A course in mathematics for students of physics
Author(s)
Bibliographic Information
A course in mathematics for students of physics
Cambridge University Press, 1988-1990
- v. 1
- v. 2
Available at 42 libraries
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Note
Includes index
Description and Table of Contents
- Volume
-
v. 1 ISBN 9780521250177
Description
This textbook, available in two volumes, has been developed from a course taught at Harvard over the last decade. The course covers principally the theory and physical applications of linear algebra and of the calculus of several variables, particularly the exterior calculus. The authors adopt the 'spiral method' of teaching, covering the same topic several times at increasing levels of sophistication and range of application. Thus the reader develops a deep, intuitive understanding of the subject as a whole, and an appreciation of the natural progression of ideas. Topics covered include many items previously dealt with at a much more advanced level, such as algebraic topology (introduced via the analysis of electrical networks), exterior calculus, Lie derivatives, and star operators (which are applied to Maxwell's equations and optics). This then is a text which breaks new ground in presenting and applying sophisticated mathematics in an elementary setting. Any student, interpreted in the widest sense, with an interest in physics and mathematics, will gain from its study.
Table of Contents
- 1. Linear transformations of the plane
- 2. Eigenvectors and eigenvalues
- 3. Linear differential equations in the plane
- 4. Scalar products
- 5. Calculus in the plane
- 6. Applications of differential calculus
- 7. Differential forms and line integrals
- 8. Double integrals
- 9. Gaussian optics
- 10. Vector spaces and linear transformations
- 11. Determinants
- Index.
- Volume
-
v. 2 ISBN 9780521332453
Description
This textbook, available in two volumes, has been developed from a course taught at Harvard over the last decade. The course covers principally the theory and physical applications of linear algebra and of the calculus of several variables, particularly the exterior calculus. The authors adopt the 'spiral method' of teaching, covering the same topic several times at increasing levels of sophistication and range of application. Thus the reader develops a deep, intuitive understanding of the subject as a whole, and an appreciation of the natural progression of ideas. Topics covered include many items previously dealt with at a much more advanced level, such as algebraic topology (introduced via the analysis of electrical networks), exterior calculus, Lie derivatives, and star operators (which are applied to Maxwell's equations and optics). This then is a text which breaks new ground in presenting and applying sophisticated mathematics in an elementary setting. Any student, interpreted in the widest sense, with an interest in physics and mathematics, will gain from its study.
Table of Contents
- 1. The theory of electric networks
- 2. The method of orthogonal projection
- 3. Higher-dimensional complexes
- 4. Complexes situated in Rn
- 5. Electrostatics in R3
- 6. Currents, flows and magnetostatics
- 7. The star operator
- 8. Maxwell's equations
- 9. Complex analysis
- 10. Asymptotic analysis
- Index.
by "Nielsen BookData"