The image of Galois l-adic representations for abelian varieties of type III.
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I will discuss a family of simple abelian varieties (over number fields) of type III in the Albert classification. I will show how one can compute the image of l-adic and mod l representations attached to the Tate modules of abelian varieties in this family. I will also show that the Mumford-Tate and Lang conjectures hold for abelian varieties in this family.
This talk is part of the Number Theory Seminar series.
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Tuesday 16 February 2010, 16:15-17:15