On the connection of facially exposed and nice cones

A closed convex cone K in a finite dimensional Euclidean space is called nice if the set K ∗ + F ⊥ is closed for all F faces of K , where K ∗ is the dual cone of K , and F ⊥ is the orthogonal complement of the linear span of F . The niceness property plays a role in the facial reduction algorithm of Borwein and Wolkowicz, and the question of whether the linear image of the dual of a nice cone is closed also has a simple answer. ve several characterizations of nice cones and show a strong connection with facial exposedness. We prove that a nice cone must be facially exposed; conversely, facial exposedness with an added condition implies niceness. jecture that nice, and facially exposed cones are actually the same, and give supporting evidence.