Title Lie sphere geometry : with applications to submanifolds / Thomas E. Cecil

Edition 2nd ed Published New York : Springer, ©2008

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Description 1 online resource (xii, 208 pages) : illustrations Series Universitext Universitext. Contents 2 Lie Sphere Geometry 9 -- 2.2 Mobius Geometry of Unoriented Spheres 11 -- 2.3 Lie Geometry of Oriented Spheres 14 -- 2.4 Geometry of Hyperspheres in S" and H" 16 -- 2.5 Oriented Contact and Parabolic Pencils of Spheres 19 -- 3 Lie Sphere Transformations 25 -- 3.1 The Fundamental Theorem 25 -- 3.2 Generation of the Lie Sphere Group by Inversions 30 -- 3.3 Geometric Description of Inversions 34 -- 3.4 Laguerre Geometry 37 -- 3.5 Subgeometries of Lie Sphere Geometry 46 -- 4 Legendre Submanifolds 51 -- 4.1 Contact Structure on [Lambda superscript 2n-1] 51 -- 4.2 Definition of Legendre Submanifolds 56 -- 4.3 The Legendre Map 60 -- 4.4 Curvature Spheres and Parallel Submanifolds 64 -- 4.5 Lie Curvatures and Isoparametric Hypersurfaces 72 -- 4.6 Lie Invariance of Tautness 82 -- 4.7 Isoparametric Hypersurfaces of FKM-type 95 -- 4.8 Compact Proper Dupin Submanifolds 112 -- 5 Dupin Submanifolds 125 -- 5.1 Local Constructions 125 -- 5.2 Reducible Dupin Submanifolds 127 -- 5.3 Lie Sphere Geometric Criterion for Reducibility 141 -- 5.4 Cyclides of Dupin 148 -- 5.5 Lie Frames 159 -- 5.6 Covariant Differentiation 165 -- 5.7 Dupin Hypersurfaces in 4-Space 168 Summary "This book provides a clear and comprehensive modern treatment of Lie sphere geometry and its applications to the study of Euclidean submanifolds. It begins with the construction of the space of spheres, including the fundamental notions of oriented contact, parabolic pencils of spheres, and Lie sphere transformations. The link with Euclidean submanifold theory is established via the Legendre map, which provides a powerful framework for the study of submanifolds, especially those characterized by restrictions on their curvature spheres."--Jacket Bibliography Includes bibliographical references (pages 191-199) and index Notes Print version record Subject Geometry, Differential. Submanifolds. Submanifolds. Geometry, Differential. Geometry, Differential. Submanifolds. Form Electronic book ISBN 9780387746562 0387746560 9780387746555 0387746552

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