Hyperbolic buildings, affine buildings and automatic groups
Group Theory
2009-09-25 v1
Abstract
We see that a building whose Coxeter group is hyperbolic is itself hyperbolic. Thus any finitely generated group acting co-compactly on such a building is hyperbolic, hence automatic. We turn our attention to affine buildings and consider a group which acts simply transitively and in a ``type-rotating'' way on the vertices of a locally finite thick building of type . We show that is biautomatic, using a presentation of and unique normal form for each element of , as described in ``Groups acting simply transitively on the vertices of a building of type '' by D.I. Cartwright, to appear, Proceedings of the 1993 Como conference ``Groups of Lie type and their geometries''.
Keywords
Cite
@article{arxiv.math/9404202,
title = {Hyperbolic buildings, affine buildings and automatic groups},
author = {Donald I. Cartwright and Michael Shapiro},
journal= {arXiv preprint arXiv:math/9404202},
year = {2009}
}
Comments
Plain Tex, 12 pages, no figures