Author: Cheryl E. Praeger
Publisher: Cambridge University Press
ISBN: 0521567378
Category : Mathematics
Languages : en
Pages : 157
Book Description
This book presents a complete classification of the transitive permutation representations of rank at most five of the sporadic simple groups and their automorphism groups, together with a comprehensive study of the vertex-transitive graphs associated with these representations. Included is a list of all vertex-transitive, distance-regular graphs on which a sporadic almost simple group acts with rank at most five. In this list are some new, interesting distance-regular graphs of diameter two, which are not distance-transitive. For most of the representations a presentation of the sporadic group is given, with words in the given generators which generate a point stabiliser: this gives readers sufficient information to reconstruct and study the representations and graphs. Practical computational techniques appropriate for analysing finite vertex-transitive graphs are described carefully, making the book an excellent starting point for learning about groups and the graphs on which they act.
Low Rank Representations and Graphs for Sporadic Groups
Author: Cheryl E. Praeger
Publisher: Cambridge University Press
ISBN: 0521567378
Category : Mathematics
Languages : en
Pages : 157
Book Description
This book presents a complete classification of the transitive permutation representations of rank at most five of the sporadic simple groups and their automorphism groups, together with a comprehensive study of the vertex-transitive graphs associated with these representations. Included is a list of all vertex-transitive, distance-regular graphs on which a sporadic almost simple group acts with rank at most five. In this list are some new, interesting distance-regular graphs of diameter two, which are not distance-transitive. For most of the representations a presentation of the sporadic group is given, with words in the given generators which generate a point stabiliser: this gives readers sufficient information to reconstruct and study the representations and graphs. Practical computational techniques appropriate for analysing finite vertex-transitive graphs are described carefully, making the book an excellent starting point for learning about groups and the graphs on which they act.
Publisher: Cambridge University Press
ISBN: 0521567378
Category : Mathematics
Languages : en
Pages : 157
Book Description
This book presents a complete classification of the transitive permutation representations of rank at most five of the sporadic simple groups and their automorphism groups, together with a comprehensive study of the vertex-transitive graphs associated with these representations. Included is a list of all vertex-transitive, distance-regular graphs on which a sporadic almost simple group acts with rank at most five. In this list are some new, interesting distance-regular graphs of diameter two, which are not distance-transitive. For most of the representations a presentation of the sporadic group is given, with words in the given generators which generate a point stabiliser: this gives readers sufficient information to reconstruct and study the representations and graphs. Practical computational techniques appropriate for analysing finite vertex-transitive graphs are described carefully, making the book an excellent starting point for learning about groups and the graphs on which they act.
Geometry of Sporadic Groups: Volume 1, Petersen and Tilde Geometries
Author: A. A. Ivanov
Publisher: Cambridge University Press
ISBN: 0521413621
Category : Mathematics
Languages : en
Pages : 434
Book Description
Important monograph on finite group theory.
Publisher: Cambridge University Press
ISBN: 0521413621
Category : Mathematics
Languages : en
Pages : 434
Book Description
Important monograph on finite group theory.
Topics in Algebraic Graph Theory
Author: Lowell W. Beineke
Publisher: Cambridge University Press
ISBN: 9780521801973
Category : Mathematics
Languages : en
Pages : 302
Book Description
There is no other book with such a wide scope of both areas of algebraic graph theory.
Publisher: Cambridge University Press
ISBN: 9780521801973
Category : Mathematics
Languages : en
Pages : 302
Book Description
There is no other book with such a wide scope of both areas of algebraic graph theory.
Groups and Computation III
Author: William M. Kantor
Publisher: Walter de Gruyter
ISBN: 3110872749
Category : Mathematics
Languages : en
Pages : 376
Book Description
This volume contains contributions by the participants of the conference "Groups and Computation", which took place at The Ohio State University in Columbus, Ohio, in June 1999. This conference was the successor of two workshops on "Groups and Computation" held at DIMACS in 1991 and 1995. There are papers on permutation group algorithms, finitely presented groups, polycyclic groups, and parallel computation, providing a representative sample of the breadth of Computational Group Theory. On the other hand, more than one third of the papers deal with computations in matrix groups, giving an in-depth treatment of the currently most active area of the field. The points of view of the papers range from explicit computations to group-theoretic algorithms to group-theoretic theorems needed for algorithm development.
