Methods for Constructing Exact Solutions of Partial Differential Equations
Mathematical and Analytical Techniques with Applications to Engineering
Published on 8. December 2010
Book
Paperback/Softback
XVI, 352 pages
978-1-4419-3769-8 (ISBN)
Description
Differential equations, especially nonlinear, present the most effective way for describing complex physical processes. Methods for constructing exact solutions of differential equations play an important role in applied mathematics and mechanics. This book aims to provide scientists, engineers and students with an easy-to-follow, but comprehensive, description of the methods for constructing exact solutions of differential equations.
Reviews / Votes
From the reviews:
"The book presents the main methods for finding solutions of partial differential equations . . is the first systematic presentation of methods for constructing exact solutions of PDE's and includes many classical methods . . The book is quite comprehensive . . Some of the approaches are little known in the wider research community, so the book fills this gap in the literature. The author defines the target audience as students, engineers and scientists . interested in solving partial differential equations." (Irina Yehorchenko, Mathematical Reviews, Issue 2006 m)
More details
Series
Edition
Softcover reprint of hardcover 1st ed. 2005
Language
English
Place of publication
New York
United States
Target group
Professional and scholarly
Professional/practitioner
Product notice
Paperback (trade)
Unsewn / adhesive bound
Illustrations
XVI, 352 p.
Dimensions
Height: 234 mm
Width: 156 mm
Thickness: 20 mm
Weight
517 gr
ISBN-13
978-1-4419-3769-8 (9781441937698)
DOI
10.1007/b107051
Schweitzer Classification
Other editions
Additional editions
Sergey V. Meleshko
Methods for Constructing Exact Solutions of Partial Differential Equations
Mathematical and Analytical Techniques with Applications to Engineering
Book
09/2005
Springer
€235.39
Shipment within 5-7 days
Content
Equations with One Dependent Function.- Systems of Equations.- Method of the Degenerate Hodograph.- Method of Differential Constraints.- Invariant and Partially Invariant Solutions.- Symmetries of Equations with Nonlocal Operators.- Symbolic Computer Calculations.