Book contents
- Frontmatter
- Contents
- Preface
- Introduction
- An army of cohomology against residual finiteness
- On some questions concerning subnormally monomial groups
- A conjecture concerning the evaluation of products of class-sums of the symmetric group
- Automorphisms of Burnside rings
- On finite generation of unit groups for group rings
- Counting finite index subgroups
- The quantum double of a finite group and its role in conformal field theory
- Closure properties of supersoluble Fitting classes
- Groups acting on locally finite graphs - a survey of the infinitely ended case
- An invitation to computational group theory
- On subgroups, transversals and commutators
- Intervals in subgroup lattices of finite groups
- Amalgams of minimal local subgroups and sporadic simple groups
- Vanishing orbit sums in group algebras of p-groups
- From stable equivalences to Rickard equivalences for blocks with cyclic defect
- Factorizations in which the factors have relatively prime orders
- Some problems and results in the theory of pro-p groups
- On equations in finite groups and invariants of subgroups
- Group presentations where the relators are proper powers
- A condensing theorem
- Lie methods in group theory
- Some new results on arithmetical problems in the theory of finite groups
- Groups that admit partial power automorphisms
- Problems
An invitation to computational group theory
Published online by Cambridge University Press: 19 February 2010
- Frontmatter
- Contents
- Preface
- Introduction
- An army of cohomology against residual finiteness
- On some questions concerning subnormally monomial groups
- A conjecture concerning the evaluation of products of class-sums of the symmetric group
- Automorphisms of Burnside rings
- On finite generation of unit groups for group rings
- Counting finite index subgroups
- The quantum double of a finite group and its role in conformal field theory
- Closure properties of supersoluble Fitting classes
- Groups acting on locally finite graphs - a survey of the infinitely ended case
- An invitation to computational group theory
- On subgroups, transversals and commutators
- Intervals in subgroup lattices of finite groups
- Amalgams of minimal local subgroups and sporadic simple groups
- Vanishing orbit sums in group algebras of p-groups
- From stable equivalences to Rickard equivalences for blocks with cyclic defect
- Factorizations in which the factors have relatively prime orders
- Some problems and results in the theory of pro-p groups
- On equations in finite groups and invariants of subgroups
- Group presentations where the relators are proper powers
- A condensing theorem
- Lie methods in group theory
- Some new results on arithmetical problems in the theory of finite groups
- Groups that admit partial power automorphisms
- Problems
Summary
Introduction
Throughout the second week of the Groups '93 meeting a workshop on Computational Group Theory (CGT for short) took place. The underlying mathematical methods were described in four series of lectures (‘Finitely Presented Groups’, ‘Collection Methods’, ‘Permutation Groups’, ‘Representations’) and three single lectures (‘Cohomology Groups’, ‘Matrix Groups’, ‘Groups, Graphs and Designs’). The practical aspect was present in a lecture ‘Introduction to GAP’, a course ‘Programming in GAP’ and exercises using GAP during the afternoons. It is a pleasure to thank the large number of colleagues who helped running this workshop.
During the first week, I gave a plenary talk which had the same title as this paper. It had the dual function to give information on the plan and intention of the workshop, but also in a wider sense to discuss the present state of CGT and its role in group theory at large. In parts the talk reflected rather personal viewpoints. Since in that it differs from papers normally read in a conference, I had doubts, if it should at all go into the proceedings. The editors have encouraged me to write it up, so here it is, much in the form of the talk delivered.
CGT may be described as comprising the development, analysis, implementation and use of group theoretical algorithms. The first two depend on and draw from the corresponding part of group theory and hence teaching the methods of CGT is best organized following the lines of the theory – it definitely was organized that way in our workshop.
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- Groups '93 Galway/St Andrews , pp. 457 - 475Publisher: Cambridge University PressPrint publication year: 1995
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