R. Kottwitz, Shimura varieties and -adic representations, In Automorphic Forms, Shimura Varieties, and L-functions, Vol. 1, Academic Press (1990), 161-209.  Home/Search   Document Not in Database   Summary   Related Articles   Check

....structure of a projective algebraic variety; it is a Shimura variety. Actually the most interesting Shimura varieties arise from non cocompact arithmetic subgroups Gamma, by compactification of X. A great deal is known about the cohomology of Shimura varieties; some background may be found in [9]. From the point of view of the Langlands program, however, the most basic example of a Riemannian locally symmetric space has G = GL(n; R ) and K = O(n) In that case X is not a complex manifold (unless n = 2) and there seem to be few ideas about what kind of special extra structure X might ....

R. Kottwitz, Shimura varieties and -adic representations, Automorphic Forms, Shimura Varieties, and L-functions (L. Clozel and J. Milne, eds.), Perspectives in Mathematics 10, vol. I, Academic Press, San Diego, 1990, pp. 161--209.

No context found.

R. Kottwitz, Shimura varieties and -adic representations, In Automorphic Forms, Shimura Varieties, and L-functions, Vol. 1, Academic Press (1990), 161-209.

No context found.

R. Kottwitz, Shimura varieties and #-adic representations, in Automorphic Forms, Shimura varieties, and L-functions, vol I, Academic Press, New York, 1990, p. 161--209.

Online articles have much greater impact   More about CiteSeer.IST   Add search form to your site   Submit documents   Feedback  

CiteSeer.IST - Copyright Penn State and NEC