4 edition of **Differential geometry and complex analysis** found in the catalog.

Differential geometry and complex analysis

- 291 Want to read
- 40 Currently reading

Published
**1985**
by Springer-Verlag in Berlin, New York
.

Written in English

- Rauch, Harry Ernest, 1925- -- Bibliography,
- Geometry, Differential,
- Functions of complex variables

**Edition Notes**

Statement | edited by I. Chavel and H.M. Farkas. |

Contributions | Rauch, Harry Ernest, 1925-, Chavel, Isaac., Farkas, Hershel M. |

Classifications | |
---|---|

LC Classifications | QA641 .D414 1985 |

The Physical Object | |

Pagination | xii, 222 p., [1] leaf of plates : |

Number of Pages | 222 |

ID Numbers | |

Open Library | OL2851796M |

ISBN 10 | 038713543X |

LC Control Number | 84014138 |

Complex Diﬀerential Calculus and Pseudoconvexity This introductive chapter is mainly a review of the basic tools and concepts which will be employed in the rest of the book: diﬀerential forms, currents, holomorphic and plurisubharmonic functions, holo-morphic convexity and Size: 3MB. This first course in differential geometry presents the fundamentals of the metric differential geometry of curves and surfaces in a Euclidean space of 3 dimensions, using vector notation and technique. It also introduces Riemannian geometry. Written by a noted mathematician, the text presupposes a knowledge of calculus. Nearly problems. edition.

Differential geometry and complex analysis* 43 By PHILLIP A. GRIFFITHS On the curvature of rational surfaces 65 By NIGEL HITCHIN Holomorphic extension for nongeneric CK-submanifolds 81 By L. R. HUNT AND R. O. WELLS, JR. Holomorphic extension theorems 89 By PETER KIERNAN Residues and Chern classes 91 By JAMES R. KING. The theory of complex manifolds overlaps with several branches of mathematics, including differential geometry, algebraic geometry, several complex variables, global analysis, topology, algebraic number theory, and mathematical physics. Complex manifolds provide a rich class of geometric objects, for example the (common) zero locus of any generic set of complex polynomials is always a complex.

The theory of complex manifolds overlaps with several branches of mathematics, including differential geometry, algebraic geometry, several complex variables, global analysis, topology, algebraic number theory, and mathematical physics. Complex manifolds provide a rich class of geometric objects, for example the (common) zero locus of any generic set of complex polynomials is always a complex Cited by: The fundamental concept underlying the geometry of curves is the arclength of a parametrized curve. Deﬁnition. If ˛WŒa;b!R3 is a parametrized curve, then for any a t b, we deﬁne its arclength from ato tto be s.t/ D Zt a k˛0.u/kdu. That is, the distance a particle travels—the arclength of its trajectory—is the integral of its speed.

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Differential Geometry and Complex Analysis: A Volume Dedicated to the Memory of Harry Ernest Rauch Softcover reprint of the original 1st ed. Edition by Isaac Chavel (Author)Format: Paperback. The climax of the book is an introduction to several complex variables from the geometric viewpoint.

Poincaré's theorem, that the ball and bidisc are biholomorphically inequivalent, is discussed and by: This volume is dedicated to the memory of Harry Ernest Rauch, who died suddenly on J In organizing the volume we solicited: (i) articles summarizing Rauch's own work in differential geometry, complex analysis and theta functions (ii) articles which would give the reader an idea of the depth and breadth of Rauch's researches, interests, and influence, in the fields he investigated.

Graduate students and research mathematicians interested in complex analysis and differential geometry. Reviews & Endorsements One nice feature of the book is the “Suggested research” sections in which the author discusses open problems related to the material of the chapter.

Complex Analysis and Differential Geometry Objectives: To emphasize the role of the theory of functions of a complex variable, their geometric properties and indicating some applications.

Introduction covers complex numbers; complex functions; sequences and continuity; and differentiation of complex functions. The book has proven to be an excellent introduction to the theory of complex manifolds considered from both the points of view of complex analysis and differential geometry.” (Philosophy, Religion and Science Book Reviews,May, ).

Trends in complex analysis, differential geometry, and mathematical physics: proceedings of the 6th International Workshop on Complex Structures and Vector Fields: St. Konstantin, Bulgaria, September Bulgaria) International Workshop on Complex Structures, Vector Fields (6th Varna, Dimiev S., Sekigawa K.

