LS-Galleries, the path model and MV-cycles

Abstract

We give an interpretation of the path model of a representation Lit1 of a complex semisimple algebraic group G in terms of the geometry of its affine Grassmannian. In this setting, the paths are replaced by LS--galleries in the affine Coxeter complex associated to the Weyl group of G. To explain the connection with geometry, consider a Demazure--Hansen--Bott--Samelson desingularization () of the closure of an orbit G([[t]]). in the affine Grassmannian. The homology of () has a basis given by Biaynicki--Birula cell's, which are indexed by the T--fixed points in (). Now the points of () can be identified with galleries of a fixed type in the affine Tits building associated to G, and the T--fixed points correspond in this language to combinatorial galleries of a fixed type in the affine Coxeter complex. We determine those galleries such that the associated cell has a non-empty intersection with G([[t]]). (identified with an open subset of ()), and we show that the closures of the strata associated to LS-galleries are exactly the MV--cycles MV, which form a basis of the representation V() for the Langland's dual group G.

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