NTS Spring 2013/Abstracts: Difference between revisions
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Abstract: Consider an elliptic curve ''E''. The explicit formula for ''E'' relates a sum involving the numbers ''a<sub>p''</sub>(''E'') to a sum of three quantities, one involving the analytic rank of the curve, another involving the zeros of the ''L''-series of the curve, and the third, a bounded error term. Barry Mazur and I are attempting to see how numerically explicit – for particular examples – we can make each term in this formula. I'll explain this adventure in a bit more detail, show some plots, and explain what they represent. | Abstract: Consider an elliptic curve ''E''. The explicit formula for ''E'' relates a sum involving the numbers ''a<sub>p''</sub>(''E'') to a sum of three quantities, one involving the analytic rank of the curve, another involving the zeros of the ''L''-series of the curve, and the third, a bounded error term. Barry Mazur and I are attempting to see how numerically explicit – for particular examples – we can make each term in this formula. I'll explain this adventure in a bit more detail, show some plots, and explain what they represent. | ||
(This is joint work with Barry Mazur). | |||
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Revision as of 03:12, 17 January 2013
January 24
Tamar Ziegler (Technion) |
Title: tba |
Abstract: tba |
January 31
William Stein (U. of Washington) |
Title: How explicit is the explicit formula? |
Abstract: Consider an elliptic curve E. The explicit formula for E relates a sum involving the numbers ap(E) to a sum of three quantities, one involving the analytic rank of the curve, another involving the zeros of the L-series of the curve, and the third, a bounded error term. Barry Mazur and I are attempting to see how numerically explicit – for particular examples – we can make each term in this formula. I'll explain this adventure in a bit more detail, show some plots, and explain what they represent. (This is joint work with Barry Mazur). |
February 7
Nigel Boston (Madison) |
Title: A refined conjecture on factoring iterates of polynomials over finite fields |
Abstract: tba |
Organizer contact information
Sean Rostami
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