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101 0 $aeng
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181   $ctxt
182   $cc
183   $acr
200 10$aFixed point theorems and their applications /$fIoannis Farmakis, Martin Moskowitz, City University of New York, USA
210  1$aNew Jersey :$cWorld Scientific,$d[2013]
210  4$d?2013
215   $a1 online resource (xi, 234 pages) $cillustrations
225 0 $aGale eBooks
300   $aDescription based upon print version of record.
311   $a981-4458-91-0 
311   $a1-299-95536-3 
320   $aIncludes bibliographical references and index.
327   $aContents; Preface and Acknowledgments; Introduction; 1 Early Fixed Point Theorems; 1.1 The Picard-Banach Theorem; 1.2 Vector Fields on Spheres; 1.3 Proof of the Brouwer Theorem and Corollaries; 1.3.1 A Counter Example; 1.3.2 Applications of the Brouwer Theorem; 1.3.3 The Perron-Frobenius Theorem; 1.3.4 Google;  A Billion Dollar Fixed Point Theorem; 1.4 Fixed Point Theorems for Groups of Affine Maps of Rn; 1.4.1 Affine Maps and Actions; 1.4.2 Affine Actions of Non Compact Groups; 2 Fixed Point Theorems in Analysis; 2.1 The Schauder-Tychonoff Theorem
327   $a2.1.1 Proof of the Schauder-Tychonoff Theorem2.2 Applications of the Schauder-Tychonoff Theorem; 2.3 The Theorems of Hahn, Kakutani and Markov-Kakutani; 2.4 Amenable Groups; 2.4.1 Amenable Groups; 2.4.2 Structure of Connected Amenable Lie Groups; 3 The Lefschetz Fixed Point Theorem; 3.1 The Lefschetz Theorem for Compact Polyhedra; 3.1.1 Projective Spaces; 3.2 The Lefschetz Theorem for a Compact Manifold; 3.2.1 Preliminaries from Differential Topology; 3.2.2 Transversality; 3.3 Proof of the Lefschetz Theorem; 3.4 Some Applications; 3.4.1 Maximal Tori in Compact Lie Groups
327   $a3.4.2 The Poincare-Hopf's Index Theorem3.5 The Atiyah-Bott Fixed Point Theorem; 3.5.1 The Case of the de Rham Complex; 4 Fixed Point Theorems in Geometry; 4.1 Some Generalities on Riemannian Manifolds; 4.2 Hadamard Manifolds and Cartan's Theorem; 4.3 Fixed Point Theorems for Compact Manifolds; 5 Fixed Points of Volume Preserving Maps; 5.1 The Poincare Recurrence Theorem; 5.2 Symplectic Geometry and its Fixed Point Theorems; 5.2.1 Introduction to Symplectic Geometry; 5.2.2 Fixed Points of Symplectomorphisms; 5.2.3 Arnold's Conjecture; 5.3 Poincare's Last Geometric Theorem
327   $a5.4 Automorphisms of Lie Algebras5.5 Hyperbolic Automorphisms of a Manifold; 5.5.1 The Case of a Torus; 5.5.2 Anosov Diffeomorphisms; 5.5.3 Nilmanifold Examples of Anosov Diffeomorphisms; 5.6 The Lefschetz Zeta Function; 6 Borel's Fixed Point Theorem in Algebraic Groups; 6.1 Complete Varieties and Borel's Theorem; 6.2 The Projective and Grassmann Spaces; 6.3 Projective Varieties; 6.4 Consequences of Borel's Fixed Point Theorem; 6.5 Two Conjugacy Theorems for Real Linear Lie Groups; 7 Miscellaneous Fixed Point Theorems; 7.1 Applications to Number Theory; 7.1.1 The Little Fermat Theorem
327   $a7.1.2 Fermat's Two Squares Theorem7.2 Fixed Points in Group Theory; 7.3 A Fixed Point Theorem in Complex Analysis; 8 A Fixed Point Theorem in Set Theory; Afterword; Bibliography; Index
330   $aThis is the only book that deals comprehensively with fixed point theorems overall of mathematics. Their importance is due, as the book demonstrates, to their wide applicability. Beyond the first chapter, each of the other seven can be read independently of the others so the reader has much flexibility to follow his/her own interests. The book is written for graduate students and professional mathematicians and could be of interest to physicists, economists and engineers.
606   $aFixed point theory
615  0$aFixed point theory.
676   $a515.7248
700   $aFarmakis$b Ioannis$0480054
702   $aMoskowitz$b Martin A.
801  0$bMiFhGG
801  1$bMiFhGG
906   $aBOOK
912   $a9910814096803321
996   $aFixed point theorems and their applications$94114669
997   $aUNINA