Groups of Prime Power Order. Volume 3
Title | Groups of Prime Power Order. Volume 3 PDF eBook |
Author | Yakov Berkovich |
Publisher | Walter de Gruyter |
Pages | 669 |
Release | 2011-06-30 |
Genre | Mathematics |
ISBN | 3110254484 |
This is the third volume of a comprehensive and elementary treatment of finite p-group theory. Topics covered in this volume: impact of minimal nonabelian subgroups on the structure of p-groups, classification of groups all of whose nonnormal subgroups have the same order, degrees of irreducible characters of p-groups associated with finite algebras, groups covered by few proper subgroups, p-groups of element breadth 2 and subgroup breadth 1, exact number of subgroups of given order in a metacyclic p-group, soft subgroups, p-groups with a maximal elementary abelian subgroup of order p2, p-groups generated by certain minimal nonabelian subgroups, p-groups in which certain nonabelian subgroups are 2-generator. The book contains many dozens of original exercises (with difficult exercises being solved) and a list of about 900 research problems and themes.
Groups of Prime Power Order. Volume 6
Title | Groups of Prime Power Order. Volume 6 PDF eBook |
Author | Yakov G. Berkovich |
Publisher | Walter de Gruyter GmbH & Co KG |
Pages | 495 |
Release | 2018-06-25 |
Genre | Mathematics |
ISBN | 3110531003 |
This is the sixth volume of a comprehensive and elementary treatment of finite group theory. This volume contains many hundreds of original exercises (including solutions for the more difficult ones) and an extended list of about 1000 open problems. The current book is based on Volumes 1–5 and it is suitable for researchers and graduate students working in group theory.
Groups of Prime Power Order. Volume 4
Title | Groups of Prime Power Order. Volume 4 PDF eBook |
Author | Yakov G. Berkovich |
Publisher | Walter de Gruyter GmbH & Co KG |
Pages | 476 |
Release | 2015-12-14 |
Genre | Mathematics |
ISBN | 3110281473 |
This is the fourth volume of a comprehensive and elementary treatment of finite p-group theory. As in the previous volumes, minimal nonabelian p-groups play an important role. Topics covered in this volume include: subgroup structure of metacyclic p-groups Ishikawa’s theorem on p-groups with two sizes of conjugate classes p-central p-groups theorem of Kegel on nilpotence of H p-groups partitions of p-groups characterizations of Dedekindian groups norm of p-groups p-groups with 2-uniserial subgroups of small order The book also contains hundreds of original exercises and solutions and a comprehensive list of more than 500 open problems. This work is suitable for researchers and graduate students with a modest background in algebra.
Groups of Prime Power Order. Volume 5
Title | Groups of Prime Power Order. Volume 5 PDF eBook |
Author | Yakov G. Berkovich |
Publisher | Walter de Gruyter GmbH & Co KG |
Pages | 434 |
Release | 2016-01-15 |
Genre | Mathematics |
ISBN | 3110295350 |
This is the fifth volume of a comprehensive and elementary treatment of finite p-group theory. Topics covered in this volume include theory of linear algebras and Lie algebras. The book contains many dozens of original exercises (with difficult exercises being solved) and a list of about 900 research problems and themes.
Groups of Prime Power Order. Volume 1
Title | Groups of Prime Power Order. Volume 1 PDF eBook |
Author | Yakov Berkovich |
Publisher | Walter de Gruyter |
Pages | 533 |
Release | 2008-12-10 |
Genre | Mathematics |
ISBN | 3110208229 |
This is the first of three volumes of a comprehensive and elementary treatment of finite p-group theory. Topics covered in this monograph include: (a) counting of subgroups, with almost all main counting theorems being proved, (b) regular p-groups and regularity criteria, (c) p-groups of maximal class and their numerous characterizations, (d) characters of p-groups, (e) p-groups with large Schur multiplier and commutator subgroups, (f) (p‒1)-admissible Hall chains in normal subgroups, (g) powerful p-groups, (h) automorphisms of p-groups, (i) p-groups all of whose nonnormal subgroups are cyclic, (j) Alperin's problem on abelian subgroups of small index. The book is suitable for researchers and graduate students of mathematics with a modest background on algebra. It also contains hundreds of original exercises (with difficult exercises being solved) and a comprehensive list of about 700 open problems.
Groups of Prime Power Order. Volume 2
Title | Groups of Prime Power Order. Volume 2 PDF eBook |
Author | Yakov Berkovich |
Publisher | Walter de Gruyter |
Pages | 613 |
Release | 2008-12-10 |
Genre | Mathematics |
ISBN | 3110208237 |
This is the second of three volumes devoted to elementary finite p-group theory. Similar to the first volume, hundreds of important results are analyzed and, in many cases, simplified. Important topics presented in this monograph include: (a) classification of p-groups all of whose cyclic subgroups of composite orders are normal, (b) classification of 2-groups with exactly three involutions, (c) two proofs of Ward's theorem on quaternion-free groups, (d) 2-groups with small centralizers of an involution, (e) classification of 2-groups with exactly four cyclic subgroups of order 2n > 2, (f) two new proofs of Blackburn's theorem on minimal nonmetacyclic groups, (g) classification of p-groups all of whose subgroups of index p2 are abelian, (h) classification of 2-groups all of whose minimal nonabelian subgroups have order 8, (i) p-groups with cyclic subgroups of index p2 are classified. This volume contains hundreds of original exercises (with all difficult exercises being solved) and an extended list of about 700 open problems. The book is based on Volume 1, and it is suitable for researchers and graduate students of mathematics with a modest background on algebra.
Blocks of Finite Groups and Their Invariants
Title | Blocks of Finite Groups and Their Invariants PDF eBook |
Author | Benjamin Sambale |
Publisher | Springer |
Pages | 246 |
Release | 2014-11-19 |
Genre | Mathematics |
ISBN | 3319120069 |
Providing a nearly complete selection of up-to-date methods and results on block invariants with respect to their defect groups, this book covers the classical theory pioneered by Brauer, the modern theory of fusion systems introduced by Puig, the geometry of numbers developed by Minkowski, the classification of finite simple groups, and various computer assisted methods. In a powerful combination, these tools are applied to solve many special cases of famous open conjectures in the representation theory of finite groups. Most of the material is drawn from peer-reviewed journal articles, but there are also new previously unpublished results. In order to make the text self-contained, detailed proofs are given whenever possible. Several tables add to the text's usefulness as a reference. The book is aimed at experts in group theory or representation theory who may wish to make use of the presented ideas in their research.