for the alternating subgroups of Coxeter groups, another one uses generators related to edges of the Coxeter graph., Comment: 14 pages

Published

2012

13. Jucys--Murphy elements and representations of cyclotomic Hecke algebras

Author

Ogievetsky, O. V. and d'Andecy, L. Poulain

Subjects

Mathematics - Representation Theory, Mathematics - Quantum Algebra

Abstract

An inductive approach to the representation theory of cyclotomic Hecke algebras, inspired by Okounkov and Vershik, is developed. We study the common spectrum of the Jucys-Murphy elements using representations of the simplest affine Hecke algebra. Representations are constructed with the help of a new associative algebra whose underlying vector space is the tensor product of the cyclotomic Hecke algebra with the free associative algebra generated by standard m-tableaux., Comment: 51 pages

Published

2012

14. On representations of cyclotomic Hecke algebras

Author

Ogievetsky, O. V. and d'Andecy, L. Poulain

Subjects

Mathematical Physics, Mathematics - Quantum Algebra, Mathematics - Representation Theory, 16S80, 20C08, 81R05

Abstract

An approach, based on Jucys--Murphy elements, to the representation theory of cyclotomic Hecke algebras is developed. The maximality (in the cyclotomic Hecke algebra) of the set of the Jucys--Murphy elements is established. A basis of the cyclotomic Hecke algebra is suggested; this basis is used to establish the flatness of the deformation without use of the representation theory.

Published

2010