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E-raamat: Geometry, Dynamics And Topology Of Foliations: A First Course

(Federal Univ Of Rio De Janeiro, Brazil), (Federal Univ Of Rio De Janeiro, Brazil)
  • Formaat: 196 pages
  • Ilmumisaeg: 16-Feb-2017
  • Kirjastus: World Scientific Publishing Co Pte Ltd
  • Keel: eng
  • ISBN-13: 9789813207097
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Geometry, Dynamics And Topology Of Foliations: A First CourseSuurem pilt
  • Formaat: 196 pages
  • Ilmumisaeg: 16-Feb-2017
  • Kirjastus: World Scientific Publishing Co Pte Ltd
  • Keel: eng
  • ISBN-13: 9789813207097
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The Geometric Theory of Foliations is one of the fields in Mathematics that gathers several distinct domains: Topology, Dynamical Systems, Differential Topology and Geometry, among others. Its great development has allowed a better comprehension of several phenomena of mathematical and physical nature. Our book contains material dating from the origins of the theory of foliations, from the original works of C Ehresmann and G Reeb, up till modern developments.In a suitable choice of topics we are able to cover material in a coherent way bringing the reader to the heart of recent results in the field. A number of theorems, nowadays considered to be classical, like the Reeb Stability Theorem, Haefliger's Theorem, and Novikov Compact leaf Theorem, are proved in the text. The stability theorem of Thurston and the compact leaf theorem of Plante are also thoroughly proved. Nevertheless, these notes are introductory and cover only a minor part of the basic aspects of the rich theory of foliations.
Preface vii
1 Preliminaries
1(38)
1.1 Definition of foliation
1(3)
1.2 Examples of foliations
4(29)
1.2.1 Foliations derived from submersions
4(5)
1.2.2 Reeb foliations
9(4)
1.2.3 Lie group actions
13(4)
1.2.4 Rn actions
17(1)
1.2.5 Turbulization
18(2)
1.2.6 Suspensions
20(3)
1.2.7 Foliations transverse to the fibers of a fiber bundle
23(4)
1.2.8 Transversely homogeneous foliations
27(3)
1.2.9 Fibrations and the theorem of Ehresmann
30(3)
1.3 Holomorphic Foliations
33(6)
1.3.1 Holomorphic Foliations with Singularities
33(6)
2 Plane fields and foliations
39(14)
2.1 Definition, examples and integrability
39(3)
2.1.1 Frobenius Theorem
39(3)
2.2 Orientability
42(4)
2.3 Orientability of singular foliations
46(1)
2.4 Orientable double cover
47(3)
2.5 Foliations and differentiable forms
50(3)
3 Topology of the leaves
53(6)
3.1 Space of leaves
53(2)
3.2 Minimal sets
55(4)
4 Holonomy and stability
59(18)
4.1 Definition and examples
59(7)
4.2 Stability
66(3)
4.3 Reeb stability theorems
69(5)
4.4 Thurston stability theorem
74(3)
5 Haefliger's theorem
77(10)
5.1 Statement
77(1)
5.2 Morse theory and foliations
78(4)
5.3 Vector fields on the two-disc
82(3)
5.4 Proof of Haefliger's theorem
85(2)
6 Novikov's compact leaf
87(16)
6.1 Statement
87(1)
6.2 Proof of Auxiliary theorem I
88(2)
6.3 Proof of Auxiliary theorem II
90(10)
6.4 Some corollaries of the Novikov's compact leaf theorem
100(3)
7 Rank of 3-manifolds
103(4)
8 Tischler's theorem
107(14)
8.1 Preliminaries
107(1)
8.2 Proof of Tischler's theorem and generalizations
108(13)
9 Plante's compact leaf theorem
121(14)
9.1 Growth of foliations and existence of compact leaves
121(4)
9.1.1 Growth of Riemannian manifolds
121(1)
9.1.2 Growth of leaves
122(1)
9.1.3 Growth of orbits
122(1)
9.1.4 Combinatorial growth of leaves
123(1)
9.1.5 Growth of groups
124(1)
9.2 Holonomy invariant measures
125(4)
9.3 Plante's theorem
129(6)
10 Currents, distributions, foliation cycles and transverse measures
135(18)
10.1 Introduction
135(1)
10.2 Currents
136(3)
10.2.1 Examples
136(3)
10.3 Invariant measures
139(7)
10.3.1 Examples
142(4)
10.4 Currents and transverse measures
146(5)
10.4.1 Examples
148(3)
10.5 Cone structures in manifolds
151(2)
11 Foliation cycles: A homological proof of Novikov's compact leaf theorem
153(8)
11.0.1 Examples
154(2)
11.0.2 Homological proof of Novikov's compact leaf theorem
156(5)
Appendix A Structure of codimension one foliations: Dippolito's theory
161(12)
A.1 Semi-proper leaves, Dippolito's semi-stability
161(2)
A.2 Completion of an invariant open set
163(5)
A.2.1 Completion of an invariant open set - revisited
165(3)
A.3 Proof of Dippolito's semi-stability theorem
168(1)
A.4 Guided exercises: Cantwell-Conlon's theory
168(5)
Bibliography 173(4)
Index 177
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