KIAS Number Theory Seminar

Eigenvarieties and the locally analytic Langlands program for $GL_n$

Cristophe Breuil (University of Paris-Sud)

April 6 - 7, 2017, 3:00pm-6:00pm, Room 8101

Abstract: Let $p$ be a prime number and $n$ an integer $\geq 2$. The lectures will be a 4 hours (detailed) sketch of the proof by E. Hellmann, B. Schraen and the speaker that all expected companion constituents for $GL_n(Q_p)$ do indeed occur in the socle of the locally analytic Hecke eigenspaces of completed cohomology (for compact unitary groups) in the crystalline case and under standard Taylor-Wiles hypothesis.


Chan-Ho Kim (KIAS)

April 12 (Wed), 2017, 5:00pm-6:00pm, Room 1424

Abstract: We discuss an overconvergent construction of anticyclotomic $p$-adic $L$-functions of modular forms of non-critical slope.

For the number theory seminars we usually meet at Room 1423 or 1424 at 5pm on the 2nd and 4th Thursdays in each month. Please check the tentative schedule of upcoming seminars.

Please send the organizer an email if you are interested in giving a talk. If you want to receive regular email announcement, please use this form or send an email with your name/affiliation, in title of "subscribe", to the organizer.

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The first number theory seminar started March 10th, 2005 and it became a regular seminar since then. For more information on the early history of the number theory seminar, see the article (by Soon-Yi Kang in KIAS News Letter, Fall 2005) and the following archive files.

   Archive: 2017 | 2016 | 2015 | 2014 | 2013 | 2012 | 2011 | 2010 | 2009 | 2008 | 2007 | 2006 | 2005 |


Chan-Ho Kim

Research Fellow
Korea Institute for Advanced Study (KIAS)
85 Hoegiro,  Dongdaemun-gu, Seoul 130-722,
Republic of Korea
Tel: +82-2-958-3722, Fax: +82-2-958-3786
Email: chanho at

Number Theory Group at KIAS:

Choi, Youn-Seo (y-choi2)
Park, Chol (cpark)
Kim, Eunmi (ekim)
Kim, Chan-Ho (chanho)
Kim, Kwang-Seob (kwang12)
Ha, Junsoo (junsooha)

(*) The picture is originally a PGF created by Jang Soo Kim and is under the creative commons licence.