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

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math 209 - number theory seminar

kwun angus chung

university of michigan

$v$-adic convergence for exp and log in function fields and applications to $v$-adic $l$-values

abstract:

classically over the rational numbers, the exponential and logarithm series converge $p$-adically within some open disc of $\mathbb{c}_p$. for function fields, exponential and logarithm series arise naturally from drinfeld modules, which are objects constructed by drinfeld in his thesis to prove the langlands conjecture for $\mathrm{gl}_2$ over function fields. for a ``finite place'' $v$ on such a curve, one can ask if the exp and log possess similar $v$-adic convergence properties. for the most basic case, namely that of the carlitz module over $\mathbb{f}_q[t]$, this question has been long understood. in this talk, we will show the $v$-adic convergence for drinfeld-(hayes) modules on elliptic curves and a certain class of hyperelliptic curves. as an application, we are then able to obtain a formula for the $v$-adic $l$-value $l_v(1,\psi)$ for characters in these cases, analogous to leopoldt's formula in the number field case.

host: kiran kedlaya

january 21, 2021

1:00 pm

location: see //www.ladysinger.com/\~{}nts/

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