2016
DOI: 10.1007/s00209-016-1769-8
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The 2-braid group and Garside normal form

Abstract: We investigate the relation between the Garside normal form for positive braids and the 2-braid group defined by Rouquier. Inspired by work of Brav and Thomas we show that the Garside normal form is encoded in the action of the 2-braid group on a certain categorified left cell module. This allows us to deduce the faithfulness of the 2braid group in finite type. We also give a new proof of Paris' theorem that the canonical map from the generalized braid monoid to its braid group is injective in arbitrary type. … Show more

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Cited by 15 publications
(14 citation statements)
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“…(where B W is considered as a category with only the identity maps) which Rouquier conjectured to be faithful. This was shown in type A in [17], in simply laced finite type in [4], and in all finite types in [13].…”
Section: Introductionmentioning
confidence: 71%
“…(where B W is considered as a category with only the identity maps) which Rouquier conjectured to be faithful. This was shown in type A in [17], in simply laced finite type in [4], and in all finite types in [13].…”
Section: Introductionmentioning
confidence: 71%
“…for all s, t ∈ S. As this presentation is positive, let B(W ) + denote the monoid generated by the same presentation as B(W ). It is a general fact that B(W ) + ⊆ B(W ) (see [35], [33]). If W is finite, the group B(W ) (or W ) is said to be of spherical type.…”
Section: Coxeter Groups and Coxeter Elementsmentioning
confidence: 99%
“…Here η s (r) = 1 2 (r ⊗ f s +rf s ⊗1) for any r ∈ R and µ s is the multiplication map. The functors F s ⊗ − and E s ⊗ − define mutually inverse equivalences of K b (R), categorifying the braid group of the Coxeter system in finite type (see [26], [25], [27], [19] and the references therein). Given x ∈ W with reduced expression st • • • u, we write F x for the Rouquier complex corresponding to the positive canonical lift x of x in the braid group, that is,…”
Section: Generalized Libedinsky-williamson Formulamentioning
confidence: 99%