Verfügbarkeit: Algorithmic and computer methods for three-manifolds

Algorithmic and computer methods for three-manifolds:

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Bibliographische Detailangaben
Hauptverfasser:	Fomenko, Anatolij Timofeevič 1945- (VerfasserIn), Matveev, Sergej V. 1967- (VerfasserIn)
Format:	Buch
Sprache:	English
Veröffentlicht:	Dordrecht [u.a.] Kluwer 1997
Schriftenreihe:	Mathematics and its applications 425
Schlagworte:	Three-manifolds (Topology) Dimension 3 Mannigfaltigkeit Algorithmus
Online-Zugang:	Inhaltsverzeichnis
Beschreibung:	Frühere Ausg. u.d.T.: Matveev, Sergej V.: Algorithmical and computer methods in three-dimensional topology
Beschreibung:	XII, 334 S. Ill., graph. Darst.
ISBN:	0792347706

Internformat

MARC


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Datensatz im Suchindex

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adam_text	TABLE OF CONTENTS Series editor s preface v Preface xi Chapter 1. Preliminary information 1.1 On the style of presentation 1 1.2 Some facts from general topology 1 1.3 Gluings 4 1.4 Polyhedra and complexes 5 1.5 Fundamental groups 9 1.6 An algorithm for the calculation of the fundamental group 10 1.7 The second homotopy group and the first homology group 15 1.8 Manifolds 15 1.9 Fibrations and coverings 22 1.10 General position and transversality 23 1.11 Handles 27 1.12 Algorithmic problems 30 1.13 Sources of additional information 31 Chapter 2. Surfaces 2.1 Examples of surfaces 33 2.2 Classification of surfaces 35 2.3 Homotopy equivalence of surfaces 41 2.4 Cutting gluing surgery 49 2.5 Applications of cutting gluing surgery 60 2.6 The Dehn lemma and the loop theorem 64 2.7 Algorithmic problems 69 Chapter 3. The homeotopy group of a surface 3.1 The homeotopy group 71 3.2 Twists 71 3.3 The homeotopy group of a disc modulo boundary 73 3.4 The braid group 73 3.5 The pure braid group 77 3.6 The homeotopy groups of a disc with holes 79 3.7 The homeotopy group of an arbitrary surface is generated by twists 81 3.8 Finite generation of the homeotopy group of an arbitrary surface by twists 86 3.9 The homeotopy group of a handlebody 93 3.10 Comments 107 viii Computer Topology and 3 Manifolds Chapter 4. The presentation of three dimensional manifolds by the identification of faces of polyhedra 4.1 Three dimensional manifolds with conic singularities 109 4.2 The criterion of the absence of singularities 112 4.3 Lens spaces 114 4.4 Manifolds of genus 1 120 Chapter 5. Heegaard splittings and Heegaard Diagrams 5.1 The Heegaard splitting 123 5.2 Stable equivalence of Heegaard splittings 125 5.3 Heegaard diagrams 129 5.4 Equivalent diagrams 130 5.5 Normalized diagrams 132 5.6 Wave transformation of the Heegaard diagram 135 5.7 The structure of Heegaard diagrams of genus 2 137 5.8 On the enumeration of three dimensional manifolds 142 Chapter 6. Algorithmic recognition of the sphere 6.1 On the formulation of the classification problem for three dimensional manifolds 145 6.2 The algorithm for recognition of a sphere S3 in the class of manifolds of genus 2 146 6.3 Comments to chapters 5.6 157 Chapter 7. Connected sums 7.1 The properties of connected summation 159 7.2 Irreducible and prime manifolds 160 7.3 The theory of normal surfaces 165 7.4 The existence of decomposition into prime summands 171 7.5 Uniqueness of decomposition into prime summands 174 Chapter 8. Knots and links 8.1 Basic Definitions 179 8.2 Distributive groupoids in the knot theory 182 8.3 The Conway approach 192 8.4 Special realizations of the invariant w 202 8.5 The linking coefficient 205 Chapter 9. Surgery Along Links 9.1 Integral surgery and three dimensional manifolds 207 9.2 Surgery along framed links and cobordism 209 Contents ix 9.3 The Kirby calculus 211 9.4 Even surgery 215 9.5 Presentations of homology spheres 221 9.6 On Heegaard diagrams of homology spheres 226 9.7 Sources and comments 228 Chapter 10. Seifert Manifolds 10.1 The definition of a Seifert manifold 229 10.2 The base of a Seifert manifold 232 10.3 Seifert manifolds without singular fibers 233 10.4 