Article ID Journal Published Year Pages File Type
4667898 Advances in Mathematics 2006 31 Pages PDF
Abstract

Fix a split connected reductive group G over a field k, and a positive integer r. For any r-tuple of dominant coweights μi of G, we consider the restriction mμ• of the r-fold convolution morphism of Mirkovic–Vilonen to the twisted product of affine Schubert varieties corresponding to μ•. We show that if all the coweights μi are minuscule, then the fibers of mμ• are equidimensional varieties, with dimension the largest allowed by the semi-smallness of mμ•. We derive various consequences: the equivalence of the non-vanishing of Hecke and representation ring structure constants, and a saturation property for these structure constants, when the coweights μi are sums of minuscule coweights. This complements the saturation results of Knutson–Tao and Kapovich–Leeb–Millson. We give a new proof of the P-R-V conjecture in the “sums of minuscules” setting. Finally, we generalize and reprove a result of Spaltenstein pertaining to equidimensionality of certain partial Springer resolutions of the nilpotent cone for GLn.

Related Topics
Physical Sciences and Engineering Mathematics Mathematics (General)