Green's Functions and Boundary Value Problems
 | Average Customer Rating: Recommend This revised and updated Second Edition of Green's Functions and Boundary Value Problems maintains a careful balance between sound mathematics and meaningful applications. Central to the text is a down-to-earth approach that shows the reader how to use differential and integral equations when tackling significant problems in the physical sciences, engineering, and applied mathematics. Ivar Stakgold incorporates developments that have altered the field of applied mathematics in recent decades--particularly… Product details and pricing info |
|---|
2 Customer Reviews Posted
- Systematic, not a 'cookbook'
- Actually, I preferred the first (2 volume) edition of this work and used the first volume along with Whittaker and Watson to teach first semester math methods to physics and engineering students. This book provides the most readable, systematic approach to boundary-value problems, based on Weyl's lemma. Not to be compared with the usual cookbooks on math methods because it shows you how to construct nonstandard orthogonal expansions, not merely the usual Fourier, Bessel and Legendre variety. Also very good on Dirac's delta funaction. For second semester, for years I also used Bender and Orszag.
G is called 'the Green function' and not 'the Green's function' (one does not say 'the Bessel's function').
- 2002-05-10, 14 of 17 people found this review helpful, Rated:
- This is one of the best books on applicable PDE's
- This is a classic text. The authors not only knows much more than is in the book but also has a clear idea about the applied side of math. A close competitor is Sobolev's book on PDE's.
- 1997-02-26, 8 of 10 people found this review helpful, Rated:
