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
An integral ‘Meat-axe’
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
Abstract
We describe algorithms for working with matrices of integers, performing most of the Meataxe functions on them. In particular, we can chop integral representations of groups into irreducibles, and prove irreducibility.
Introduction
This paper describes some algorithms sufficient to construct and work with representations of finite groups over the ordinary integers. The methods are, however, of quite general use when working with matrices of integers.
In general, the algorithms and programs closely match those used for working with matrices over finite fields, but several new problems arise.
The first problem is to find an effective replacement for Gaussian elimination—the workhorse method for finite fields. The replacement described here, called “The Module Handler”, although of restricted functionality, seems to do the job, and much of the work of this paper consists of doing such jobs as “Nullspace” and “Find a ℤ-basis” using only this functionality.
Another problem is to work with integers of unbounded size, and yet to prevent the size growing too much. I have some hopes that the methods described here are quite good in this respect, but have made no serious effort to analyse their behaviour.
A third “problem” that I expected is that matrices of non-zero nullity are vanishingly rare in characteristic zero. Astonishingly, in my work so far I have not encountered this problem at all. We have
Research Problem 1Understand why “small” combinations of group elements often have non-zero nullity.
In section 2, the concept of a Module Handler is defined and introduced. In section 3, an implementation based on p-adic lift is described. In section 4, the main programs that use the module handler are described.
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- The Atlas of Finite Groups - Ten Years On , pp. 215 - 228Publisher: Cambridge University PressPrint publication year: 1998
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