Transformation Groups in Differential Geometry

Transformation Groups in Differential Geometry
Title Transformation Groups in Differential Geometry PDF eBook
Author Shoshichi Kobayashi
Publisher Springer Science & Business Media
Pages 192
Release 2012-12-06
Genre Mathematics
ISBN 3642619819

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Given a mathematical structure, one of the basic associated mathematical objects is its automorphism group. The object of this book is to give a biased account of automorphism groups of differential geometric struc tures. All geometric structures are not created equal; some are creations of ~ods while others are products of lesser human minds. Amongst the former, Riemannian and complex structures stand out for their beauty and wealth. A major portion of this book is therefore devoted to these two structures. Chapter I describes a general theory of automorphisms of geometric structures with emphasis on the question of when the automorphism group can be given a Lie group structure. Basic theorems in this regard are presented in §§ 3, 4 and 5. The concept of G-structure or that of pseudo-group structure enables us to treat most of the interesting geo metric structures in a unified manner. In § 8, we sketch the relationship between the two concepts. Chapter I is so arranged that the reader who is primarily interested in Riemannian, complex, conformal and projective structures can skip §§ 5, 6, 7 and 8. This chapter is partly based on lec tures I gave in Tokyo and Berkeley in 1965.

Transformation Groups in Differential Geometry

Transformation Groups in Differential Geometry
Title Transformation Groups in Differential Geometry PDF eBook
Author Shoshichi Kobayashi
Publisher Springer
Pages 200
Release 1972
Genre Mathematics
ISBN

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Theory of Transformation Groups I

Theory of Transformation Groups I
Title Theory of Transformation Groups I PDF eBook
Author Sophus Lie
Publisher Springer
Pages 640
Release 2015-03-12
Genre Mathematics
ISBN 3662462117

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This modern translation of Sophus Lie's and Friedrich Engel's “Theorie der Transformationsgruppen I” will allow readers to discover the striking conceptual clarity and remarkably systematic organizational thought of the original German text. Volume I presents a comprehensive introduction to the theory and is mainly directed towards the generalization of ideas drawn from the study of examples. The major part of the present volume offers an extremely clear translation of the lucid original. The first four chapters provide not only a translation, but also a contemporary approach, which will help present day readers to familiarize themselves with the concepts at the heart of the subject. The editor's main objective was to encourage a renewed interest in the detailed classification of Lie algebras in dimensions 1, 2 and 3, and to offer access to Sophus Lie's monumental Galois theory of continuous transformation groups, established at the end of the 19th Century. Lie groups are widespread in mathematics, playing a role in representation theory, algebraic geometry, Galois theory, the theory of partial differential equations and also in physics, for example in general relativity. This volume is of interest to researchers in Lie theory and exterior differential systems and also to historians of mathematics. The prerequisites are a basic knowledge of differential calculus, ordinary differential equations and differential geometry.

Differential Geometry

Differential Geometry
Title Differential Geometry PDF eBook
Author Heinrich W. Guggenheimer
Publisher Courier Corporation
Pages 404
Release 2012-04-27
Genre Mathematics
ISBN 0486157202

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This text contains an elementary introduction to continuous groups and differential invariants; an extensive treatment of groups of motions in euclidean, affine, and riemannian geometry; more. Includes exercises and 62 figures.

Transformation Groups for Beginners

Transformation Groups for Beginners
Title Transformation Groups for Beginners PDF eBook
Author Sergeĭ Vasilʹevich Duzhin
Publisher American Mathematical Soc.
Pages 258
Release 2004
Genre Mathematics
ISBN 0821836439

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Presents a discussion of algebraic operations on the points in the plane and rigid motions in the Euclidean plane. This work introduces the notions of a transformation group and of an abstract group. It gives an elementary exposition of the basic ideas of Sophus Lie about symmetries of differential equations.

Topology of Transitive Transformation Groups

Topology of Transitive Transformation Groups
Title Topology of Transitive Transformation Groups PDF eBook
Author A. L. Onishchik
Publisher
Pages 324
Release 1994
Genre Mathematics
ISBN

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Modern Geometry— Methods and Applications

Modern Geometry— Methods and Applications
Title Modern Geometry— Methods and Applications PDF eBook
Author B.A. Dubrovin
Publisher Springer Science & Business Media
Pages 452
Release 1985-08-05
Genre Mathematics
ISBN 0387961623

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Up until recently, Riemannian geometry and basic topology were not included, even by departments or faculties of mathematics, as compulsory subjects in a university-level mathematical education. The standard courses in the classical differential geometry of curves and surfaces which were given instead (and still are given in some places) have come gradually to be viewed as anachronisms. However, there has been hitherto no unanimous agreement as to exactly how such courses should be brought up to date, that is to say, which parts of modern geometry should be regarded as absolutely essential to a modern mathematical education, and what might be the appropriate level of abstractness of their exposition. The task of designing a modernized course in geometry was begun in 1971 in the mechanics division of the Faculty of Mechanics and Mathematics of Moscow State University. The subject-matter and level of abstractness of its exposition were dictated by the view that, in addition to the geometry of curves and surfaces, the following topics are certainly useful in the various areas of application of mathematics (especially in elasticity and relativity, to name but two), and are therefore essential: the theory of tensors (including covariant differentiation of them); Riemannian curvature; geodesics and the calculus of variations (including the conservation laws and Hamiltonian formalism); the particular case of skew-symmetric tensors (i. e.