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UID:4972@i2m.univ-amu.fr
DTSTART;TZID=Europe/Paris:20231121T140000
DTEND;TZID=Europe/Paris:20231121T150000
DTSTAMP:20240524T072506Z
URL:https://www.i2m.univ-amu.fr/evenements/tba-78/
SUMMARY: (...): Nearly Coleman theory for Siegel modular forms
DESCRIPTION:: In the study of special values of L-functions and p-adic L-fu
 nctions\, it is often necessary to have a good theory of p-adic families o
 f nearly holomorphic automorphic forms (nearly overconvergent forms) and t
 he p-adic iteration of Maass--Shimura differential operators. There are se
 veral candidates for this theory in the literature\, however there is usua
 lly a restriction\, e.g.\, on the slopes of the nearly overconvergent form
 s or the p-adic variation of the differential operators. In this talk\, I 
 will discuss a new construction of this theory in the Siegel case which do
 esn't come with the aforementioned restrictions. The construction should a
 lso generalise to other reductive groups which give rise to Shimura variet
 ies. Joint work with Vincent Pilloni and Joaquin Rodrigues Jacinto.
CATEGORIES:Séminaire,Représentations des Groupes Réductifs
LOCATION:Site Sud\, Luminy\, Ancienne BU\, Salle Séminaire2 (RdC)\, \, 
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TZID:Europe/Paris
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DTSTART:20231029T020000
TZOFFSETFROM:+0200
TZOFFSETTO:+0100
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