Faces of invariant convex sets in representations of nontrivial copolarity

Abstract

Let (V, G) be an orthogonal representation of a compact Lie group G with nontrivial copolarity, and a fat section of (V, G). If E is a G-invariant compact convex set in V, then P=E is a convex set in . We prove that up to conjugacy the face structure of E is completely determined by that of P and that a face of E is exposed if and only if the corresponding face of P is exposed. Our result generalizes the result proved by Leonardo Biliotti, Alessandro Ghigi and Peter Heinzner in the case where (V, G) is a polar representation.