The Poincaré Series of the Hyperbolic Coxeter Groups with Finite Volume of Fundamental Domains

Chapovalov, Maxim; Leites, Dimitry; Stekolshchik, Rafael

doi:10.1142/s1402925110000842

Cited by 6 publications

(1 citation statement)

References 41 publications

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“…Remark 5.2.10. With [CLS10] it can be seen that the quotient W (q)/ W (q) is a polynomial in q, but we cannot hope for a generalization of the Bott factorization theorem as in the affine case, i.e. a formula of the form…”

Section: The Homology W -Representation Of T(w )mentioning

confidence: 99%

Equivariant triangulations of tori of compact Lie groups and hyperbolic extension to non-crystallographic Coxeter groups

Garnier¹

2021

Preprint

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Given a simple connected compact Lie group K and a maximal torus T of K, the Weyl group W = NK (T )/T naturally acts on T .First, we use the combinatorics of the (extended) affine Weyl group to provide an explicit W -equivariant triangulation of T . We describe the associated cellular homology chain complex and give a formula for the cup product on its dual cochain complex, making it a Z[W ]-dg-algebra.Next, remarking that the combinatorics of this dg-algebra is still valid for Coxeter groups, we associate a closed compact manifold T(W ) to any finite irreducible Coxeter group W , which coincides with a torus if W is a Weyl group and is hyperbolic in other cases. Of course, we focus our study on non-crystallographic groups, which are I2(m) with m = 5 or m ≥ 7, H3 and H4.The manifold T(W ) comes with a W -action and an equivariant triangulation, whose related Z[W ]-dg-algebra is the one mentioned above. We finish by computing the homology of T(W ), as a representation of W .

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Section: The Homology W -Representation Of T(w )mentioning

confidence: 99%

Equivariant triangulations of tori of compact Lie groups and hyperbolic extension to non-crystallographic Coxeter groups

Garnier¹

2021

Preprint

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On the growth of cocompact hyperbolic Coxeter groups

Kellerhals

Perren

2011

European Journal of Combinatorics

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For an arbitrary cocompact hyperbolic Coxeter group G with finite generator set S and complete growth function f S (x) = P (x)/Q(x) , we provide a recursion formula for the coefficients of the denominator polynomial Q(x). It allows to determine recursively the Taylor coefficients and to study the arithmetic nature of the poles of the growth function f S (x) in terms of its subgroups and exponent variety. We illustrate this in the easy case of compact right-angled hyperbolic n-polytopes. Finally, we provide detailed insight into the case of Coxeter groups with at most 6 generators, acting cocompactly on hyperbolic 4-space, by considering the three combinatorially different families discovered and classified by Lannér, Kaplinskaya and Esselmann, respectively. Overview and resultsLet G be a discrete group generated by finitely many reflections in hyperplanes (mirrors) of hyperbolic space H n such that the orbifold H n /G is compact. We call G a cocompact hyperbolic Coxeter group and denote by S the (natural) set of generating reflections. For each generator s ∈ S , one has s 2 = 1 , while two distinct elements s, s ′ ∈ S satisfy either no relation if the corresponding mirrors admit a common perpendicular or provide the relation (ss ′ ) m = 1 for an integer m = m(s, s ′ ) > 1 if the mirrors intersect. The images of the mirrors decompose H n into connected components each of whose closures gives rise to a compact convex fundamental polytope P ⊂ H n for G with dihedral angles of type π/p where p ≥ 2 is an integer. Hence, P is a simple polytope so that each k-face is contained in exactly n − k facets. We call P a Coxeter polytope * Partially supported by Schweizerischer

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Deformation of finite-volume hyperbolic Coxeter polyhedra, limiting growth rates and Pisot numbers

Kolpakov

2012

European Journal of Combinatorics

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A connection between real poles of the growth functions for Coxeter groups acting on hyperbolic space of dimensions three and greater and algebraic integers is investigated. In particular, a certain geometric convergence of fundamental domains for cocompact hyperbolic Coxeter groups with finite-volume limiting polyhedron provides a relation between Salem numbers and Pisot numbers. Several examples conclude this work.

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The Poincaré Series of the Hyperbolic Coxeter Groups with Finite Volume of Fundamental Domains

Cited by 6 publications

References 41 publications

Equivariant triangulations of tori of compact Lie groups and hyperbolic extension to non-crystallographic Coxeter groups

Equivariant triangulations of tori of compact Lie groups and hyperbolic extension to non-crystallographic Coxeter groups

On the growth of cocompact hyperbolic Coxeter groups

Deformation of finite-volume hyperbolic Coxeter polyhedra, limiting growth rates and Pisot numbers

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