Numerical solution of partial differential equations : finite difference methods
Author(s)
Bibliographic Information
Numerical solution of partial differential equations : finite difference methods
(Oxford applied mathematics and computing science series)
Clarendon Press , Oxford University Press, 1985
3rd ed
- : pbk
Available at / 69 libraries
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Research Institute for Economics & Business Administration (RIEB) Library , Kobe University図書
: pbk517-282s081000083567*
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University Library for Agricultural and Life Sciences, The University of Tokyo講座
pbk.413.6:Sm5:3d-ed5018864206
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Hokkaido University, Faculty and Graduate School of Engineering図書
: pbkdc19:515.353/sm573570310510
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Note
Bibliography: p. [331]-333
Includes index
Description and Table of Contents
- Volume
-
ISBN 9780198596417
Description
Sustantially revised, this authoritative study covers the standard finite difference methods of parabolic, hyperbolic, and elliptic equations, and includes the concomitant theoretical work on consistency, stability, and convergence. The new edition includes revised and greatly expanded sections on stability based on the Lax-Richtmeyer definition, the application of Pade approximants to systems of ordinary differential equations for parabolic and hyperbolic equations, and a considerably improved presentation of iterative methods. A fast-paced introduction to numerical methods, this will be a useful volume for students of mathematics and engineering, and for postgraduates and professionals who need a clear, concise grounding in this discipline.
- Volume
-
: pbk ISBN 9780198596509
Description
Substantially revised, this authoritative study covers the standard finite difference methods of parabolic, hyperbolic, and elliptic equations, and includes the concomitant theoretical work on consistency, stability, and convergence. The new edition includes revised and greatly expanded sections on stability based on the Lax-Richtmeyer definition, the application of Pade approximants to systems of ordinary differential equations for parabolic and hyperbolic
equations, and a considerably improved presentation of iterative methods. A fast-paced introduction to numerical methods, this will be a useful volume for students of mathematics and engineering, and for postgraduates and professionals who need a clear, concise grounding in this discipline.
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