Lorentzian and Octonionic Satake equivalence
Abstract
We establish a derived geometric Satake equivalence for the real group G R=PSO(2n-1,1) (resp. PE6(F4)), to be called the Lorentzian Satake equivalence (resp. Octonionic Satake equivalence). By applying the real-symmetric correspondence for affine Grassmannians, we obtain a derived geometric Satake equivalence for the splitting rank symmetric variety X=PSO2n/SO2n-1 (resp. PE6/F4). As an application, we compute the stalks of the IC-complexes for spherical orbit closures in the real affine Grassmannian for G R and the loop space of X. We show the stalks are given by the Kostka-Foulkes polynomials for GL2 (resp. GL3) but with q replaced by qn-1 (resp. q4).
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