| Introduction |
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1 | (7) |
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8 | (28) |
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9 | (7) |
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1.2 Smooth maps, tangent vectors, submanifolds |
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16 | (7) |
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23 | (3) |
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1.4 Integration of smooth vector fields |
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26 | (3) |
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1.5 Manifolds with boundary |
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29 | (5) |
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34 | (2) |
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36 | (32) |
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37 | (2) |
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39 | (6) |
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2.3 Tubular neighbourhoods |
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45 | (4) |
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2.4 Diffeotopy extension theorems |
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49 | (4) |
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2.5 Tubular neighbourhood theorem |
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53 | (6) |
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2.6 Corners and straightening |
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59 | (4) |
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63 | (4) |
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67 | (1) |
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3 Differentiable group actions |
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68 | (26) |
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68 | (4) |
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72 | (2) |
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3.3 Proper actions and slices |
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74 | (4) |
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3.4 Properties of proper actions |
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78 | (3) |
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81 | (6) |
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3.6 Actions with few orbit types |
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87 | (3) |
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3.7 Examples of smooth proper group actions |
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90 | (2) |
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92 | (2) |
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4 General position and transversality |
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94 | (35) |
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95 | (1) |
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4.2 Whitney's embedding theorem |
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96 | (2) |
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4.3 Existence of non-degenerate functions |
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98 | (2) |
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4.4 Jet spaces and function spaces |
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100 | (5) |
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4.5 The transversality theorem |
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105 | (6) |
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111 | (3) |
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4.7 Generic singularities of maps |
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114 | (8) |
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122 | (3) |
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125 | (4) |
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5 Theory of handle decompositions |
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129 | (38) |
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129 | (8) |
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137 | (2) |
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5.3 Homology of handles and manifolds |
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139 | (4) |
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5.4 Modifying decompositions |
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143 | (6) |
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5.5 Geometric connectivity and the h-cobordism theorem |
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149 | (4) |
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5.6 Applications of h-cobordism |
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153 | (6) |
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159 | (6) |
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165 | (2) |
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6 Immersions and embeddings |
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167 | (28) |
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167 | (2) |
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6.2 Geometry of immersions |
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169 | (7) |
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176 | (8) |
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6.4 Embeddings and immersions in the metastable range |
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184 | (9) |
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193 | (2) |
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195 | (42) |
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7.1 The surgery procedure: a single surgery |
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196 | (3) |
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7.2 Surgery below the middle dimension |
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199 | (3) |
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7.3 Bilinear and quadratic forms |
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202 | (5) |
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7.4 Poincare complexes and pairs |
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207 | (5) |
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7.5 The even dimensional case |
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212 | (4) |
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7.6 The odd dimensional case |
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216 | (4) |
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7.7 Homotopy theory of Poincare complexes |
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220 | (5) |
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7.8 Homotopy types of smooth manifolds |
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225 | (9) |
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234 | (3) |
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237 | (59) |
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8.1 The Thorn construction |
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239 | (4) |
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8.2 Cobordism groups and rings |
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243 | (5) |
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8.3 Techniques of bordism theory |
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248 | (4) |
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8.4 Bordism as a homology theory |
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252 | (7) |
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8.5 Equivariant cobordism |
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259 | (3) |
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8.6 Classifying spaces, Ω, Ω |
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262 | (7) |
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8.7 Calculation of Ω and Ω |
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269 | (12) |
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8.8 Groups of knots and homotopy spheres |
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281 | (11) |
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292 | (4) |
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296 | (18) |
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296 | (2) |
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A.2 Topology of metric spaces |
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298 | (5) |
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303 | (3) |
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306 | (8) |
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Appendix B Homotopy theory |
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314 | (17) |
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B.1 Definitions and basic properties |
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314 | (5) |
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B.2 Groups and homogeneous spaces |
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319 | (4) |
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B.3 Homotopy calculations |
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323 | (4) |
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327 | (4) |
| References |
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331 | (9) |
| Index of notations |
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340 | (5) |
| Index |
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345 | |