Natural Operations in Differential Geometry. This book is a monographical work on natural bundles and natural operators in differential geometry and this book tries to be a rather comprehensive textbook on all basic structures from the theory of jets which appear in different branches of differential geometry.

diﬀerential geometry, topology and global analysis is even more pronounced in the newer quantum theories such as gauge ﬁeld theory and string theory. The amount of mathematical sophistication required for a good understanding of modern physics is astounding.

On the other hand, the philosophy of this book. Differential geometry and complex analysis Differential geometry (Proceedings of Symposia in Pure Mathematics, Stanford Univ., Stanford, Calif., ). Books shelved as differential-geometry: Differential Geometry of Curves and Surfaces by Manfredo P.

Functional Analysis: An Introduction to Metric Spaces, Hilbert Spaces, and Banach Algebras (Paperback) by. Joseph Muscat (shelved 1 time as differential-geometry) Tensors, Differential Forms, and Variational Principles (Paperback) by. This volume constitutes the proceedings of a workshop whose main purpose was to exchange information on current topics in complex analysis, differential geometry, mathematical physics and applications, and to group aspects of new mathematics.

Contents: Partially Ordered Topological Linear Spaces (S Koshi). Advances in Discrete Differential Geometry by Alexander I. Bobenko (ed.) - Springer, This is the book on a newly emerging field of discrete differential geometry. It surveys the fascinating connections between discrete models in differential geometry and complex analysis, integrable systems and applications in computer graphics.

The Third International Workshop on Complex Structures and Vector Fields was held to exchange information on current topics in complex analysis, differential geometry and mathematical physics, and to find new subjects in these fields. Di erential Geometry Diszkr et optimaliz alas Diszkr et matematikai feladatok Geometria Igazs agos elosztasok Interakt v anal zis feladatgyu}jtem eny matematika BSc hallgatok sz am ara Introductory Course in Analysis Matematikai p enzugy Mathematical Analysis-Exercises M ert ekelm elet es dinamikus programoz as Numerikus funkcionalanal zis.

An Introduction to Differential Geometry through Computation. This note explains the following topics: Linear Transformations, Tangent Vectors, The push-forward and the Jacobian, Differential One-forms and Metric Tensors, The Pullback and Isometries, Hypersurfaces, Flows, Invariants and the Straightening Lemma, The Lie Bracket and Killing Vectors, Hypersurfaces, Group actions and Multi.

Chapter 1 Introduction Some history In the words of S.S. Chern, ”the fundamental objects of study in differential geome-try are manifolds.” 1 Roughly, an n-dimensional manifold is a mathematical object that “locally” looks like theory of manifolds has a long and complicatedFile Size: 2MB.

Here are my favorite ones: Calculus on Manifolds, Michael Spivak, - Mathematical Methods of Classical Mechanics, V.I. Arnold, - Gauge Fields, Knots, and Gravity, John C.

Baez. I can honestly say I didn't really understand Calculus until I read. at the papers in this volume, modern differential geometry to a large degree has become differential topology, and the methods employed are a far cry from the tensor analysis of the differential geometry of the lOSO's.

This development, however, has not been as abrupt as might be imagined from a. e-books in Complex Differential Geometry category Kähler-Einstein metrics: Old and New by Daniele Angella, Cristiano Spotti -We present classical and recent results on Kaehler-Einstein metrics on compact complex manifolds, focusing on existence, obstructions and relations to algebraic geometric notions of stability (K-stability).

Differential geometry and complex analysis: a volume dedicated to the memory of Harry Ernest Rauch | I. Chavel, H.M. Farkas | download | B–OK. Download books for free. Find books.The books cover a wide range of topics including Algebra, Calculus, Differential Equations, Engineering, Modeling, Programming, Number Theory, Cryptography, Chemistry and more.

Complex Analysis - Maplesoft Books - Maple Books, Maple Resources and Math Books.This richly illustrated book will convince readers that this new branch of mathematics is both beautiful and useful.

It will appeal to graduate students and researchers in differential geometry, complex analysis, mathematical physics, numerical methods, discrete geometry, as well as computer graphics and geometry processing.