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比利时vs摩洛哥足彩 ,
university of california san diego

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chabauty reading group

david corwin

uc berkeley

explicit nonabelian chabauty via motives

abstract:

i will introduce a program, begun by dan-cohen and wewers, to compute minhyong kim's selmer varieties using mixed tate motives. the idea is as follows. we care about the galois action on the unipotent fundamental group of $\mathbf{p}^1 \setminus \{0,1,\infty\}$. this galois action lives in a certain category of $p$-adic galois representations known as mixed tate representations. we will see that this category is tannakian and has a fairly simple description, in terms of its ext groups, which are just bloch-kato selmer groups. the bloch-kato selmer groups are $p$-adic vector spaces, but they also have a rational structure coming from algebraic k-theory. the category of mixed tate motives gives us a $\mathbb{q}$-linear tannakian category that underlies the $\mathbb{q}_p$-linear tannakian category of galois representations. this in turn allows us to define a selmer variety over $\mathbb{q}$ (rather than $\mathbb{q}_p$), and a more explicit understanding of the category of mixed tate motives allows us to compute this variety explicitly.

host: kiran kedlaya

february 28, 2020

8:30 am

ap&m 7218

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