K(π,1) and word problems for infinite type Artin-Tits groups, and applications to virtual braid groups

Abstract

Let be a Coxeter graph, let (W,S) be its associated Coxeter system, and let (A,) be its associated Artin-Tits system. We regard W as a reflection group acting on a real vector space V. Let I be the Tits cone, and let E be the complement in I +iV of the reflecting hyperplanes. Recall that Charney, Davis, and Salvetti have constructed a simplicial complex () having the same homotopy type as E. We observe that, if T ⊂ S, then (T) naturally embeds into (). We prove that this embedding admits a retraction πT: () (T), and we deduce several topological and combinatorial results on parabolic subgroups of A. From a family of subsets of S having certain properties, we construct a cube complex , we show that has the same homotopy type as the universal cover of E, and we prove that is CAT(0) if and only if is a flag complex. We say that X ⊂ S is free of infinity if X has no edge labeled by ∞. We show that, if E_X is aspherical and AX has a solution to the word problem for all X ⊂ S free of infinity, then E is aspherical and A has a solution to the word problem. We apply these results to the virtual braid group VBn. In particular, we give a solution to the word problem in VBn, and we prove that the virtual cohomological dimension of VBn is n-1.