AMCA: A Class of Rigid Coxeter Groups by Anton Kaul

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G^3, Special Session in Geometric Group Theory
January 10-13, 2001
part of the AMS/MAA joint meeting
New Orleans, LA, USA

Organizers
Phil Bowers, Martin Bridson, Stephen Brick, Jon Corson, Igor Mineyev

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A Class of Rigid Coxeter Groups
by
Anton Kaul
University of South Florida

A Coxeter Group W is said to be rigid if, given any two Coxeter systems (W, S) and (W, S^'), there is an automorphism \rho:W --> W such that \rho(S) = S^'. We consider the class of Coxeter systems (W, S) for which the Coxeter graph \Gamma_S is complete and has only odd edge labels (such a system is said to be of "type K_n"). It is shown that if W has a type K_n system, then any other system for W is also type K_n. Moreover the multiset of edge labels on \Gamma_S and \Gamma_S^' agree. In particular, if all but one edge label of \Gamma_S are identical, then W is rigid.

Date received: September 18, 2000

Copyright © 2000 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Mathematical Conference Abstracts. Document # cafm-02.