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Cherlin’s Conjecture for Finite Primitive Binary Permutation Groups de Nick Gill

Cherlin’s Conjecture for Finite Primitive Binary Permutation Groups: Lecture Notes in Mathematics, cartea 2302

Autor Nick Gill, Martin W. Liebeck, Pablo Spiga
en Limba Engleză Paperback – 18 iun 2022
This book gives a proof of Cherlin’s conjecture for finite binary primitive permutation groups. Motivated by the part of model theory concerned with Lachlan’s theory of finite homogeneous relational structures, this conjecture proposes a classification of those finite primitive permutation groups that have relational complexity equal to 2. 

The first part gives a full introduction to Cherlin’s conjecture, including all the key ideas that have been used in the literature to prove some of its special cases. The second part completes the proof by dealing with primitive permutation groups that are almost simple with socle a group of Lie type. A great deal of material concerning properties of primitive permutation groups and almost simple groups is included, and new ideas are introduced. 

Addressing a hot topic which cuts across the disciplines of group theory, model theory and logic, this book will be of interest toa wide range of readers. It will be particularly useful for graduate students and researchers who need to work with simple groups of Lie type.

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Specificații

ISBN-13: 9783030959555
ISBN-10: 3030959554
Pagini: 216
Ilustrații: IX, 216 p. 1 illus.
Dimensiuni: 155 x 235 mm
Greutate: 0.36 kg
Ediția:1st ed. 2022
Editura: Springer International Publishing
Colecția Springer
Seria Lecture Notes in Mathematics

Locul publicării:Cham, Switzerland

Cuprins

1. Introduction.- 2. Preliminary Results for Groups of Lie Type.- 3. Exceptional Groups.- 4. Classical Groups.

Recenzii

“This monograph proves an attractive conjecture of G. L. Cherlin on finite permutation groups, motivated by model theory.” (H. Dugald Macpherson, Mathematical Reviews, November, 2023)

Notă biografică

Nick Gill is a Lecturer in Pure Mathematics at the Open University. 

Martin Liebeck has been Professor of Pure Mathematics at Imperial College London for over 30 years. He has
published over 150 research articles and 10 books. His research interests include group theory, combinatorics and computational algebra. He was elected Fellow of the America Mathematical Society in 2019, and was awarded the London Mathematical Society's Polya Prize in 2020. 

Pablo Spiga is Professor of Mathematics at the University of Milano-Bicocca. His main research interests involve group actions on graphs and other combinatorial structures. His main expertise is within finite primitive groups and their application for investigating symmetries of combinatorial structures.

Textul de pe ultima copertă

This book gives a proof of Cherlin’s conjecture for finite binary primitive permutation groups. Motivated by the part of model theory concerned with Lachlan’s theory of finite homogeneous relational structures, this conjecture proposes a classification of those finite primitive permutation groups that have relational complexity equal to 2. 

The first part gives a full introduction to Cherlin’s conjecture, including all the key ideas that have been used in the literature to prove some of its special cases. The second part completes the proof by dealing with primitive permutation groups that are almost simple with socle a group of Lie type. A great deal of material concerning properties of primitive permutation groups and almost simple groups is included, and new ideas are introduced. 

Addressing a hot topic which cuts across the disciplines of group theory, model theory and logic, this book will be of interest to a wide range of readers. It will be particularly useful for graduate students and researchers who need to work with simple groups of Lie type.

Caracteristici

Provides a solution to the Cherlin conjecture on binary groups Gives a classification of the finite binary relational structures Includes a comprehensive review of previous work on finite primitive binary permutation groups