The mathematical theory of knots and braids: an introduction

Content: 
Edited by
Page iii

Copyright page
Page iv

Dedication
Page v

Apologia
Pages xi-xii
Tyler Hill

Chapter 1 Some Necessary Group Theory
Pages 1-32

Chapter 2 Some Necessary Topology
Pages 33-61

Chapter 3 Knots and Pictures of Knots
Pages 63-74

Chapter 4 Braids and the Braid Group
Pages 75-109

Chapter 5 Some Connections Between Braids and Links
Pages 111-118

Chapter 6 The Group of a Link
Pages 119-129

Chapter 7 Group Rings
Pages 131-138

Chapter 8 Derivatives
Pages 139-154

Chapter 9 Alexander Matrices
Pages 155-169

Chapter 10 Elementary Ideal of Alexander Matrix
Pages 171-173

Chapter 11 Alexander Polynomial of a Knot
Pages 175-184

Chapter 12 Alexander Polynomial of a Link
Pages 185-188

Chapter 13 Some Matrix Representations of the Braid Group
Pages 189-208

Chapter 14 Operations of Braids and Resulting Links
Pages 209-216

Chapter 15 The Group of a Free Endomorphism
Pages 217-221

Chapter 16 Alexander Polynomials Revisited
Pages 223-230

Chapter 17 Meridians and Longitudes
Pages 231-242

Chapter 18 Symmetry of Alexander Matrices of Knots
Pages 243-248

Chapter 19 Symmetry of Alexander Matrices of Links
Pages 249-259

Chapter 20 Conjugacy of Group Automorphisms
Pages 261-279

Chapter 21 Plait Representations of Links
Pages 281-285

Chapter Ω A List of Links
Pages 287-288

Bibliography
Pages 289-292

Index
Pages 293-295