Ebook: Lie Sphere Geometry: With Applications to Submanifolds
Author: Thomas E. Cecil (auth.)
- Tags: Differential Geometry, Algebraic Geometry
- Series: Universitext
- Year: 1992
- Publisher: Springer New York
- Language: English
- pdf
Lie Sphere Geometry provides a modern treatment of Lie's geometry of spheres, its recent applications and the study of Euclidean space. This book begins with Lie's construction of the space of spheres, including the fundamental notions of oriented contact, parabolic pencils of spheres and Lie sphere transformation. The link with Euclidean submanifold theory is established via the Legendre map. This provides a powerful framework for the study of submanifolds, especially those characterized by restrictions on their curvature spheres. Of particular interest are isoparametric, Dupin and taut submanifolds. These have recently been classified up to Lie sphere transformation in certain special cases through the introduction of natural Lie invariants. The author provides complete proofs of these classifications and indicates directions for further research and wider application of these methods.
Lie Sphere Geometry provides a modern treatment of Lie's geometry of spheres, its recent applications and the study of Euclidean space. This book begins with Lie's construction of the space of spheres, including the fundamental notions of oriented contact, parabolic pencils of spheres and Lie sphere transformation. The link with Euclidean submanifold theory is established via the Legendre map. This provides a powerful framework for the study of submanifolds, especially those characterized by restrictions on their curvature spheres. Of particular interest are isoparametric, Dupin and taut submanifolds. These have recently been classified up to Lie sphere transformation in certain special cases through the introduction of natural Lie invariants. The author provides complete proofs of these classifications and indicates directions for further research and wider application of these methods.
Content:
Front Matter....Pages i-xii
Introduction....Pages 1-7
Lie Sphere Geometry....Pages 8-28
Lie Sphere Transformations....Pages 29-64
Legendre Submanifolds....Pages 65-128
Dupin Submanifolds....Pages 129-190
Back Matter....Pages 191-209
Lie Sphere Geometry provides a modern treatment of Lie's geometry of spheres, its recent applications and the study of Euclidean space. This book begins with Lie's construction of the space of spheres, including the fundamental notions of oriented contact, parabolic pencils of spheres and Lie sphere transformation. The link with Euclidean submanifold theory is established via the Legendre map. This provides a powerful framework for the study of submanifolds, especially those characterized by restrictions on their curvature spheres. Of particular interest are isoparametric, Dupin and taut submanifolds. These have recently been classified up to Lie sphere transformation in certain special cases through the introduction of natural Lie invariants. The author provides complete proofs of these classifications and indicates directions for further research and wider application of these methods.
Content:
Front Matter....Pages i-xii
Introduction....Pages 1-7
Lie Sphere Geometry....Pages 8-28
Lie Sphere Transformations....Pages 29-64
Legendre Submanifolds....Pages 65-128
Dupin Submanifolds....Pages 129-190
Back Matter....Pages 191-209
....
Lie Sphere Geometry provides a modern treatment of Lie's geometry of spheres, its recent applications and the study of Euclidean space. This book begins with Lie's construction of the space of spheres, including the fundamental notions of oriented contact, parabolic pencils of spheres and Lie sphere transformation. The link with Euclidean submanifold theory is established via the Legendre map. This provides a powerful framework for the study of submanifolds, especially those characterized by restrictions on their curvature spheres. Of particular interest are isoparametric, Dupin and taut submanifolds. These have recently been classified up to Lie sphere transformation in certain special cases through the introduction of natural Lie invariants. The author provides complete proofs of these classifications and indicates directions for further research and wider application of these methods.
Content:
Front Matter....Pages i-xii
Introduction....Pages 1-7
Lie Sphere Geometry....Pages 8-28
Lie Sphere Transformations....Pages 29-64
Legendre Submanifolds....Pages 65-128
Dupin Submanifolds....Pages 129-190
Back Matter....Pages 191-209
Lie Sphere Geometry provides a modern treatment of Lie's geometry of spheres, its recent applications and the study of Euclidean space. This book begins with Lie's construction of the space of spheres, including the fundamental notions of oriented contact, parabolic pencils of spheres and Lie sphere transformation. The link with Euclidean submanifold theory is established via the Legendre map. This provides a powerful framework for the study of submanifolds, especially those characterized by restrictions on their curvature spheres. Of particular interest are isoparametric, Dupin and taut submanifolds. These have recently been classified up to Lie sphere transformation in certain special cases through the introduction of natural Lie invariants. The author provides complete proofs of these classifications and indicates directions for further research and wider application of these methods.
Content:
Front Matter....Pages i-xii
Introduction....Pages 1-7
Lie Sphere Geometry....Pages 8-28
Lie Sphere Transformations....Pages 29-64
Legendre Submanifolds....Pages 65-128
Dupin Submanifolds....Pages 129-190
Back Matter....Pages 191-209
....
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