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Handbook of Differential Equations by Daniel Zwillinger (2022, Hardcover)
Cycle Books (2062)
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About this product
Product Identifiers
PublisherElsevier Science & Technology
ISBN-100127843965
ISBN-139780127843964
eBay Product ID (ePID)48955
Product Key Features
Number of Pages801 Pages
Publication NameHandbook of Differential Equations
LanguageEnglish
SubjectDifferential Equations / General, General, Applied
Publication Year2022
FeaturesRevised
TypeTextbook
AuthorDaniel Zwillinger
Subject AreaMathematics
FormatHardcover
Dimensions
Item Height0.7 in
Item Weight44.9 Oz
Item Length9 in
Item Width6 in
Additional Product Features
Edition Number3
Intended AudienceCollege Audience
LCCN97-038072
Dewey Edition23
IllustratedYes
Dewey Decimal515/.35
Edition DescriptionRevised edition
Table Of Content1. Definitions and Concepts 2. Transformations 3. Exact Analytical Methods 4. Exact Methods for ODEs 5. Exact Methods for PDEs 6. Approximate Analytical Methods 7. Numerical Methods: Concepts 8. Numerical Methods for ODEs 9. Numerical Methods for PDEs
SynopsisThis book compiles the most widely applicable methods for solving and approximating differential equations. as well as numerous examples showing the methods use. Topics include ordinary differential equations, symplectic integration of differential equations, and the use of wavelets when numerically solving differential equations., Handbook of Differential Equations, Third Edition compiles the most widely applicable methods for solving and approximating differential equations, also providing numerous examples that show methods being used. Topics include ordinary differential equations, symplectic integration of differential equations, and the use of wavelets when numerically solving differential equations., This book compiles the most widely applicable methods for solving and approximating differential equations. as well as numerous examples showing the methods use. Topics include ordinary differential equations, symplectic integration of differential equations, and the use of wavelets when numerically solving differential equations. For nearly every technique, the book provides: The types of equations to which the method is applicable The idea behind the method The procedure for carrying out the method At least one simple example of the method Any cautions that should be exercised Notes for more advanced users References to the literature for more discussion or more examples, including pointers to electronic resources, such as URLs
LC Classification NumberQA371.Z88 1998
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