比利时vs摩洛哥足彩
,
university of california san diego
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math 209 - number theory
claus sorensen
uc san diego
local langlands in rigid families
abstract:
motivated by local-global compatibility in the $p$-adic langlands program, emerton and helm (and others) studied how the local langlands correspondence for $gl(n)$ can be interpolated in zariski families. in this talk i will report on joint work with c. johansson and j. newton on the interpolation in rigid families. we take our rigid space to be an eigenvariety $y$ for some definite unitary group $u(n)$ which parametrizes hecke eigensystems appearing in certain spaces of $p$-adic modular forms. the space $y$ comes endowed with a natural coherent sheaf $\mathcal{m}$. our main result is that the dual fibers $\mathcal{m}_y'$ essentially interpolate the local langlands correspondence at all points $y \in y$. this make use of certain bernstein center elements which appear in scholze's proof of the local langlands correspondence (and also in work of chenevier). in the pre-talk i will talk about the local langlands correspondence, primarily for $gl(2)$.
april 12, 2018
2:00 pm
ap&m 7321
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