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Mathematical Aspects of Discontinuous Galerkin Methods de Daniele Antonio Di Pietro

Mathematical Aspects of Discontinuous Galerkin Methods: Mathématiques et Applications, cartea 69

Autor Daniele Antonio Di Pietro, Alexandre Ern
en Limba Engleză Paperback – 4 noi 2011
This book introduces the basic ideas to build discontinuous Galerkin methods and, at the same time, incorporates several recent mathematical developments. The presentation is to a large extent self-contained and is intended for graduate students and researchers in numerical analysis. The material covers a wide range of model problems, both steady and unsteady, elaborating from advection-reaction and diffusion problems up to the Navier-Stokes equations and Friedrichs' systems. Both finite element and finite volume viewpoints are exploited to convey the main ideas underlying the design of the approximation. The analysis is presented in a rigorous mathematical setting where discrete counterparts of the key properties of the continuous problem are identified. The framework encompasses fairly general meshes regarding element shapes and hanging nodes. Salient implementation issues are also addressed.
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Specificații

ISBN-13: 9783642229794
ISBN-10: 3642229794
Pagini: 404
Ilustrații: XVII, 384 p. 34 illus.
Dimensiuni: 155 x 235 x 25 mm
Greutate: 0.52 kg
Ediția:2012
Editura: Springer Berlin, Heidelberg
Colecția Springer
Seria Mathématiques et Applications

Locul publicării:Berlin, Heidelberg, Germany

Public țintă

Research

Cuprins

Basic concepts.- Steady advection-reaction.- Unsteady first-order PDEs.- PDEs with diffusion.- Additional topics on pure diffusion.- Incompressible flows.- Friedhrichs' Systems.- Implementation.

Recenzii

From the reviews:
“The goal of this book is to provide graduate students and researchers in numerical methods with the basic mathematical concepts to design and analyze discontinuous Galerkin (DG) methods for various model problems, starting at an introductory level and further elaborating on more advanced topics, considering that DG methods have tremendously developed in the last decade.” (Rémi Vaillancourt, Mathematical Reviews, January, 2013)
“The book is structured in three parts: scalar first order PDEs, scalar second order PDEs, and systems. … For researchers in numerical analysis it is nice to see that for all problem classes the authors start with a full analysis of existence, uniqueness, and properties of the solution of the continuous problem. … this new monograph is an extremely valuable source concerning the theoretical function of dG methods for the advanced reader.” (H.-G. Roos, SIAM Review, Vol. 55 (2), 2013)
“This new monograph is an extremely valuable collection of the mathematical treatment of discontinuous Galerkin methods with 300 references and providing profound insight into the required techniques. It collects and presents also several recent results for elliptic and non-elliptic, stationary and non-stationary partial differential equations in a unified framework. Thus it is strongly recommendable for researchers in the field.” (Christian Wieners, Zeitschrift für Angewandte Mathematik und Mechanik, Vol. 92 (7), 2012)
“The aim of the book is ‘to provide the reader with the basic mathematical concepts to design and analyze discontinuous Galerkin methods for various model problems, starting at an introductory level and further elaborating on more advanced topics’. … Some useful practical implementation aspects are considered in an Appendix. The bibliography contains more than 300 entries.” (Calin Ioan Gheorghiu, Zentralblatt MATH, Vol. 1231, 2012)

Textul de pe ultima copertă

This book introduces the basic ideas for building discontinuous Galerkin methods and, at the same time, incorporates several recent mathematical developments. It is to a large extent self-contained and is intended for graduate students and researchers in numerical analysis. The material covers a wide range of model problems, both steady and unsteady, elaborating from advection-reaction and diffusion problems up to the Navier-Stokes equations and Friedrichs' systems. Both finite-element and finite-volume viewpoints are utilized to convey the main ideas underlying the design of the approximation. The analysis is presented in a rigorous mathematical setting where discrete counterparts of the key properties of the continuous problem are identified. The framework encompasses fairly general meshes regarding element shapes and hanging nodes. Salient implementation issues are also addressed.

Caracteristici

Understanding the mathematical foundations helps the reader design methods for new applications Bridging the gap between finite volumes, finite elements, and discontinuous Galerkin methods provides new insight on numerical methods The mathematical setting for the continuous model is a key to successful approximation methods Includes supplementary material: sn.pub/extras