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Finite groups and geometries: A view on the present state and on the future

Published online by Cambridge University Press:  06 January 2010

Francis Buekenhout
Affiliation:
Université Libre de Bruxelles Campus Plaine C.P.216 Bd du Triomphe B-1050 Bruxelles
William M. Kantor
Affiliation:
University of Oregon
Lino Di Martino
Affiliation:
Università degli Studi di Milano
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Summary

Introduction

The model: groups of Lie-Chevalley type and buildings

This paper is not the presentation of a completed theory but rather a report on a search progressing as in the natural sciences in order to better understand the relationship between groups and incidence geometry, in some future sought-after theory Τ. The search is based on assumptions and on wishes some of which are time-dependent, variations being forced, in particular, by the search itself.

A major historical reference for this subject is, needless to say, Klein's Erlangen Programme. Klein's views were raised to a powerful theory thanks to the geometric interpretation of the simple Lie groups due to Tits (see for instance), particularly his theory of buildings and of groups with a BN-pair (or Tits systems). Let us briefly recall some striking features of this.

Let G be a group of Lie-Chevalley type of rank r, denned over GF(q), q = pn, p prime. Let Xr denote the Dynkin diagram of G. To these data corresponds a unique thick building B(G) of rank r over the Coxeter diagram Xr (assuming we forget arrows provided by the Dynkin diagram). It turns out that B(G) can be constructed in a uniform way for all G, from a fixed p-Sylow subgroup U of G, its normalizer NG(U) and the r maximal subgroups of G containing NG(U).

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Publisher: Cambridge University Press
Print publication year: 1995

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