Publisher: Walter de Gruyter
ISBN: 3110872749
Category : Mathematics
Languages : en
Pages : 376
Book Description
This volume contains contributions by the participants of the conference "Groups and Computation", which took place at The Ohio State University in Columbus, Ohio, in June 1999. This conference was the successor of two workshops on "Groups and Computation" held at DIMACS in 1991 and 1995. There are papers on permutation group algorithms, finitely presented groups, polycyclic groups, and parallel computation, providing a representative sample of the breadth of Computational Group Theory. On the other hand, more than one third of the papers deal with computations in matrix groups, giving an in-depth treatment of the currently most active area of the field. The points of view of the papers range from explicit computations to group-theoretic algorithms to group-theoretic theorems needed for algorithm development.
Representations of Lie Algebras
Author: Anthony Henderson
Publisher: Cambridge University Press
ISBN: 1139561367
Category : Mathematics
Languages : en
Pages : 167
Book Description
This bold and refreshing approach to Lie algebras assumes only modest prerequisites (linear algebra up to the Jordan canonical form and a basic familiarity with groups and rings), yet it reaches a major result in representation theory: the highest-weight classification of irreducible modules of the general linear Lie algebra. The author's exposition is focused on this goal rather than aiming at the widest generality and emphasis is placed on explicit calculations with bases and matrices. The book begins with a motivating chapter explaining the context and relevance of Lie algebras and their representations and concludes with a guide to further reading. Numerous examples and exercises with full solutions are included. Based on the author's own introductory course on Lie algebras, this book has been thoroughly road-tested by advanced undergraduate and beginning graduate students and it is also suited to individual readers wanting an introduction to this important area of mathematics.
Publisher: Cambridge University Press
ISBN: 1139561367
Category : Mathematics
Languages : en
Pages : 167
Book Description
This bold and refreshing approach to Lie algebras assumes only modest prerequisites (linear algebra up to the Jordan canonical form and a basic familiarity with groups and rings), yet it reaches a major result in representation theory: the highest-weight classification of irreducible modules of the general linear Lie algebra. The author's exposition is focused on this goal rather than aiming at the widest generality and emphasis is placed on explicit calculations with bases and matrices. The book begins with a motivating chapter explaining the context and relevance of Lie algebras and their representations and concludes with a guide to further reading. Numerous examples and exercises with full solutions are included. Based on the author's own introductory course on Lie algebras, this book has been thoroughly road-tested by advanced undergraduate and beginning graduate students and it is also suited to individual readers wanting an introduction to this important area of mathematics.
Classical Groups, Derangements and Primes
Author: Timothy C. Burness
Publisher: Cambridge University Press
ISBN: 1107629446
Category : Mathematics
Languages : en
Pages : 365
Book Description
A graduate-level introduction to finite classical groups featuring a comprehensive account of the conjugacy and geometry of elements of prime order.
Publisher: Cambridge University Press
ISBN: 1107629446
Category : Mathematics
Languages : en
Pages : 365
Book Description
A graduate-level introduction to finite classical groups featuring a comprehensive account of the conjugacy and geometry of elements of prime order.
Orthogonal Latin Squares Based on Groups
Author: Anthony B. Evans
Publisher: Springer
ISBN: 3319944304
Category : Mathematics
Languages : en
Pages : 537
Book Description
This monograph presents a unified exposition of latin squares and mutually orthogonal sets of latin squares based on groups. Its focus is on orthomorphisms and complete mappings of finite groups, while also offering a complete proof of the Hall–Paige conjecture. The use of latin squares in constructions of nets, affine planes, projective planes, and transversal designs also motivates this inquiry. The text begins by introducing fundamental concepts, like the tests for determining whether a latin square is based on a group, as well as orthomorphisms and complete mappings. From there, it describes the existence problem for complete mappings of groups, building up to the proof of the Hall–Paige conjecture. The third part presents a comprehensive study of orthomorphism graphs of groups, while the last part provides a discussion of Cartesian projective planes, related combinatorial structures, and a list of open problems. Expanding the author’s 1992 monograph, Orthomorphism Graphs of Groups, this book is an essential reference tool for mathematics researchers or graduate students tackling latin square problems in combinatorics. Its presentation draws on a basic understanding of finite group theory, finite field theory, linear algebra, and elementary number theory—more advanced theories are introduced in the text as needed.
