Rigidity of Coxeter Groups and Artin Groups

A Coxeter group is rigid if it cannot be defined by two nonisomorphic diagrams. There have been a number of recent results showing that various classes of Coxeter groups are rigid, and a particularly interesting example of a nonrigid Coxeter group has been given by Bernhard Mühlherr. We show that this example belongs to a general operation of ‘diagram twisting’. We show that the Coxeter groups defined by twisted diagrams are isomorphic, and, moreover, that the Artin groups they define are also isomorphic, thus answering a question posed by Charney. Finally, we show a number of Coxeter groups are reflection rigid once twisting is taken into account.

[1]  Thomas Brady,et al.  Three-generator Artin groups of large type are biautomatic , 1998 .

[2]  F. A. Garside,et al.  THE BRAID GROUP AND OTHER GROUPS , 1969 .

[3]  R. Howlett,et al.  Normalizers of parabolic subgroups in Coxeter groups , 1999 .

[4]  Jacques Tits,et al.  Sur le groupe des automorphismes de certains groupes de Coxeter , 1988 .

[5]  Nicolas Bourbaki,et al.  Eléments de Mathématique , 1964 .

[6]  Vinay V. Deodhar On the root system of a coxeter group , 1982 .

[7]  Bernhard Mühlherr,et al.  Automorphisms of Graph-Universal Coxeter Groups☆ , 1998 .

[8]  Michael W. Davis,et al.  When is a Coxeter System Determined by its Coxeter Group? , 2000 .

[9]  Leonard Evens,et al.  Cohomology of groups , 1991, Oxford mathematical monographs.

[10]  R. Richardson Conjugacy classes of involutions in Coxeter groups , 1982, Bulletin of the Australian Mathematical Society.

[11]  A. Kaul Rigidity for a class of Coxeter groups , 2000 .

[12]  Vinay V. Deodhar A note on subgroups generated by reflections in Coxeter groups , 1989 .

[13]  Bernhard Mühlherr,et al.  On Isomorphisms between Coxeter Groups , 2000, Des. Codes Cryptogr..

[14]  Egbert Brieskorn,et al.  Artin-Gruppen und Coxeter-Gruppen , 1972 .

[15]  Matthew Dyer,et al.  Reflection subgroups of Coxeter systems , 1990 .

[16]  T. Brady Artin groups of finite type with three generators. , 2000 .

[17]  David G. Radcliffe,et al.  Rigidity of Right-Angled Coxeter Groups , 1999, math/9901049.

[18]  Michael W. Davis Groups Generated by reflections and aspherical manifolds not covered by Euclidean space , 1983 .