- Page 2 and 3: ALEXEI SOSSINSKY TRANSLATED BY CIS
- Page 4: CONTENTS PREFACE vii 1. ATOMS AND K
- Page 7 and 8: viii PREFACE This book addresses th
- Page 9 and 10: x PREFACE Since Antiquity, the deve
- Page 11 and 12: xii PREFACE (a) Figure P.3. Pullies
- Page 13 and 14: XIV PREFACE Figure P. S. Links on a
- Page 15 and 16: XVI PREFACE The second chapter deal
- Page 17 and 18: xviii PREFACE bracket-that is very
- Page 22 and 23: I ATOMS ANO KNOTS (Lord Kelvin· 18
- Page 24 and 25: ATO MS ANO KNOTS Figure 1.2. Three
- Page 26 and 27: ATO MS ANO KNOTS 5 Figure 1.4. Two
- Page 28 and 29: ATO MS ANO KNOTS 7 %%%%% Figure 1.6
- Page 30 and 31: ATO MS ANO KNOTS Figure 1.7. A knot
- Page 32 and 33: ATO MS AND KNOTS 11 then the four (
- Page 34 and 35: ATO MS AND KNOTS 13 blindo But actu
- Page 36 and 37: BRAIDED KNOTS (Alexander· 1923) Th
- Page 38 and 39: BRAIDED KNOTS 17 %%%%%%%%\h:\h::'.\
- Page 40 and 41: BRAI DED KNOTS 19 Figure 2.4. Unrol
- Page 42 and 43: BRAIDED KNOTS 21 Figure 2.6. Desing
- Page 44 and 45: BRAI DED KNOTS 23 %%%%%%%% (a) (b)
- Page 46 and 47: BRAIDED KNOTS 2S est Seifert circle
- Page 48 and 49: BRAI DED KNOTS 27 (a) (b) (c) Figur
- Page 50 and 51: BRAIDED KNOTS 29 braid obtained by
- Page 52 and 53: BRAI DED KNOTS i i+l i+ 2 i+l i+ 2
- Page 54 and 55: BRAIDED KNOTS 33 Iation, which take
- Page 56 and 57: 3 PLANAR DIAGRAMS OF KNOTS (Reideme
- Page 58 and 59: PLANAR DIAGRAMS OF KNOTS 37 (a) (b)
- Page 60 and 61: PLANAR DIAGRAMS OF KNOTS 39 single
- Page 62 and 63: PLANAR DIAGRAMS OF KNOTS 41 If one
- Page 64 and 65: PLANAR DIAGRAMS OF KNOTS 43 This ot
- Page 66 and 67: PLANAR DIAGRAMS OF KNOTS 45 rithm (
- Page 68 and 69: THE ARITHMETIC OF KNOTS 47 - C Y F
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THE ARITHMETIC OF KNOTS 49 a#b= b#a
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TH E ARITHMETIC OF KNOTS 51 cause o
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TH E ARITHMETIC OF KNOTS 53 just co
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THE ARITH METI C OF KNOTS 55 ber l
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TH E ARITHMETIC OF KNOTS 57 added;
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SURGERY ANO INVA RIANTS 59 %%%%%%%%
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SURGERY AND INVA RIANTS 61 Figure 5
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SURGERY AN D INVA RIANTS 63 the enz
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SURGERY AND INVA RIANTS 65 Figure 5
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SURGERY AND INVARIANTS 67 Invarianc
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SURGERY AND INVA RIANTS 69 FinalIy,
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SURGERY AND INVA RIANTS 71 tion sim
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6 JONES'S POLYNOMIAL AN O SPIN MOOE
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JONES'S POLYNOMIAL AND SPIN MODELS
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JONES'S POLYNOMIAL ANO SPIN MOOELS
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JONES'S POLYNOMIAL AND SPIN MODELS
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JONES'S POLYN OMIAL AND SPIN MODELS
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JONES'S POLYNOMIAL AND SPIN MODELS
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JONES'S POLYNOMIAL AND SPIN MODELS
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JONES'S POLYNOMIAL AND SPIN MODELS
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JONES'S POLYNOMIAL AND SPIN MODELS
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FI NITE-ORDER INVARIANTS 91 when on
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94 KNOTS yes, both in this particul
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96 KN OTS A Brief Description of th
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98 KNOTS Actually, deducing equatio
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100 KNOTS who like these things can
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102 KNOTS and I have not drawn the
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104 KNOTS nonequivalent knots can h
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106 KNOTS to me that there is. I am
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108 KNOTS abled him to describe the
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110 KNOTS global parameters of the
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112 KNOTS easily to the most famous
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114 KNOTS ampIe is shown in Figure
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116 KNOTS . . .. . .. 0 O . . .
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118 KNOTS Jacobi identity to constr
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Preface NOTES l. For those who know
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NOTES 123 (since it hasn't succeede
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NOTES 125 we have not shown anythin
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WO RKS CITED Adams, C. 1994. The Kn