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Component (group theory)
Covering Group Theory for Compact Groups
Solvable Groups Whose Character Degree Graphs Generalize Squares
Finite Groups with Unbalancing 2-Components of {L(4), He]-Type
Groups in Which Every Non-Nilpotent Subgroup Is Self-Normalizing
Arxiv:0712.4069V2 [Math.GR] 2 Jan 2008 Ooooycasswoersrcint N Bla Ugopof Subgroup Abelian Any to Restriction Whose Classes Cohomology by Denote Multiplier
Abelian Groups
Nilpotent Groups and Their Generalizations*
Abelian and Solvable Subgroups of Mapping Class Groups of Surfaces
Almost Group Theory Nadja Hempel
On the Vanishing Prime Graph of Solvable Groups
A Crash Course in Topological Groups
Finite Groups Containing an Intrinsic 2-Component of Chevalley Type Over
On the Frattini Subgroup
Group Theory –
Group Theory
Normalizer.Of.Torus.Pdf
Abstract Algebra. Introduction to Group Theory
Infinite Abelian Groups
Top View
Finite Groups with a Standard Component Whose Centralizerhas Cyclic Sylow 2-Subgroups
Character Degree Graphs and Normal Subgroups 1157
The Influence of Conjugacy Class Sizes on the Structure of Finite Groups
Arxiv:1805.05649V1 [Math.GR]
Nilpotent Groups
Elementary Theory of F.G. Nilpotent Groups and Polycyclic Groups
Maximal Compact Normal Subgroups M
Finite Groups with a Standard Component of Type J4
Polynomial-Time Normalizers
Conjugacy Classes in Finite Permutation Groups Via Homomorphic Images
Classification of Finite Quasisimple Groups Which Embed in Exceptional
Stable Conjugacy and Endoscopic Groups
Finite Abelian Group Supplement
Representation Theory CT, Lent 2005
Nilpotent Residual and Fitting Subgroup of Fixed Points in Finite
An Introduction to Matrix Groups and Their Applications Andrew Baker
Group Theory This Publication Forms Part of an Open University Module
Ergodic Theorems for Polynomials in Nilpotent Groups
1806.01938 V2
Chapter V. Topological Algebra
Prime Character Degree Graphs of Solvable Groups Having Diameter Three a Dissertation Submitted to Kent State University in Part
ALGEBRAIC GROUPS 1. Definitions and Examples Let K Be An
Groups in Stable and Simple Theories