Eigenvalue Coincidences and Multiplicity Free Spherical Pairs

Abstract

In recent work, we related the structure of subvarieties of n× n complex matrices defined by eigenvalue coincidences to GL(n-1,C)-orbits on the flag variety of gl(n,C). In the first part of this paper, we extend these results to the complex orthogonal Lie algebra g=so(n,C). In the second part of the paper, we use these results to study the geometry and invariant theory of the K-action on g, in the cases where (g, K) is (gl(n,C), GL(n-1,C)) or (so(n,C), SO(n-1,C)). We study the geometric quotient g g//K and describe the closed K-orbits on g and the structure of the zero fibre. We also prove that for x∈ g, the K-orbit Ad(K)· x has maximal dimension if and only if the algebraically independent generators of the invariant ring C[g]K are linearly independent at x, which extends a theorem of Kostant. We give applications of our results to the Gelfand-Zeitlin system.