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E-raamat: Lectures on the Topology of 3-Manifolds: An Introduction to the Casson Invariant

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  • Formaat: PDF+DRM
  • Sari: De Gruyter Textbook
  • Ilmumisaeg: 23-Dec-2011
  • Kirjastus: De Gruyter
  • Keel: eng
  • ISBN-13: 9783110250367
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Lectures on the Topology of 3-Manifolds: An Introduction to the Casson InvariantSuurem pilt
  • Formaat: PDF+DRM
  • Sari: De Gruyter Textbook
  • Ilmumisaeg: 23-Dec-2011
  • Kirjastus: De Gruyter
  • Keel: eng
  • ISBN-13: 9783110250367
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Progress in low-dimensional topology has been very quick in the last three decades, leading to the solutions of many difficult problems. Among the earlier highlights of this period was Casson's -invariant that was instrumental in proving the vanishing of the Rohlin invariant of homotopy 3-spheres. The proof of the three-dimensional Poincaré conjecture has rendered this application moot but hardly made Casson's contribution less relevant: in fact, a lot of modern day topology, including a multitude of Floer homology theories, can be traced back to his -invariant.

The principal goal of this book, now in its second revised edition, remains providing an introduction to the low-dimensional topology and Casson's theory; it also reaches out, when appropriate, to more recent research topics. The book covers some classical material, such as Heegaard splittings, Dehn surgery, and invariants of knots and links. It then proceeds through the Kirby calculus and Rohlin's theorem to Casson's invariant and its applications, and concludes with a brief overview of recent developments.

The book will be accessible to graduate students in mathematics and theoretical physics familiar with some elementary algebraic and differential topology, including the fundamental group, basic homology theory, transversality, and Poincaré duality on manifolds.

Arvustused

This is an excellent introduction to the Rokhlin and Casson invariants for homology 3-spheres [ ...], and in particular also to the necessary background material from the theory of 3- and 4-manifolds [ ...], so the book may serve also as a reasonable short and efficient introduction to some important parts of low-dimensional topology. It grew out of a course for second year graduate students and concentrates 19 lectures on less than 200 pages, including also a glossary on back-ground material from algebraic topology, a collection of exercises, open problems and comments on recent developments [ ...] To conclude, the author has succeeded in presenting a lot of material in a clear and efficient way, and the book is interesting and stimulating to read. Birge Zimmermann-Huisgen, Zentralblatt MATH

Preface v
Introduction 1(2)
Glossary 3(13)
1 Heegaard splittings
16(16)
1.1 Introduction
16(1)
1.2 Existence of Heegaard splittings
17(1)
1.3 Stable equivalence of Heegaard splittings
18(3)
1.4 The mapping class group
21(2)
1.5 Manifolds of Heegaard genus ≤ 1
23(3)
1.6 Seifert manifolds
26(2)
1.7 Heegaard diagrams
28(3)
1.8 Exercises
31(1)
2 Dehn surgery
32(11)
2.1 Knots and links in 3-manifolds
32(1)
2.2 Surgery on links in S3
33(2)
2.3 Surgery description of lens spaces and Seifert manifolds
35(4)
2.4 Surgery and 4-manifolds
39(3)
2.5 Exercises
42(1)
3 Kirby calculus
43(15)
3.1 The linking number
43(2)
3.2 Kirby moves
45(9)
3.3 The linking matrix
54(1)
3.4 Reversing orientation
55(1)
3.5 Exercises
56(2)
4 Even surgeries
58(5)
4.1 Exercises
62(1)
5 Review of 4-manifolds
63(9)
5.1 Definition of the intersection form
63(4)
5.2 The unimodular integral forms
67(1)
5.3 Four-manifolds and intersection forms
68(3)
5.4 Exercises
71(1)
6 Four-manifolds with boundary
72(9)
6.1 The intersection form
72(5)
6.2 Homology spheres via surgery on knots
77(1)
6.3 Seifert homology spheres
77(2)
6.4 The Rohlin invariant
79(1)
6.5 Exercises
80(1)
7 Invariants of knots and links
81(17)
7.1 Seifert surfaces
81(2)
7.2 Seifert matrices
83(2)
7.3 The Alexander polynomial
85(4)
7.4 Other invariants from Seifert surfaces
89(2)
7.5 Knots in homology spheres
91(2)
7.6 Boundary links and the Alexander polynomial
93(3)
7.7 Exercises
96(2)
8 Fibered knots
98(11)
8.1 The definition of a fibered knot
98(2)
8.2 The monodromy
100(2)
8.3 More about torus knots
102(1)
8.4 Joins
103(2)
8.5 The monodromy of torus knots
105(1)
8.6 Open book decompositions
106(2)
8.7 Exercises
108(1)
9 The Arf-invariant
109(7)
9.1 The Arf-invariant of a quadratic form
109(3)
9.2 The Arf-invariant of a knot
112(3)
9.3 Exercises
115(1)
10 Rohlin's theorem
116(7)
10.1 Characteristic surfaces
116(1)
10.2 The definition of q
117(5)
10.3 Representing homology classes by surfaces
122(1)
11 The Rohlin invariant
123(12)
11.1 Definition of the Rohlin invariant
123(1)
11.2 The Rohlin invariant of Seifert spheres
123(4)
11.3 A surgery formula for the Rohlin invariant
127(2)
11.4 The homology cobordism group
129(4)
11.5 Exercises
133(2)
12 The Casson invariant
135(7)
12.1 Exercises
141(1)
13 The group SU(2)
142(6)
13.1 Exercises
147(1)
14 Representation spaces
148(11)
14.1 The topology of representation spaces
148(1)
14.2 Irreducible representations
149(1)
14.3 Representations of free groups
150(1)
14.4 Representations of surface groups
150(3)
14.5 Representations for Seifert homology spheres
153(5)
14.6 Exercises
158(1)
15 The local properties of representation spaces
159(4)
15.1 Exercises
162(1)
16 Casson's invariant for Heegaard splittings
163(9)
16.1 The intersection product
163(3)
16.2 The orientations
166(2)
16.3 Independence of Heegaard splitting
168(3)
16.4 Exercises
171(1)
17 Casson's invariant for knots
172(9)
17.1 Preferred Heegaard splittings
172(1)
17.2 The Casson invariant for knots
173(4)
17.3 The difference cycle
177(1)
17.4 The Casson invariant for boundary links
178(1)
17.5 The Casson invariant of a trefoil
179(2)
18 An application of the Casson invariant
181(3)
18.1 Triangulating 4-manifolds
181(1)
18.2 Higher-dimensional manifolds
182(1)
18.3 Exercises
183(1)
19 The Casson invariant of Seifert manifolds
184(7)
19.1 The space R(p, q, r)
184(3)
19.2 Calculation of the Casson invariant
187(3)
19.3 Exercises
190(1)
Conclusion 191(4)
Bibliography 195(10)
Index 205
Nikolai Saveliev, University of Miami, Florida, USA.
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