Pr\'esentations duales des groupes de tresses de type affine A

Abstract

In the present paper we define dual monoids for all Artin-Tits groups and we prove that for the type An we get a (quasi)-Garside structure. Such a structure provides normal forms for the Artin-Tits group elements and allows to solve some questions such as to determine the centralizer of a power of the Coxeter element in the Artin-Tits group. More precisely, if W is a Coxeter group, one can consider the length lR on W with respect to the generating set R consisting of all reflections. Let c be a Coxeter element in W and let Pc be the set of elements p∈ W such that c can be written c=pp' with lR(c)=lR(p)+lR(p'). We define the monoid M(Pc) to be the monoid generated by a set Pc in one-to-one correspondence, p p, with Pc with only relations pp'= p. p' whenever p, p' and pp' are in Pc and lR(pp')=lR(p)+lR(p'). We conjecture that the group of quotients of M(Pc) is the Artin-Tits group associated to W and that it has a simple presentation (see conjecture (ii)). These conjectures are known to be true for spherical type Artin-Tits groups. Here we prove them for Artin-Tits groups of type A. Moreover, we show that for exactly one choice of the Coxeter element (up to diagram automorphism) we obtain a (quasi-) Garside monoid. The proof makes use of non-crossing paths in an annulus which are the counterpart in this context of the non-crossing partitions used for type A.

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