Combinatorics of Permutations, 2nd Edition

Combinatorics of Permutations, 2nd Edition

by Miklos Bona
Released April 2016
Publisher(s): Chapman and Hall/CRC
ISBN: 9781439850527

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Book description

A Unified Account of Permutations in Modern CombinatoricsA 2006 CHOICE Outstanding Academic Title, the first edition of this bestseller was lauded for its detailed yet engaging treatment of permutations. Providing more than enough material for a one-semester course, Combinatorics of Permutations, Second Edition continues to clearly show the usefuln

Table of contents

  1. Front Cover (1/2)
  2. Front Cover (2/2)
  3. Dedication
  4. Contents
  5. Foreword
  6. Preface to the First Edition
  7. Preface to the Second Edition
  8. Acknowledgments
  9. No Way around It. Introduction
  10. 1. In One Line and Close. Permutations as Linear Orders (1/10)
  11. 1. In One Line and Close. Permutations as Linear Orders (2/10)
  12. 1. In One Line and Close. Permutations as Linear Orders (3/10)
  13. 1. In One Line and Close. Permutations as Linear Orders (4/10)
  14. 1. In One Line and Close. Permutations as Linear Orders (5/10)
  15. 1. In One Line and Close. Permutations as Linear Orders (6/10)
  16. 1. In One Line and Close. Permutations as Linear Orders (7/10)
  17. 1. In One Line and Close. Permutations as Linear Orders (8/10)
  18. 1. In One Line and Close. Permutations as Linear Orders (9/10)
  19. 1. In One Line and Close. Permutations as Linear Orders (10/10)
  20. 2. In One Line and Anywhere. Permutations as Linear Orders. Inversions (1/7)
  21. 2. In One Line and Anywhere. Permutations as Linear Orders. Inversions (2/7)
  22. 2. In One Line and Anywhere. Permutations as Linear Orders. Inversions (3/7)
  23. 2. In One Line and Anywhere. Permutations as Linear Orders. Inversions (4/7)
  24. 2. In One Line and Anywhere. Permutations as Linear Orders. Inversions (5/7)
  25. 2. In One Line and Anywhere. Permutations as Linear Orders. Inversions (6/7)
  26. 2. In One Line and Anywhere. Permutations as Linear Orders. Inversions (7/7)
  27. 3. In Many Circles. Permutations as Products of Cycles (1/13)
  28. 3. In Many Circles. Permutations as Products of Cycles (2/13)
  29. 3. In Many Circles. Permutations as Products of Cycles (3/13)
  30. 3. In Many Circles. Permutations as Products of Cycles (4/13)
  31. 3. In Many Circles. Permutations as Products of Cycles (5/13)
  32. 3. In Many Circles. Permutations as Products of Cycles (6/13)
  33. 3. In Many Circles. Permutations as Products of Cycles (7/13)
  34. 3. In Many Circles. Permutations as Products of Cycles (8/13)
  35. 3. In Many Circles. Permutations as Products of Cycles (9/13)
  36. 3. In Many Circles. Permutations as Products of Cycles (10/13)
  37. 3. In Many Circles. Permutations as Products of Cycles (11/13)
  38. 3. In Many Circles. Permutations as Products of Cycles (12/13)
  39. 3. In Many Circles. Permutations as Products of Cycles (13/13)
  40. 4. In Any Way but This. Pattern Avoidance. The Basics (1/10)
  41. 4. In Any Way but This. Pattern Avoidance. The Basics (2/10)
  42. 4. In Any Way but This. Pattern Avoidance. The Basics (3/10)
  43. 4. In Any Way but This. Pattern Avoidance. The Basics (4/10)
  44. 4. In Any Way but This. Pattern Avoidance. The Basics (5/10)
  45. 4. In Any Way but This. Pattern Avoidance. The Basics (6/10)
  46. 4. In Any Way but This. Pattern Avoidance. The Basics (7/10)
  47. 4. In Any Way but This. Pattern Avoidance. The Basics (8/10)
  48. 4. In Any Way but This. Pattern Avoidance. The Basics (9/10)
  49. 4. In Any Way but This. Pattern Avoidance. The Basics (10/10)
