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Physical Mathematics

Publisher: 
Cambridge University Press
Number of Pages: 
666
Price: 
85.00
ISBN: 
9781107005211

This is a comprehensive and well laid out handbook of all the mathematics that physicists need to know. Very Good Feature: all the examples are real problems from physics. They are slanted toward particle physics, but cover most of mathematical physics.

It is marketed as a text for upper-division and graduate courses, but the exercises, although well-chosen, are sparse compared to the amount of material covered. I think it would work best as a handbook or supplemental work rather than the main text.

The coverage is well-balanced. The only conspicuous flaw is that it is skimpy on partial differential equations. The book covers the most common special functions of physics, but is not comprehensive even for those. There are no proofs, although some are requested in the exercises.

A somewhat similar book, although aimed at a different audience, is Kreyszig’s Advanced Engineering Mathematics. This covers a lot of the same material, but has much more extensive examples and exercises. Most of Kreyszig’s exercises come from physics, but it is an older physics than in Cahill, emphasizing mechanics and waves.


Allen Stenger is a math hobbyist and retired software developer. He is webmaster and newsletter editor for the MAA Southwestern Section and is an editor of the Missouri Journal of Mathematical Sciences. His mathematical interests are number theory and classical analysis. He volunteers in his spare time at MathNerds.org, a math help site that fosters inquiry learning.

Date Received: 
Wednesday, May 15, 2013
Reviewable: 
Yes
Include In BLL Rating: 
No
Kevin Cahill
Publication Date: 
2013
Format: 
Hardcover
Category: 
Textbook
Allen Stenger
11/6/2013

Preface
1. Linear algebra
2. Fourier series
3. Fourier and Laplace transforms
4. Infinite series
5. Complex-variable theory
6. Differential equations
7. Integral equations
8. Legendre functions
9. Bessel functions
10. Group theory
11. Tensors and local symmetries
12. Forms
13. Probability and statistics
14. Monte Carlo methods
15. Functional derivatives
16. Path integrals
17. The renormalization group
18. Chaos and fractals
19. Strings
Index.

Publish Book: 
Modify Date: 
Wednesday, May 15, 2013

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