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Product Identifiers
PublisherSpringer New York
ISBN-100387983465
ISBN-139780387983462
eBay Product ID (ePID)769546
Product Key Features
Number of PagesXxii, 556 Pages
LanguageEnglish
Publication NameNumerical Partial Differential Equations : Conservation Laws and Elliptic Equations
SubjectNumerical Analysis, Differential Equations / Partial, Physics / General, Mathematical Analysis
Publication Year1999
TypeTextbook
AuthorJ. W. Thomas
Subject AreaMathematics, Science
SeriesTexts in Applied Mathematics Ser.
FormatHardcover
Dimensions
Item Height0.5 in
Item Weight76.9 Oz
Item Length9.3 in
Item Width6.1 in
Additional Product Features
Intended AudienceScholarly & Professional
LCCN95-017143
Dewey Edition23
Series Volume Number33
Number of Volumes1 vol.
IllustratedYes
Dewey Decimal515.353
Table Of ContentSeries Preface.- Preface.- Contents of Part I (published in separate volume): Finite Difference Methods.- Stability of Initial-Boundary-Value Schemes.- Conservation Laws.- Elliptic Equations.- Irregular Regions and Grids.- References.- Index.
SynopsisContinuing the theme of the first, this second volume continues the study of the uses and techniques of numerical experimentation in the solution of PDEs. It includes topics such as initial-boundary-value problems, a complete survey of theory and numerical methods for conservation laws, and numerical schemes for elliptic PDEs. The author stresses the use of technology and graphics throughout for both illustration and analysis., Of the many different approaches to solving partial differential equations numerically, this book studies difference methods. Written for the beginning graduate student in applied mathematics and engineering, this text offers a means of coming out of a course with a large number of methods that provide both theoretical knowledge and numerical experience. The reader will learn that numerical experimentation is a part of the subject of numerical solution of partial differential equations, and will be shown some uses and taught some techniques of numerical experimentation. Prerequisites suggested for using this book in a course might include at least one semester of partial differential equations and some programming capability. The author stresses the use of technology throughout the text, allowing the student to utilize it as much as possible. The use of graphics for both illustration and analysis is emphasized, and algebraic manipulators are used when convenient. This is the second volume of a two-part book., Of the many different approaches to solving partial differential equations numerically, this book studies difference methods. Written for the beginning graduate student in applied mathematics and engineering, this text offers a means of coming out of a course with a large number of methods that provide both theoretical knowledge and numerical experience. This is the second volume of a two-part book. The first part is entitled, Numerical Partial Differential Equations: Finite Difference Methods (TAM 22).
LC Classification NumberQA299.6-433
