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E-grāmata: Differential Topology

3.00/5 (2 ratings by Goodreads)
(University of Liverpool)
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Differential TopologyPalielināt
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Fully illustrated and rigorous in its approach, this is a comprehensive account of geometric techniques for studying the topology of smooth manifolds. Little prior knowledge is assumed, giving advanced students and researchers an accessible route into the wide-ranging field of differential topology.

Exploring the full scope of differential topology, this comprehensive account of geometric techniques for studying the topology of smooth manifolds offers a wide perspective on the field. Building up from first principles, concepts of manifolds are introduced, supplemented by thorough appendices giving background on topology and homotopy theory. Deep results are then developed from these foundations through in-depth treatments of the notions of general position and transversality, proper actions of Lie groups, handles (up to the h-cobordism theorem), immersions and embeddings, concluding with the surgery procedure and cobordism theory. Fully illustrated and rigorous in its approach, little prior knowledge is assumed, and yet growing complexity is instilled throughout. This structure gives advanced students and researchers an accessible route into the wide-ranging field of differential topology.

Recenzijas

'The book is of the highest quality as far as scholarship and exposition are concerned, which fits with the fact that Wall is a very big player in this game. I have had occasion over the years to do a good deal of work from books in the Cambridge Studies in Advanced Mathematics Series, always top drawer productions, and the present volume is no exception. I very much look forward to making good use of this fine book.' Michael Berg, MAA Reviews 'This monograph by the famous topologist C. T. C. Wall is based on his mimeographed notes from the 1960s. These notes are amended and supplemented with some new material, but they retain the spirit of the time when dfferential topology was still new and there were no books on the subject. This makes for a comprehensive yet highly readable introduction to the subject which has the right balance of intuition and rigor and which does not shy away from explaining 'well-known' facts.' Nikolai N. Saveliev, Mathematical Reviews

Papildus informācija

A comprehensive account giving advanced students and researchers an accessible route into the wide-ranging field of differential topology.
Introduction 1(7)
1 Foundations
8(28)
1.1 Smooth manifolds
9(7)
1.2 Smooth maps, tangent vectors, submanifolds
16(7)
1.3 Fibre bundles
23(3)
1.4 Integration of smooth vector fields
26(3)
1.5 Manifolds with boundary
29(5)
1.6 Notes on
Chapter 1
34(2)
2 Geometrical tools
36(32)
2.1 Riemannian metrics
37(2)
2.2 Geodesies
39(6)
2.3 Tubular neighbourhoods
45(4)
2.4 Diffeotopy extension theorems
49(4)
2.5 Tubular neighbourhood theorem
53(6)
2.6 Corners and straightening
59(4)
2.7 Cutting and glueing
63(4)
2.8 Notes on
Chapter 2
67(1)
3 Differentiable group actions
68(26)
3.1 Lie groups
68(4)
3.2 Smooth actions
72(2)
3.3 Proper actions and slices
74(4)
3.4 Properties of proper actions
78(3)
3.5 Orbit types
81(6)
3.6 Actions with few orbit types
87(3)
3.7 Examples of smooth proper group actions
90(2)
3.8 Notes on
Chapter 3
92(2)
4 General position and transversality
94(35)
4.1 Nul sets
95(1)
4.2 Whitney's embedding theorem
96(2)
4.3 Existence of non-degenerate functions
98(2)
4.4 Jet spaces and function spaces
100(5)
4.5 The transversality theorem
105(6)
4.6 Multitransversality
111(3)
4.7 Generic singularities of maps
114(8)
4.8 Normal forms
122(3)
4.9 Notes on
Chapter 4
125(4)
5 Theory of handle decompositions
129(38)
5.1 Existence
129(8)
5.2 Normalisation
137(2)
5.3 Homology of handles and manifolds
139(4)
5.4 Modifying decompositions
143(6)
5.5 Geometric connectivity and the h-cobordism theorem
149(4)
5.6 Applications of h-cobordism
153(6)
5.7 Complements
159(6)
5.8 Notes on
Chapter 5
165(2)
6 Immersions and embeddings
167(28)
6.1 Fibration theorems
167(2)
6.2 Geometry of immersions
169(7)
6.3 The Whitney trick
176(8)
6.4 Embeddings and immersions in the metastable range
184(9)
6.5 Notes on
Chapter 6
193(2)
7 Surgery
195(42)
7.1 The surgery procedure: a single surgery
196(3)
7.2 Surgery below the middle dimension
199(3)
7.3 Bilinear and quadratic forms
202(5)
7.4 Poincare complexes and pairs
207(5)
7.5 The even dimensional case
212(4)
7.6 The odd dimensional case
216(4)
7.7 Homotopy theory of Poincare complexes
220(5)
7.8 Homotopy types of smooth manifolds
225(9)
7.9 Notes on
Chapter 7
234(3)
8 Cobordism
237(59)
8.1 The Thorn construction
239(4)
8.2 Cobordism groups and rings
243(5)
8.3 Techniques of bordism theory
248(4)
8.4 Bordism as a homology theory
252(7)
8.5 Equivariant cobordism
259(3)
8.6 Classifying spaces, Ω, Ω
262(7)
8.7 Calculation of Ω and Ω
269(12)
8.8 Groups of knots and homotopy spheres
281(11)
8.9 Notes on
Chapter 8
292(4)
Appendix A Topology
296(18)
A.1 Definitions
296(2)
A.2 Topology of metric spaces
298(5)
A.3 Proper group actions
303(3)
A.4 Mapping spaces
306(8)
Appendix B Homotopy theory
314(17)
B.1 Definitions and basic properties
314(5)
B.2 Groups and homogeneous spaces
319(4)
B.3 Homotopy calculations
323(4)
B.4 Further techniques
327(4)
References 331(9)
Index of notations 340(5)
Index 345
C. T. C. Wall is Emeritus Professor in the Division of Pure Mathematics at the University of Liverpool. During his career he has held positions at the University of Oxford and the University of Cambridge and has been invited as a major speaker to numerous conferences in Europe, the USA and South America. He was elected a Fellow of the Royal Society in 1969.
Biežāk uzdotie jautājumi par e-grāmatām Biežāk uzdotie jautājumi par e-grāmatām
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