Publisher: Springer
ISBN: 3319944304
Category : Mathematics
Languages : en
Pages : 537
Book Description
This monograph presents a unified exposition of latin squares and mutually orthogonal sets of latin squares based on groups. Its focus is on orthomorphisms and complete mappings of finite groups, while also offering a complete proof of the Hall–Paige conjecture. The use of latin squares in constructions of nets, affine planes, projective planes, and transversal designs also motivates this inquiry. The text begins by introducing fundamental concepts, like the tests for determining whether a latin square is based on a group, as well as orthomorphisms and complete mappings. From there, it describes the existence problem for complete mappings of groups, building up to the proof of the Hall–Paige conjecture. The third part presents a comprehensive study of orthomorphism graphs of groups, while the last part provides a discussion of Cartesian projective planes, related combinatorial structures, and a list of open problems. Expanding the author’s 1992 monograph, Orthomorphism Graphs of Groups, this book is an essential reference tool for mathematics researchers or graduate students tackling latin square problems in combinatorics. Its presentation draws on a basic understanding of finite group theory, finite field theory, linear algebra, and elementary number theory—more advanced theories are introduced in the text as needed.
Moonshine, the Monster, and Related Topics
Author: Chongying Dong
Publisher: American Mathematical Soc.
ISBN: 0821803859
Category : Mathematics
Languages : en
Pages : 382
Book Description
This is the proceedings of a Joint Summer Research Conference held at Mount Holyoke College in Jun 1994. As perhaps the first conference proceedings devoted exclusively to the subject known as "Moonshine", this work contains something for many mathematicians and physicists. Many of the results featured are not available elsewhere.
Publisher: American Mathematical Soc.
ISBN: 0821803859
Category : Mathematics
Languages : en
Pages : 382
Book Description
This is the proceedings of a Joint Summer Research Conference held at Mount Holyoke College in Jun 1994. As perhaps the first conference proceedings devoted exclusively to the subject known as "Moonshine", this work contains something for many mathematicians and physicists. Many of the results featured are not available elsewhere.
Profiles
Author: R. S. Bhathal
Publisher: National Library Australia
ISBN: 9780642107015
Category : Biography & Autobiography
Languages : en
Pages : 208
Book Description
Here are sixteen tales of scientific discovery. In their own words, Australian women scientists tell the stories of their lives, their work and the secrets of their success. Until now, their world-famous achievements have not been widely known in their own country. In this remarkable book all talk candidly about their careers, describing not just the obstacles that many encountered--personal, social and institutionalised discrimination--but also their inspirations and influences.
Publisher: National Library Australia
ISBN: 9780642107015
Category : Biography & Autobiography
Languages : en
Pages : 208
Book Description
Here are sixteen tales of scientific discovery. In their own words, Australian women scientists tell the stories of their lives, their work and the secrets of their success. Until now, their world-famous achievements have not been widely known in their own country. In this remarkable book all talk candidly about their careers, describing not just the obstacles that many encountered--personal, social and institutionalised discrimination--but also their inspirations and influences.
Notes on Counting: An Introduction to Enumerative Combinatorics
Author: Peter J. Cameron
Publisher: Cambridge University Press
ISBN: 1108279325
Category : Mathematics
Languages : en
Pages : 235
Book Description
Enumerative combinatorics, in its algebraic and analytic forms, is vital to many areas of mathematics, from model theory to statistical mechanics. This book, which stems from many years' experience of teaching, invites students into the subject and prepares them for more advanced texts. It is suitable as a class text or for individual study. The author provides proofs for many of the theorems to show the range of techniques available, and uses examples to link enumerative combinatorics to other areas of study. The main section of the book introduces the key tools of the subject (generating functions and recurrence relations), which are then used to study the most important combinatorial objects, namely subsets, partitions, and permutations of a set. Later chapters deal with more specialised topics, including permanents, SDRs, group actions and the Redfield–Pólya theory of cycle indices, Möbius inversion, the Tutte polynomial, and species.
Publisher: Cambridge University Press
ISBN: 1108279325
Category : Mathematics
Languages : en
Pages : 235
Book Description
Enumerative combinatorics, in its algebraic and analytic forms, is vital to many areas of mathematics, from model theory to statistical mechanics. This book, which stems from many years' experience of teaching, invites students into the subject and prepares them for more advanced texts. It is suitable as a class text or for individual study. The author provides proofs for many of the theorems to show the range of techniques available, and uses examples to link enumerative combinatorics to other areas of study. The main section of the book introduces the key tools of the subject (generating functions and recurrence relations), which are then used to study the most important combinatorial objects, namely subsets, partitions, and permutations of a set. Later chapters deal with more specialised topics, including permanents, SDRs, group actions and the Redfield–Pólya theory of cycle indices, Möbius inversion, the Tutte polynomial, and species.