A Spectrahedral Representation for Polar Orbitopes
Abstract
Let G be a Lie group with real semisimple Lie algebra g. Further let g = k p be a Cartan decomposition. The maximal compact subgroup K ⊂eq G acts on p via the adjoint representation and the convex hulls of the resulting orbits are the polar orbitopes. We prove that every polar orbitope is a spectrahedron by giving an explicit representation. In addition we give a new proof for the fact that the faces of a polar orbitope are, up to conjugation, given by the faces of the momentum polytope.
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