Book contents
- Frontmatter
- Contents
- INTRODUCTION
- Approximate subgroups and super-strong approximation
- Width questions for finite simple groups
- Profinite properties of discrete groups
- GL(n, Z), Out(Fn) and everything in between: automorphism groups of RAAGs
- Permutation groups and transformation semigroups: results and problems
- New progress on factorized groups and subgroup permutability
- A survey on the normalizer problem for integral group rings
- A survey on Clifford-Fischer theory
- A generalisation on the solvability of finite groups with three class sizes for normal subgroups
- Automorphism groups of non-orientable Riemann surfaces
- What are the C2-groups?
- Resurrecting Wells’ exact sequence and Buckley's group action
- Recent work on Beauville surfaces, structures and groups
- Something for nothing: some consequences of the solution of the Tarski problems
- The groups of projectivities in finite planes
- On the relation gap and relation lifting problem
- Some results on products of finite subsets in groups
- Formal languages and group theory
- On the Castelnuovo-Mumford regularity of the cohomology of fusion systems and of the Hochschild cohomology of block algebras
- Recent advances on torsion subgroups of integral group rings
- On finite groups with small prime spectrum
- Solvability criteria for finite loops and groups
- The rational subset membership problem for groups: a survey
- A survey of Milnor laws
- Capable p-groups
- On the normal structure of a finite group with restrictions on the maximal subgroups
- Certain monomial characters and their normal constituents
- Recognition of finite quasi-simple groups by the degrees of their irreducible representations
- Generalized Baumslag-Solitar groups: a survey of recent progress
- Zeta functions of groups and rings – recent developments
Recognition of finite quasi-simple groups by the degrees of their irreducible representations
Published online by Cambridge University Press: 05 September 2015
- Frontmatter
- Contents
- INTRODUCTION
- Approximate subgroups and super-strong approximation
- Width questions for finite simple groups
- Profinite properties of discrete groups
- GL(n, Z), Out(Fn) and everything in between: automorphism groups of RAAGs
- Permutation groups and transformation semigroups: results and problems
- New progress on factorized groups and subgroup permutability
- A survey on the normalizer problem for integral group rings
- A survey on Clifford-Fischer theory
- A generalisation on the solvability of finite groups with three class sizes for normal subgroups
- Automorphism groups of non-orientable Riemann surfaces
- What are the C2-groups?
- Resurrecting Wells’ exact sequence and Buckley's group action
- Recent work on Beauville surfaces, structures and groups
- Something for nothing: some consequences of the solution of the Tarski problems
- The groups of projectivities in finite planes
- On the relation gap and relation lifting problem
- Some results on products of finite subsets in groups
- Formal languages and group theory
- On the Castelnuovo-Mumford regularity of the cohomology of fusion systems and of the Hochschild cohomology of block algebras
- Recent advances on torsion subgroups of integral group rings
- On finite groups with small prime spectrum
- Solvability criteria for finite loops and groups
- The rational subset membership problem for groups: a survey
- A survey of Milnor laws
- Capable p-groups
- On the normal structure of a finite group with restrictions on the maximal subgroups
- Certain monomial characters and their normal constituents
- Recognition of finite quasi-simple groups by the degrees of their irreducible representations
- Generalized Baumslag-Solitar groups: a survey of recent progress
- Zeta functions of groups and rings – recent developments
Summary
Abstract
We present some recent advances in the study of the problem of recognizing finite groups by the degrees of their irreducible complex representations. We especially focus on simple groups and more generally quasi-simple groups.
Introduction
Representation theory of finite groups was originally developed to analyze groups in terms of linear transformations or matrices. A representation of degree n (where n is a positive integer) over a field F of a group is a way to represent elements in the group by n × n invertible matrices with entries in F in such a way that the rule of group operation corresponds to matrix multiplication. Degree certainly is the most important piece of information in a representation, and therefore the degrees of irreducible representations are a key tool to study the structure of finite groups.
This is an expository paper in which we survey some recent advances on the problem of recognizing finite groups by the degrees of their (complex) representations, especially for simple groups and more generally quasi-simple groups. For a finite group G, we denote the set of degrees of irreducible representations of G by cd(G) and call it the degree set of G. The multiplicity of each degree is the number of irreducible representations of that degree, and when these numbers are taken into account, we will similarly have the degree multiset of G, denoted by cd* (G).
A fundamental question in group representation theory is whether one can recover a group or some of its properties from the degrees of its irreducible representations. In the late 1980s, I.M. Isaacs [19] proved that if cd*(G) = cd*(H) and p is a prime, then G has a normal p-complement if and only if H has a normal p-complement, and therefore the nilpotency of a group is determined by its degree multiset. Later, T. Hawkes [14] provided a counterexample showing that the same assertion does not hold for super-solvability. It is still unknown whether the solvability of a finite group is determined by its degree multiset, see [30, Problem 11.8].
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- Groups St Andrews 2013 , pp. 439 - 456Publisher: Cambridge University PressPrint publication year: 2015
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