Book contents
- Frontmatter
- Contents
- Introduction
- Addresses of registered participants
- Addresses of non-participating authors
- Programme of lectures
- Conference photograph and key
- Symmetric presentations and orthogonal groups
- A constructive recognition algorithm for the special linear group
- Relations in M666
- A survey of symmetric generation of sporadic simple groups
- Harish-Chandra theory, q-Schur algebras, and decomposition matrices for finite classical groups
- The Meataxe as a tool in computational group theory
- Branching rules for modular projective representations of the symmetric groups
- Characters and surfaces: a survey
- On the characterization of finite groups by characters
- Finite linear groups of small degree
- Minimal parabolic systems for the symmetric and alternating groups
- Probabilistic methods in the generation of finite simple groups
- Condensing tensor product modules
- Intersections of Sylow subgroups in finite groups
- Anatomy of the Monster: I
- An integral ‘Meat-axe’
- Finite rational matrix groups: a survey
- Chamber graphs of sporadic group geometries
- An Atlas of sporadic group representations
- Presentations of reductive Fischer groups
- A brief history of the ATLAS
Chamber graphs of sporadic group geometries
Published online by Cambridge University Press: 19 May 2010
- Frontmatter
- Contents
- Introduction
- Addresses of registered participants
- Addresses of non-participating authors
- Programme of lectures
- Conference photograph and key
- Symmetric presentations and orthogonal groups
- A constructive recognition algorithm for the special linear group
- Relations in M666
- A survey of symmetric generation of sporadic simple groups
- Harish-Chandra theory, q-Schur algebras, and decomposition matrices for finite classical groups
- The Meataxe as a tool in computational group theory
- Branching rules for modular projective representations of the symmetric groups
- Characters and surfaces: a survey
- On the characterization of finite groups by characters
- Finite linear groups of small degree
- Minimal parabolic systems for the symmetric and alternating groups
- Probabilistic methods in the generation of finite simple groups
- Condensing tensor product modules
- Intersections of Sylow subgroups in finite groups
- Anatomy of the Monster: I
- An integral ‘Meat-axe’
- Finite rational matrix groups: a survey
- Chamber graphs of sporadic group geometries
- An Atlas of sporadic group representations
- Presentations of reductive Fischer groups
- A brief history of the ATLAS
Summary
Introduction
Early definitions of buildings, following the fundamental work of Tits [19], were couched in terms of simplicial complexes (see also [18, page 319]). More recently an alternative viewpoint, as expounded in [20] (or [11]), which brings chamber systems to the fore, has grown in importance.
Beginning with [1] a search commenced for geometric structures which would perform a similar service for the sporadic finite simple groups as buildings do for the finite simple groups of Lie type. That is, illuminate the internal structure of the sporadic finite simple groups and also place them in a wider context. This aim has yet (if ever?) to be realized. Nevertheless, many interesting and varied geometries have been unearthed in the past 15 or so years (see, for example, [2], [9], [10], [6]). Various aspects of these geometries have been studied—for example a great deal of effort has been expended on their point-line collinearity graphs (see, for example, [12], [13], [14], [17]). The associated chamber graph has received much less attention to date. This is surprising given that the building axioms and many of the concepts relating to buildings can be encoded in the chamber graph (of a building).
Here we survey some of the material in [15] and [16], where some tentative steps are taken in the study of chamber graphs of certain sporadic group geometries. Below we recall the definition of a geometry and a chamber system together with some related concepts, and notation sufficient for our purposes.
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- The Atlas of Finite Groups - Ten Years On , pp. 249 - 260Publisher: Cambridge University PressPrint publication year: 1998
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