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
On subgroups, transversals and commutators
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
A great deal of work has been done to investigate the situation that a group G can be written as a product of two subgroups K and H. N. Ito [9] has shown that whenever K and H are abelian then G is soluble. Also, if G is finite and H and K are nilpotent then G is soluble (Wielandt [24], Kegel [10]). In the 1970's and 1980's several special cases of this type were considered; for a good selection of the kind of results that were obtained one can look in Arnberg [1] and the references given there.
Now it is interesting to notice that if H is a subgroup of G then the natural way to combine H and G is to write G = AH where A is a left transversal to H in G. It is surprising that the influence of the properties of H and its transversals on the structure of G has been studied so little (of course, transversals have been used very efficiently in the construction of the transfer homomorphism). In this survey we shall consider the situation that G = AH = BH and the left transversals A and B are connected by the commutator condition [A, B] ≤ H. We investigate the solubility of G as well as the situation in some finite simple groups. The situation and the conditions that we study arise in a natural way from some problems in loop theory and quasigroup theory. Thus we also give some applications of our results in the final section of our survey.
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- Groups '93 Galway/St Andrews , pp. 476 - 481Publisher: Cambridge University PressPrint publication year: 1995