This book gives a comprehensive introduction to those parts of the theory of elliptic integrals and elliptic functions which provide illuminating examples in complex analysis, but which are not often covered in regular university courses. These examples form prototypes of major ideas in modern mathematics and were a driving force of the subject in the eighteenth and nineteenth centuries. In addition to giving an account of the main topics of the theory, the book also describes many applications, both in mathematics and in physics. For the readers convenience, all necessary preliminaries on basic notions such as Riemann surfaces are explained to a level sufficient to read the book.
For each notion a clear motivation is given for its study, answering the question Why do we consider such objects?, and the theory is developed in a natural way that mirrors its historical development (e.g., If there is such and such an object, then you would surely expect this one). This feature sets this text apart from other books on the same theme, which are usually presented in a different order. Throughout, the concepts are augmented and clarified by numerous illustrations.
Suitable for undergraduate and graduate students of mathematics, the book will also be of interest to researchers who are not familiar with elliptic functions and integrals, as well as math enthusiasts.
Recenzijos
This book is intended to present various aspects of the theory of elliptic integrals and elliptic functions, and provides definitions, theorems, proofs, examples and applications. The book is well written and organized in a clear way. It includes many figures and graphs helpful in explaining the material in each chapter of the book. (Faitori Omer Salem, zbMATH 1542.33001, 2024)
Introduction.
Chapter
1. The arc length of curves.
Chapter
2.
Classification of elliptic integrals.
Chapter
3. Applications of elliptic
integrals.
Chapter
4. Jacobis elliptic functions on R.
Chapter
5.
Applications of Jacobis elliptic functions.- Riemann surfaces of algebraic
functions.
Chapter
7. Elliptic curves.
Chapter
8. Complex elliptic
integrals.
Chapter
9. Mapping the upper half plane to a rectangle.
Chapter
10. The Abel-Jacobi theorem.
Chapter
11. The general theory of elliptic
functions.
Chapter
12. The Weierstrass -function.
Chapter
13. Addition
theorems.
Chapter
14. Characterisation by addition formulae.
Chapter
15.
Theta functions.
Chapter
16. Infinite product factorisation of theta
functions.
Chapter
17. Complex Jacobian functions.- Appendix A. Theorems in
analysis and complex analysis.- Bibliography.- Index.
Takashi TAKEBE is a professor at the Faculty of Mathematics, National Research University Higher School of Economics, Moscow. He studies integrable systems in mathematical physics, especially integrable nonlinear differential equations, their connection with complex analysis and solvable lattice models in statistical mechanics related to elliptic R-matrices.
