eBook ISBN: | 978-1-4704-5836-2 |
Product Code: | CLRM/23.E |
List Price: | $55.00 |
MAA Member Price: | $41.25 |
AMS Member Price: | $41.25 |
eBook ISBN: | 978-1-4704-5836-2 |
Product Code: | CLRM/23.E |
List Price: | $55.00 |
MAA Member Price: | $41.25 |
AMS Member Price: | $41.25 |
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Book DetailsClassroom Resource MaterialsVolume: 23; 2003; 305 pp
Popular puzzles such as the Rubik's cube and so-called oval track puzzles give a concrete representation to the theory of permutation groups. They are relatively simple to describe in group theoretic terms, yet present a challenge to anyone trying to solve them. John Kiltinen shows how the theory of permutation groups can be used to solve a range of puzzles. There is also an accompanying CD that can be used to reduce the need for carrying out long calculations and memorizing difficult sequences of moves.
This book will prove useful as supplemental material for students taking abstract algebra courses. It provides a real application of the theory and methods of permutation groups, one of the standard topics. It will also be of interest to anyone with an interest in puzzles and a basic grounding in mathematics. The author has provided plenty of exercises and examples to aid study.
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Table of Contents
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Chapters
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0. Software Installation and a First Tour
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1. An Overview of Oval Tracks
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2. The Transpose Puzzle: An Introductory Tour
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3. The Slide Puzzle: An Introductory Tour
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4. The Hungarian Rings Puzzle: An Introductory Tour
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5. Permutation Groups: Just Enough Definitions and Notation
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6. Permutation Groups: Just Enough Theory
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7. Cycles and Transpositions
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8. The Parity Theorem
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9. The Role of Conjugates
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10. The Role of Commutators
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11. Mastering the Oval Track Puzzle
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12. Transferring Knowledge Between Puzzles
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13. What a Difference a Disk Makes!: Changing the Number of Disks, and Using Maple or GAP
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14. Mastering the Slide Puuzzle
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15. Mastering the Hungarian Rings with Numbers
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16. Mastering the Hungarian Rings with Colors
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17. Advanced Challenges
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Additional Material
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RequestsReview Copy – for publishers of book reviewsAccessibility – to request an alternate format of an AMS title
- Book Details
- Table of Contents
- Additional Material
- Requests
Popular puzzles such as the Rubik's cube and so-called oval track puzzles give a concrete representation to the theory of permutation groups. They are relatively simple to describe in group theoretic terms, yet present a challenge to anyone trying to solve them. John Kiltinen shows how the theory of permutation groups can be used to solve a range of puzzles. There is also an accompanying CD that can be used to reduce the need for carrying out long calculations and memorizing difficult sequences of moves.
This book will prove useful as supplemental material for students taking abstract algebra courses. It provides a real application of the theory and methods of permutation groups, one of the standard topics. It will also be of interest to anyone with an interest in puzzles and a basic grounding in mathematics. The author has provided plenty of exercises and examples to aid study.
-
Chapters
-
0. Software Installation and a First Tour
-
1. An Overview of Oval Tracks
-
2. The Transpose Puzzle: An Introductory Tour
-
3. The Slide Puzzle: An Introductory Tour
-
4. The Hungarian Rings Puzzle: An Introductory Tour
-
5. Permutation Groups: Just Enough Definitions and Notation
-
6. Permutation Groups: Just Enough Theory
-
7. Cycles and Transpositions
-
8. The Parity Theorem
-
9. The Role of Conjugates
-
10. The Role of Commutators
-
11. Mastering the Oval Track Puzzle
-
12. Transferring Knowledge Between Puzzles
-
13. What a Difference a Disk Makes!: Changing the Number of Disks, and Using Maple or GAP
-
14. Mastering the Slide Puuzzle
-
15. Mastering the Hungarian Rings with Numbers
-
16. Mastering the Hungarian Rings with Colors
-
17. Advanced Challenges