HU Credits:
3
Degree/Cycle:
2nd degree (Master)
Responsible Department:
Mathematics
Semester:
1st Semester
Teaching Languages:
English
Campus:
E. Safra
Course/Module Coordinator:
Prof Ari Shnidman
Coordinator Office Hours:
By appointment
Teaching Staff:
Prof Schneidman Ari
Course/Module description:
"Mazur's theorem on elliptic curves"
Abstract: The group of points on an elliptic curve y^2 &eq; x^3 + Ax + B over the field Q forms a finitely generated abelian group. In 1977, Mazur classified the torsion subgroups that can arise and in particular showed that the torsion subgroup has order at most 16. We will go through the proof of this result. The level of detail and background assumed will depend to some extent on the audience. If there is time at the end, we will discuss the Manin-Mumford conjecture (first proved by Raynaud) which concerns torsion points on higher genus curves
Prerequisites: it will be good to have at least some familiarity with algebraic number theory, algebraic geometry, elliptic curves/abelian varieties, and modular forms.
Course/Module aims:
Learning outcomes - On successful completion of this module, students should be able to:
None
Attendance requirements(%):
0
Teaching arrangement and method of instruction:
Lecture
Course/Module Content:
None
Required Reading:
None
Additional Reading Material:
Grading Scheme :
Active Participation / Team Assignment 100 %
Additional information:
|