Book contents
- Frontmatter
- Contents
- Contents of Volume II
- Introduction
- Radical rings and products of groups
- Homogeneous integral table algebras of degrees two, three and four with a faithful element
- A polynomial-time theory of black box groups I
- Totally and mutually permutable products of finite groups
- Ends and algebraic directions of pseudogroups
- On locally nilpotent groups with the minimal condition on centralizers
- Infinite groups in projective and symplectic geometry
- Non-positive curvature in group theory
- Group-theoretic applications of non-commutative toric geometry
- Theorems of Kegel-Wielandt type
- Singly generated radicals associated with varieties of groups
- The word problem in groups of cohomological dimension
- Polycyclic-by-finite groups: from affine to polynomial structures
- On groups with rank restrictions on subgroups
- On distances of multiplication tables of groups
- The Dade conjecture for the McLaughlin group
- Automorphism groups of certain non-quasiprimitive almost simple graphs
- Subgroups of the upper-triangular matrix group with maximal derived length and a minimal number of generators
- On p-pronormal subgroups of finite p-soluble groups
- On the system of defining relations and the Schur multiplier of periodic groups generated by finite automata
- On the dimension of groups acting on buildings
- Dade's conjecture for the simple Higman-Sims group
- On the F*-theorem
- Covering numbers for groups
- Characterizing subnormally closed formations
- Symmetric words in a free nilpotent group of class 5
- A non-residually finite square of finite groups
The Dade conjecture for the McLaughlin group
Published online by Cambridge University Press: 05 August 2013
- Frontmatter
- Contents
- Contents of Volume II
- Introduction
- Radical rings and products of groups
- Homogeneous integral table algebras of degrees two, three and four with a faithful element
- A polynomial-time theory of black box groups I
- Totally and mutually permutable products of finite groups
- Ends and algebraic directions of pseudogroups
- On locally nilpotent groups with the minimal condition on centralizers
- Infinite groups in projective and symplectic geometry
- Non-positive curvature in group theory
- Group-theoretic applications of non-commutative toric geometry
- Theorems of Kegel-Wielandt type
- Singly generated radicals associated with varieties of groups
- The word problem in groups of cohomological dimension
- Polycyclic-by-finite groups: from affine to polynomial structures
- On groups with rank restrictions on subgroups
- On distances of multiplication tables of groups
- The Dade conjecture for the McLaughlin group
- Automorphism groups of certain non-quasiprimitive almost simple graphs
- Subgroups of the upper-triangular matrix group with maximal derived length and a minimal number of generators
- On p-pronormal subgroups of finite p-soluble groups
- On the system of defining relations and the Schur multiplier of periodic groups generated by finite automata
- On the dimension of groups acting on buildings
- Dade's conjecture for the simple Higman-Sims group
- On the F*-theorem
- Covering numbers for groups
- Characterizing subnormally closed formations
- Symmetric words in a free nilpotent group of class 5
- A non-residually finite square of finite groups
Summary
Abstract
The Dade Conjectures, which relate the numbers of irreducible ordinary or projective characters with given defects and given inertia groups of certain local subgroups of a finite group are verified for the sporadic simple McLaughlin Group McL.
AMS (MOS) subject classification Numbers: 20C15 (20C20 20C25).
Keywords: Dade Conjectures, characters, blocks, defects.
Introduction
In the Representation Theory of Finite Groups there is a large number of open problems and long-standing conjectures. Many of these originate from a famous lecture [4] of R. Brauer, in which he described the subject by listing its most interesting and natural open problems and which stimulated an enormous amount of further research. About 10 years later an observation of J. McKay [17] on character degrees of finite groups led to a series of conjectures, notably the Alperin-McKay-Conjecture, and the Alperin Weight Conjecture [1], which has been reformulated in several ways, see for example [15]. The latest in this series seem to be the conjectures of Dade given in [6], [7], and [8]. Any of these conjectures implies the Alperin Weight Conjecture. The strongest form of Dade's conjectures, the “Inductive Conjecture”, which implies all others, has the big advantage, that it can be shown to hold for all finite groups provided that it could be verified for all finite simple groups.
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- Groups St Andrews 1997 in Bath , pp. 253 - 266Publisher: Cambridge University PressPrint publication year: 1999
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