Calculus of Variations
Calculus of Variations
Andrew Russell Forsyth
July 2012
Available
Paperback
9781107640832
NZD$75.95
inc GSTPaperback
Andrew Russell Forsyth (1858–1942) was an influential Scottish mathematician notable for incorporating the advances of Continental mathematics within the British tradition. Originally published in 1927, this book constitutes Forsyth's attempt at a systematic exposition of the calculus of variations. It was created as the antidote to a perceived lack of continuity in the development of the topic. Ambitious and highly detailed, this book will be of value to anyone with an interest in the calculus of variations and the history of mathematics in general.
Product details
July 2012Paperback
9781107640832
680 pages
244 × 170 × 35 mm
1.07kg
Available
Table of Contents
- Introduction
- 1. Integrals of the first order: maxima and minima for special weak variations: Euler test, Legendre test, Jacobi test
- 2. Integrals of the first order: general weak variations: the method of Weierstrass
- 3. Integrals involving derivatives of the second order: special weak variations, by the method of Jacobi
- general weak variations, by the method of Weierstrass
- 4. Integrals involving two dependent variables and their first derivatives: special weak variations
- 5. Integrals involving two dependent variables and their first derivatives: general weak variations
- 6. Integrals with two dependent variables and derivatives of the second order: mainly special weak variations
- 7. Ordinary integrals under strong variations, and the Weierstrass test: solid of least resistance: action
- 8. Relative maxima and minima of single integrals: isoperimetrical problems
- 9. Double integrals with derivatives of the first order: weak variations: minimal surfaces
- 10. Strong variations and the Weierstrass test, for double integrals involving first derivatives: isoperimetrical problems
- 11. Double integrals, with derivatives of the second order: weak variations
- 12. Triple integrals with first derivatives
- Index.
