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Elliptic and parabolic methods in geometry

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Published by A K Peters in Wellesley, Mass .
Written in English

Subjects:

  • Curves on surfaces -- Congresses.,
  • Hypersurfaces -- Congresses.,
  • Geometry -- Data processing -- Congresses.

Book details:

Edition Notes

Statementeditors, Ben Chow ... [et al.].
ContributionsChow, Bennett.
Classifications
LC ClassificationsQA643 .E45 1996
The Physical Object
Paginationvii, 203 p. :
Number of Pages203
ID Numbers
Open LibraryOL982514M
ISBN 101568810644
LC Control Number96020163

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1st Edition Published on Octo by A K Peters/CRC Press This book documents the results of a workshop held at the Geometry Center (University of Minne Elliptic and Parabolic Methods in Geometry - 1st Edition - Ben Chow -. Get this from a library! Elliptic and parabolic methods in geometry. [Bennett Chow;] -- This book documents the results of a workshop held at the Geometry Center (University of Minnesota, Minneapolis) and captures the excitement of the week. Elliptic and parabolic methods in geometry. [Bennett Chow;] Home. WorldCat Home About WorldCat Help. Search. Search for Library Items Search for Lists Search for Book, Internet Resource: All Authors / Contributors: Bennett Chow. Find more information . Semilinear Boundary Value Problems for Elliptic and Parabolic Equations Discretization Methods for Convection-Dominated Problems Standard Methods and Convection-Dominated Problems The Streamline-Diffusion Method Finite Volume Methods The Lagrange–Galerkin Method; A. Appendices A.1 Notation A.2 Basic Concepts of Analysis.

The Finite Element Method for Linear Elliptic Boundary Value Problems of Second Order. Pages Discretization Methods for Parabolic Initial Boundary Value Problems. Pages Iterative Methods for Nonlinear Equations. Pages the purpose of this textbook series is to meet the current and future needs of these advances. Numerical Methods for Elliptic and Parabolic Partial Differential Equations. Authors: Knabner, Peter, Angerman, Lutz Free Preview. Buy this book eB40 Thus, the purpose of this textbook series is to meet the current and future needs of these advances and to encourage the teaching of new courses. TAM will publish textbooks suitable for. Discontinuous Galerkin Methods for Solving Elliptic and Parabolic Equations: Theory and Implementation is divided into three parts: Part I focuses on the application of DG methods to second order elliptic problems in one dimension and in higher dimensions. In mathematics, non-Euclidean geometry consists of two geometries based on axioms closely related to those specifying Euclidean Euclidean geometry lies at the intersection of metric geometry and affine geometry, non-Euclidean geometry arises when either the metric requirement is relaxed, or the parallel postulate is replaced with an alternative one.

Abstract. Over the last decades the finite element method, which was introduced by engineers in the s, has become the perhaps most important numerical method for partial differential equations, particularly for equations of elliptic and parabolic method is based on the variational form of the boundary value problem and approximates the exact solution by a piecewise polynomial. This book is a unique exposition of rich and inspiring geometries associated with Möbius transformations of the hypercomplex plane. The presentation is self-contained and based on the structural properties of the group SL2(R). Starting from elementary facts in group theory, the author unveils surprising new results about the geometry of circles, parabolas and hyperbolas, using an approach. Numerical methods for elliptic and parabolic partial differential equations / Peter Knabner, Lutz Angermann. p. cm. (Texts in applied mathematics ; 44) Include bibliographical references and index. ISBN X (alk. paper) 1. Differential equations, Partial Numerical solutions. I. Angermann, Lutz. II. Title. III. Series. QAK Qualitative behavior. Elliptic equations have no real characteristic curves, curves along which it is not possible to eliminate at least one second derivative of from the conditions of the Cauchy problem. Since characteristic curves are the only curves along which solutions to partial differential equations with smooth parameters can have discontinuous derivatives, solutions to elliptic.