Latin squares and their applications. (2015)
- Record Type:
- Book
- Title:
- Latin squares and their applications. (2015)
- Main Title:
- Latin squares and their applications
- Further Information:
- Note: A. Donald Keedwell, József Dénes.
- Authors:
- Keedwell, A. D
Dénes, J (József) - Contents:
- Front Cover; Latin Squares and their Applications; Copyright; Foreword to the First Edition; Contents; Preface to the First Edition; Acknowledgements (First Edition); Preface to the Second Edition; Chapter 1: Elementary Properties; 1.1 The Multiplication Table of a Quasigroup; 1.2 The Cayley Table of a Group; 1.3 Isotopy; 1.4 Conjugacy and Parastrophy; 1.5 Transversals and Complete Mappings; 1.6 Latin Subsquares and Subquasigroups; Chapter 2: Special Types of Latin Square; 2.1 Quasigroup Identities and Latin Squares 2.2 Quasigroups of Some Special Types and the Concept of Generalized Associativity2.3 Triple Systems and Quasigroups; 2.4 Group-Based Latin Squares and Nuclei of Loops; 2.5 Transversals in Group-Based Latin Squares; 2.6 Complete Latin Squares; Chapter 3: Partial Latin Squares and Partial Transversals; 3.1 Latin Rectangles and Row Latin Squares; 3.2 Critical Sets and Sudoku Puzzles; 3.3 Fuchs' Problems; 3.4 Incomplete Latin Squares and Partial Quasigroups; 3.5 Partial Transversals and Generalized Transversals; Chapter 4: Classification and Enumeration of Latin Squares and Latin Rectangles 4.1 The Autotopism Group of a Quasigroup4.2 Classification of Latin Squares; 4.3 History of the Classification and Enumeration of Latin Squares; 4.4 Enumeration of Latin Rectangles; 4.5 Enumeration of Transversals; 4.6 Enumeration of Subsquares; Chapter 5: The Concept of Orthogonality; 5.1 Existence Questions for Incomplete Sets of Orthogonal Latin Squares; 5.2 Complete Sets ofFront Cover; Latin Squares and their Applications; Copyright; Foreword to the First Edition; Contents; Preface to the First Edition; Acknowledgements (First Edition); Preface to the Second Edition; Chapter 1: Elementary Properties; 1.1 The Multiplication Table of a Quasigroup; 1.2 The Cayley Table of a Group; 1.3 Isotopy; 1.4 Conjugacy and Parastrophy; 1.5 Transversals and Complete Mappings; 1.6 Latin Subsquares and Subquasigroups; Chapter 2: Special Types of Latin Square; 2.1 Quasigroup Identities and Latin Squares 2.2 Quasigroups of Some Special Types and the Concept of Generalized Associativity2.3 Triple Systems and Quasigroups; 2.4 Group-Based Latin Squares and Nuclei of Loops; 2.5 Transversals in Group-Based Latin Squares; 2.6 Complete Latin Squares; Chapter 3: Partial Latin Squares and Partial Transversals; 3.1 Latin Rectangles and Row Latin Squares; 3.2 Critical Sets and Sudoku Puzzles; 3.3 Fuchs' Problems; 3.4 Incomplete Latin Squares and Partial Quasigroups; 3.5 Partial Transversals and Generalized Transversals; Chapter 4: Classification and Enumeration of Latin Squares and Latin Rectangles 4.1 The Autotopism Group of a Quasigroup4.2 Classification of Latin Squares; 4.3 History of the Classification and Enumeration of Latin Squares; 4.4 Enumeration of Latin Rectangles; 4.5 Enumeration of Transversals; 4.6 Enumeration of Subsquares; Chapter 5: The Concept of Orthogonality; 5.1 Existence Questions for Incomplete Sets of Orthogonal Latin Squares; 5.2 Complete Sets of Orthogonal Latin Squares and Projective Planes; 5.3 Sets of MOLS of Maximum and Minimum Size; 5.4 Orthogonal Quasigroups, Qroupoids and Triple Systems 5.5 Self-Orthogonal and Other Parastrophic Orthogonal Latin Squares and Quasigroups5.6 Orthogonality in Other Structures Related to Latin Squares; Chapter 6: Connections Between Latin Squares and Magic Squares; 6.1 Diagonal (or Magic) Latin Squares; 6.2 Construction of Magic Squares with the Aid of Orthogonal Latin Squares.; 6.3 Additional Results on Magic Squares; 6.4 Room Squares: Their Construction and Uses; Chapter 7: Constructions of Orthogonal Latin Squares Which Involve Rearrangement of Rows and Columns; 7.1 Generalized Bose Construction: Constructions Based on Abelian Groups 7.2 The Automorphism Method of H.B. Mann7.3 The Construction of Pairs of Orthogonal Latin Squares of Order Ten; 7.4 The Column Method; 7.5 The Diagonal Method; 7.6 Left Neofields and Orthomorphisms of Groups; Chapter 8: Connections with Geometry and Graph Theory; 8.1 Quasigroups and 3-Nets; 8.2 Orthogonal Latin Squares, k-Nets and Introduction of Co-ordinates; 8.3 Latin Squares and Graphs; Chapter 9: Latin Squares with Particular Properties; 9.1 Bachelor Squares; 9.2 Homogeneous Latin Squares; 9.3 Diagonally Cyclic Latin Squares and Parker Squares … (more)
- Edition:
- Second edition
- Publisher Details:
- Amsterdam : Elsevier
- Publication Date:
- 2015
- Extent:
- 1 online resource
- Subjects:
- 511/.64
Magic squares
MATHEMATICS / General
Magic squares
Magic squares
Electronic books
Electronic books - Languages:
- English
- ISBNs:
- 9780444635587
0444635580 - Related ISBNs:
- 9780444635556
- Notes:
- Note: Includes bibliographical references and index.
Note: Online resource; title from PDF title page (ScienceDirect, viewed August 6, 2015). - Access Rights:
- Legal Deposit; Only available on premises controlled by the deposit library and to one user at any one time; The Legal Deposit Libraries (Non-Print Works) Regulations (UK).
- Access Usage:
- Restricted: Printing from this resource is governed by The Legal Deposit Libraries (Non-Print Works) Regulations (UK) and UK copyright law currently in force.
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library HMNTS - ELD.DS.96770
- Ingest File:
- 01_075.xml