Abstract
For the pairs of complex reductive groups (G,K)=(Sp(2n),Sp(2p)×Sp(2q)) and (SO(2n),GL(n)) components of Springer fibers associated to closed K-orbits in the flag variety B of G are described. The closed K-orbits in B correspond to discrete series representations of GR=Sp(p,q) and SO∗(2n). We give an algorithm to compute the associated variety, the closure of a nilpotent K-orbit K⋅f, of each discrete series representation and we describe the structure of the corresponding component of the Springer fiber μ−1(f). The description of these components has applications to the computation of associated cycles of discrete series representations; this is the topic of the sequel to the present article.
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