Ellipsoidal Harmonics
Ellipsoidal Harmonics
CAD$206.95
The sphere is what might be called a perfect shape. Unfortunately nature is imperfect and many bodies are better represented by an ellipsoid. The theory of ellipsoidal harmonics, originated in the nineteenth century, could only be seriously applied with the kind of computational power available in recent years. This, therefore, is the first book devoted to ellipsoidal harmonics. Topics are drawn from geometry, physics, biosciences and inverse problems. It contains classical results as well as new material, including ellipsoidal bi-harmonic functions, the theory of images in ellipsoidal geometry and vector surface ellipsoidal harmonics, which exhibit an interesting analytical structure. Extended appendices provide everything one needs to solve formally boundary value problems. End-of-chapter problems complement the theory and test the reader's understanding. The book serves as a comprehensive reference for applied mathematicians, physicists, engineers and for anyone who needs to know the current state of the art in this fascinating subject.
- Up to date with brand new results and material
- Ideal for engineers and applied scientists who need to solve particular problems
- May be used as a textbook for advanced undergraduate courses, graduate courses or special research topics
Product details
June 2012Adobe eBook Reader
9781139511841
0 pages
0kg
32 b/w illus.
This ISBN is for an eBook version which is distributed on our behalf by a third party.
Table of Contents
- Prologue
- 1. The ellipsoidal system and its geometry
- 2. Differential operators in ellipsoidal geometry
- 3. Lamé functions
- 4. Ellipsoidal harmonics
- 5. The theory of Niven and Cartesian harmonics
- 6. Integration techniques
- 7. Boundary value problems in ellipsoidal geometry
- 8. Connection between sphero-conal and ellipsoidal harmonics
- 9. The elliptic functions approach
- 10. Ellipsoidal bi-harmonic functions
- 11. Vector ellipsoidal harmonics
- 12. Applications to geometry
- 13. Applications to physics
- 14. Applications to low-frequency scattering theory
- 15. Applications to bioscience
- 16. Applications to inverse problems
- Epilogue
- Appendix A. Background material
- Appendix B. Elements of dyadic analysis
- Appendix C. Legendre functions and spherical harmonics
- Appendix D. The fundamental polyadic integral
- Appendix E. Forms of the Lamé equation
- Appendix F. Table of formulae
- Appendix G. Miscellaneous relations
- Bibliography
- Index.
