The hyperbolic cover of an elliptic Weyl group
Abstract
In this paper, we study in detail the hyperbolic covers W and W of an elliptic Weyl system introduced by Saito. We show that they are isomorphic and also isomorphic to an extended Coxeter system of star type. For c a Coxeter transformation in W we can conclude the Hurwitz transitivity of the braid group action on the set of reduced reflection factorizations of c from the Hurwitz transitivity in extended Coxeter systems of star type. This then enables us to establish for a weighted projective line X of tubular type an order preserving bijection between the poset of thick subcategories of coh(X) generated by an exceptional sequence and the poset [id, c] ordered by the absolute order. In an Appendix, we study the hyperbolic cover of a Coxeter system.
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