Abelian Functions
Abelian Functions
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(P) USDClassical algebraic geometry, inseparably connected with the names of Abel, Riemann, Weierstrass, Poincaré, Clebsch, Jacobi and other outstanding mathematicians of the last century, was mainly an analytical theory. In our century the methods and ideas of topology, commutative algebra and Grothendieck's schemes enriched it and seemed to have replaced once and forever the somewhat naive language of classical algebraic geometry. This classic book, written in 1897, covers the whole of algebraic geometry and associated theories. Baker discusses the subject in terms of transcendental functions, and theta functions in particular. Many of the ideas put forward are of continuing relevance today, and some of the most exciting ideas from theoretical physics draw on work presented here.
- Classic book (almost 100 yrs old)
- Contains topics that have been quiet for decades but are now resurfacing in theoretical physics
- Introduction relates old theory to modern ideas
Reviews & endorsements
"...offers welcome historical insight into a key point in the history of algebraic geometry." John B. Little, Mathematical Reviews
Product details
February 1996Paperback
9780521498777
724 pages
228 × 153 × 38 mm
0.993kg
Available
Table of Contents
- 1. The subject of investigation
- 2. The fundamental functions on a Riemann surface
- 3. The infinities of rational functions
- 4. Specification of a general form of Riemann's integrals
- 5. Certain forms of the fundamental equation of the Riemann surface
- 6. Geometrical investigations
- 7. Coordination of simple elements
- 8. Abel's theorem
- 9. Jacobi's inversion problem
- 10. Riemann's theta functions
- 11. The hyperelliptic case of Riemann's theta functions
- 12. A particular form of Riemann surface
- 13. Radical functions
- 14. Factorial functions
- 15. Relations concerning products of theta functions
- 16. A direct method of obtaining the equations relating theta functions
- 17. Theta relations with certain groups of characteristics
- 18. Transformation of periods
- 19. On systems of periods and on general Jacobian functions
- 20. Transformation of theta functions
- 21. Complex multiplication of theta functions
- 22. Degenerate Abelian integrals
- Appendix 1. On algebraic curves in space
- Appendix 2. On matrices.
