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The Geometry of Reflection Groups
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Description
In Chapter 3 we consider reflection groups that act properly discontinuously on so-called RC-spaces. This class of topological spaces in particular contains the class of n-manifolds. We obtain generalizations of geometric notions such as chambers and adjacency commonly used in the theory of reflection groups on affine spaces. Among other things we prove that the groups under consideration are Coxeter groups.
In the last chapter we treat the geometry of extended affine reflection groups (EAReG), a class of reflection groups acting on finite-dimensional vector spaces which does not fit into the setting of Chapter 3. These groups occur as Weyl groups of extended affine Lie algebras. We give an explicit description of the orbits of an EAReG. In this context of extended affine Weyl groups (EAWeG) we infer that any generic point is a relative extreme point of the convex hull of its orbit.
Our studies of the class of EAReGs also reveals a phenomenon which does not occur in reflection groups in the setting of Chapter 3 or Chapter 4 and which, as far as we know, has not been studied before: If an EAReG is generated by a set of reflections, called basic, then not every reflection occurring in the group is conjugate to a basic reflection. Those reflections which are not conjugate to a basic reflection are called ghost reflections. Ghost reflections also occur in certain EAWeGs. In this setting they are reflections that do not come from an element in the root system. In other words, the root system can be enriched by certain so-called ghost roots without changing the resulting Weyl group.
Product details
Binding:
Paperback
Number of Pages:
177
Release Date:
2004-11-08
Publication Date:
2005-01-31
Publisher:
Shaker Verlag
Languages:
Original:
English
ISBN10:
3832233318
ISBN13:
9783832233310
Weight:
298 g
Height:
149 cm
Width:
210 cm
Thickness:
14 cm
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