Number Theory Seminar: Nils Bruin
Topic
Imaginary quadratic class numbers and Sha on congruent number curves
Speakers
Details
Abstract:
We consider two classical number theoretic problems that may seem quite
unrelated:
* What is the power of 2 dividing the class number of Q(sqrt(-n))
* Which n are congruent numbers (n called congruent if it occurs as the
area of a right-angled triangle with rational length sides)
The second question is equivalent to determining whether the elliptic curve E_n: y^2=x^3-n^2*x has positive rank. This observation suggest we might want to consider:
* What is the power of 2 in the order of Sha(E_n).
If we restrict to prime values n=p, it is already known that partial answers to these questions can be related to the splitting of p in the quartic number field Q(sqrt(1+i)).
In this talk we will discuss the next step in the classification.