Seifert manifolds with singular fibers 237 10.5 The Euler number and the fiberwise classification of Seifert manifolds 238 10.6 The fundamental group of a Seifert manifold 241 10.7 Seifert manifolds with boundary 244 10.8 Incompressibility of the boundary 244 10.9 Irreducibility of Seifert manifolds with boundary 245 10.10 Fiberwise character of annuli with fiberwise boundaries 245 10.11 Fiberwise nature of essential annuli 247 10.12 Large Seifert manifolds 255 10.13 Fiberwise nature of incompressible tori 256 10.14 Topological classification of large closed Seifert manifolds 258 10.15 Small Seifert manifolds with finite fundamental groups 259 10.16 Small Seifert manifolds with infinite fundamental groups 267 Chapter 11. Class 3i 11.1 Definition and the simplest properties of class M 271 11.2 Rough and thin tori 274 11.3 Classification of class .# manifolds 276 11.4 Class 3i and iterated torus links 283 Chapter 12. The Haken Method 12.1 Normal surfaces as solutions of a system of equations 287 12.2 Fundamental sets of solutions 290 12.3 Geometric summation 291 12.4 The Haken algorithm 294 12. 5 An example of stability 295 12.6 An algorithm for the recognition of the trivial knot 297 Comments on the Figures 299 References 323 Index 327
any_adam_object	1
author	Fomenko, Anatolij Timofeevič 1945- Matveev, Sergej V. 1967-
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series	Mathematics and its applications
series2	Mathematics and its applications
spelling	Fomenko, Anatolij Timofeevič 1945- Verfasser (DE-588)119092689 aut Algorithmic and computer methods for three-manifolds by A. T. Fomenko and S. V. Matveev Dordrecht [u.a.] Kluwer 1997 XII, 334 S. Ill., graph. Darst. txt rdacontent n rdamedia nc rdacarrier Mathematics and its applications 425 Frühere Ausg. u.d.T.: Matveev, Sergej V.: Algorithmical and computer methods in three-dimensional topology Three-manifolds (Topology) Dimension 3 (DE-588)4321722-9 gnd rswk-swf Mannigfaltigkeit (DE-588)4037379-4 gnd rswk-swf Algorithmus (DE-588)4001183-5 gnd rswk-swf Mannigfaltigkeit (DE-588)4037379-4 s Dimension 3 (DE-588)4321722-9 s Algorithmus (DE-588)4001183-5 s DE-604 Matveev, Sergej V. 1967- Verfasser (DE-588)115664211 aut Mathematics and its applications 425 (DE-604)BV008163334 425 HBZ Datenaustausch application/pdf http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=007965708&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA Inhaltsverzeichnis
spellingShingle	Fomenko, Anatolij Timofeevič 1945- Matveev, Sergej V. 1967- Algorithmic and computer methods for three-manifolds Mathematics and its applications Three-manifolds (Topology) Dimension 3 (DE-588)4321722-9 gnd Mannigfaltigkeit (DE-588)4037379-4 gnd Algorithmus (DE-588)4001183-5 gnd
subject_GND	(DE-588)4321722-9 (DE-588)4037379-4 (DE-588)4001183-5
title	Algorithmic and computer methods for three-manifolds
title_auth	Algorithmic and computer methods for three-manifolds
title_exact_search	Algorithmic and computer methods for three-manifolds
title_full	Algorithmic and computer methods for three-manifolds by A. T. Fomenko and S. V. Matveev
title_fullStr	Algorithmic and computer methods for three-manifolds by A. T. Fomenko and S. V. Matveev
title_full_unstemmed	Algorithmic and computer methods for three-manifolds by A. T. Fomenko and S. V. Matveev
title_short	Algorithmic and computer methods for three-manifolds
title_sort	algorithmic and computer methods for three manifolds
topic	Three-manifolds (Topology) Dimension 3 (DE-588)4321722-9 gnd Mannigfaltigkeit (DE-588)4037379-4 gnd Algorithmus (DE-588)4001183-5 gnd
topic_facet	Three-manifolds (Topology) Dimension 3 Mannigfaltigkeit Algorithmus
url	http://bvbr.bib-bvb.de:8991/F?func=service&doc_library=BVB01&local_base=BVB01&doc_number=007965708&sequence=000002&line_number=0001&func_code=DB_RECORDS&service_type=MEDIA
volume_link	(DE-604)BV008163334
work_keys_str_mv	AT fomenkoanatolijtimofeevic algorithmicandcomputermethodsforthreemanifolds AT matveevsergejv algorithmicandcomputermethodsforthreemanifolds

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