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spreckels-ss16

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Carl von Ossietzky Universität Oldenburg
Institut für Mathematik
26111 Oldenburg
olcrypt@uo+ol.de

Coordinators

Prof. Dr. Florian Hess
floykireriantej/m.hessgurj@uo748nl.de<br /> (floriaicbfn.hess@g7uol.adculdeootq)Phone: +49 (0) 441 798-2906


Prof. Dr. Andreas Stein
andt5/k5reas.sts3yein@uol.dmsijxe<br />+x95h (andr3mxeas.sn+rsteeltin@uolybuye.dev+29)Phone: +49 (0) 441 798-3232

Talk

Ute Spreckels (Oldenburg

19.05.2016 - W01 0-012 (Wechloy), 16 Uhr c.t.

On the Order of Abelian Varieties over Finite Prime Fields 

Let A be a principally polarized CM abelian variety of dimension d defined over a number field F containing the CM-field K. If l is a prime number unramified in K, the Galois group G(l) of the l-division field of A lies in a maximal torus of the general symplectic group of dimension 2d over the finite field with l elements. Relying on a method of Weng, we explicitly write down this maximal torus as a matrix group. We restrict ourselves to the case that G(l) equals the maximal torus.
For P a prime ideal of F of inertia degree 1, let A(P) be the reduction of A modulo P. By counting matrices with eigenvalue 1 in G(l) we obtain a formula for the density of primes P such that l divides the order of A(P). Thereby we generalize results of Koblitz and Weng who computed this density for d=1 and 2. Both Koblitz and Weng also gave conjectural formulae for the number of primes P less than n such that A(P) has prime order.
We describe the involved heuristics and generalizations of these conjectures to arbitrary d. We provide examples with d=3. 

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