Small spherical nilpotent orbits and K-types of Harish Chandra modules

Abstract

Let G be a connected linear semisimple Lie group with Lie algebra g and maximal compact subgroup K. Let KC -> Aut(pC) be the complexified isotropy representation at the identity coset of the corresponding symmetric space. Suppose that O is a nilpotent KC-orbit in pC, and bar(O is its Zariski closure in pC. We study the K-type decomposition of the ring of regular functions on bar(O when O is spherical and ``small''. We also show that this decomposition gives the asymptotic directions of K-types in any irreducible (gC, K)-module whose associated variety is bar(O).

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