2009 Summer School
The 2009 CMI Summer School will be held from June 15 to July 10 on Galois Representations at the University of Hawaii at Manoa, Honolulu.
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2009 Clay Research Awards Announced
March 10, 2009. The Clay Mathematics Institute announces Jean-Loup Waldspurger, Ian Agol, Danny Calegari and David Gabai as the recipients of the 2009 Clay Research Awards. Awards will be presented at the Clay Research Conference to be held May 4-5 at Harvard University. more....
2009 Clay Research Conference
The Clay Mathematics Institute held its 2009 Research Conference May 4-5 in Harvard Science Center, Lecture Hall E. Speakers were Herwig Hauser, Heisuke Hironaka, Peter Jones, Curtis T. McMullen, Yair Minsky, Dinakar Ramakrishnan, Kannan Soundararajan and Jean-Loup Waldspurger. more ....
2008/09 Clay Lectures on Mathematics
Lectures were hosted by:
Research Institute for Mathematical Sciences
Kyoto University
Japan
Dates: March 2-5, 2009
Roman Bezrukavnikov (MIT), James Carlson (CMI), Dennis Gaitsgory (Harvard University), Hiraku Nakajima (RIMS Kyoto)
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Monograph Proposals
The Clay Mathematics Institute solicits manuscripts for its monograph series, published jointly with the AMS. The series publishes selected expositions of recent developments, both in emerging areas and in older subjects transformed by new insights or unifying ideas. If you are interested in submitting a manuscript, please send your project description and a draft section of the proposed manuscript (if available) to Jim Carlson, managing editor, through Vida Salahi (salahi at claymath dot org).
The Poincaré Conjecture: work of Grigory Perelman
Grigory Perelman was awarded a Fields Medal at the Madrid meeting on the International Congress of Mathematicians for "his contributions to geometry and his revolutionary insights into the analytical and geometric structure of the Ricci flow." A number of authors have written detailed expositions of Perelman's work. These papers, as well as other references, are listed here.
Hodge Conjecture
The answer to this conjecture determines how much of the topology of the solution set of a system of algebraic equations can be defined in terms of further algebraic equations. The Hodge conjecture is known in certain special cases, e.g., when the solution set has dimension less than four. But in dimension four it is unknown.
Workshops at CMI
CMI plans to hold four to six small Workshops each year at its offices at One Bow Street, Cambridge, Massachusetts. These will be of three to six days duration. For more information or to make a proposal, please contact Jim Carlson through his executive assistant Alagi Patel (patel at claymath dot org, 617-995-2600).
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