  50. 5. In This Way, but Nicely. Pattern Avoidance. Follow-Up (1/8)
  51. 5. In This Way, but Nicely. Pattern Avoidance. Follow-Up (2/8)
  52. 5. In This Way, but Nicely. Pattern Avoidance. Follow-Up (3/8)
  53. 5. In This Way, but Nicely. Pattern Avoidance. Follow-Up (4/8)
  54. 5. In This Way, but Nicely. Pattern Avoidance. Follow-Up (5/8)
  55. 5. In This Way, but Nicely. Pattern Avoidance. Follow-Up (6/8)
  56. 5. In This Way, but Nicely. Pattern Avoidance. Follow-Up (7/8)
  57. 5. In This Way, but Nicely. Pattern Avoidance. Follow-Up (8/8)
  58. 6. Mean and Insensitive. Random Permutations (1/8)
  59. 6. Mean and Insensitive. Random Permutations (2/8)
  60. 6. Mean and Insensitive. Random Permutations (3/8)
  61. 6. Mean and Insensitive. Random Permutations (4/8)
  62. 6. Mean and Insensitive. Random Permutations (5/8)
  63. 6. Mean and Insensitive. Random Permutations (6/8)
  64. 6. Mean and Insensitive. Random Permutations (7/8)
  65. 6. Mean and Insensitive. Random Permutations (8/8)
  66. 7. Permutations and the Rest. Algebraic Combinatorics of Permutations (1/8)
  67. 7. Permutations and the Rest. Algebraic Combinatorics of Permutations (2/8)
  68. 7. Permutations and the Rest. Algebraic Combinatorics of Permutations (3/8)
  69. 7. Permutations and the Rest. Algebraic Combinatorics of Permutations (4/8)
  70. 7. Permutations and the Rest. Algebraic Combinatorics of Permutations (5/8)
  71. 7. Permutations and the Rest. Algebraic Combinatorics of Permutations (6/8)
  72. 7. Permutations and the Rest. Algebraic Combinatorics of Permutations (7/8)
  73. 7. Permutations and the Rest. Algebraic Combinatorics of Permutations (8/8)
  74. 8. Get Them All. Algorithms and Permutations (1/8)
  75. 8. Get Them All. Algorithms and Permutations (2/8)
  76. 8. Get Them All. Algorithms and Permutations (3/8)
  77. 8. Get Them All. Algorithms and Permutations (4/8)
  78. 8. Get Them All. Algorithms and Permutations (5/8)
  79. 8. Get Them All. Algorithms and Permutations (6/8)
  80. 8. Get Them All. Algorithms and Permutations (7/8)
  81. 8. Get Them All. Algorithms and Permutations (8/8)
  82. 9. How Did We Get Here? Permutations as Genome Rearrangements (1/7)
  83. 9. How Did We Get Here? Permutations as Genome Rearrangements (2/7)
  84. 9. How Did We Get Here? Permutations as Genome Rearrangements (3/7)
  85. 9. How Did We Get Here? Permutations as Genome Rearrangements (4/7)
  86. 9. How Did We Get Here? Permutations as Genome Rearrangements (5/7)
  87. 9. How Did We Get Here? Permutations as Genome Rearrangements (6/7)
  88. 9. How Did We Get Here? Permutations as Genome Rearrangements (7/7)
  89. Do Not Look Just Yet. Solutions to Odd-Numbered Exercises (1/10)
  90. Do Not Look Just Yet. Solutions to Odd-Numbered Exercises (2/10)
  91. Do Not Look Just Yet. Solutions to Odd-Numbered Exercises (3/10)
  92. Do Not Look Just Yet. Solutions to Odd-Numbered Exercises (4/10)
  93. Do Not Look Just Yet. Solutions to Odd-Numbered Exercises (5/10)
  94. Do Not Look Just Yet. Solutions to Odd-Numbered Exercises (6/10)
  95. Do Not Look Just Yet. Solutions to Odd-Numbered Exercises (7/10)
  96. Do Not Look Just Yet. Solutions to Odd-Numbered Exercises (8/10)
  97. Do Not Look Just Yet. Solutions to Odd-Numbered Exercises (9/10)
  98. Do Not Look Just Yet. Solutions to Odd-Numbered Exercises (10/10)
  99. References (1/4)
  100. References (2/4)
  101. References (3/4)
  102. References (4/4)
  103. List of Frequently Used Notation

Product information

  • Title: Combinatorics of Permutations, 2nd Edition
  • Author(s): Miklos Bona
  • Release date: April 2016
  • Publisher(s): Chapman and Hall/CRC
  • ISBN: 9781439850527