北京雁栖湖应用数学研究院

This course provides a comprehensive introduction to the arithmetic theory of elliptic curves and their deep connections with number theory. Topics include the basic theory of elliptic curves over various fields, the group law, torsion points, isogenies, and reduction modulo primes. Special emphasis is placed on elliptic curves over number fields, and on their applications in Diophantine equations and modern cryptography.

Key highlights include the Mordell-Weil theorem, the structure of the rational points, complex multiplication, the theory of heights, and the role of elliptic curves in proving Fermat’s Last Theorem via modularity. Students will also explore computational aspects, such as point counting over finite fields and algorithms used in elliptic curve cryptography. Throughout the course, classical results and modern perspectives will be blended to offer a unified view of the subject.

This course is ideal for students with a background in algebra, algebraic number theory, and a basic understanding of algebraic geometry. It prepares students for research in number theory, arithmetic geometry, and cryptography.