NTS ABSTRACT: Difference between revisions

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| bgcolor="#BCD2EE"  | (Joint with M. Bhargava, T. Taniguchi, F. Thorne, J. Tsimerman, Y. Zhao)
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Given a number field K of fixed degree n over Q, a classical theorem of Brauer--Siegel asserts that the size of the class group of K is bounded by O_\epsilon(|Disc(K)|^(1/2+\epsilon). For any prime p, it is conjectured that the p-torsion
subgroup of the class group of K is bounded by O_\epsilon(|Disc(K)|^\epsilon. Only the case n=p=2 of this conjecture in known. In fact, for most pairs (n,p), the best known bounds come from the "convex" Brauer--Siegel bound.
 
In this talk, we will discuss a proof of a subconvex bound on the size of the 2-torsion in the class groups of number fields, for all degrees n. We will also discuss an application of this result towards improved bounds on the number of integral points on elliptic curves.
 


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Revision as of 22:05, 18 January 2017

Return to NTS Spring 2017

Jan 19

Bianca Viray
On the dependence of the Brauer-Manin obstruction on the degree of a variety
Let X be a smooth projective variety of degree d over a number field k. In 1970 Manin observed that elements of the Brauer group of X can obstruct the existence of a k-point, even when X is everywhere locally soluble. In joint work with Brendan Creutz, we prove that if X is geometrically abelian, Kummer, or bielliptic then this Brauer-Manin obstruction to the existence of a k-point can be detected from only the d-primary torsion Brauer classes.


Jan 26

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Feb 2

Arul Shankar
Bounds on the 2-torsion in the class groups of number fields


Feb 9

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Feb 16

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Feb 23

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Mar 2

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Mar 9

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Mar 16


Mar 30

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Apr 6

Celine Maistret


Apr 13


Apr 20

Yueke Hu
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Apr 27

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May 4

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