Self-dual polytope and self-dual smooth Wulff shape

Abstract

For any Wulff shape W, its dual Wulff shape and spherical Wulff shape W can be defined naturally. A self-dual Wulff shape is a Wulff shape equaling its dual Wulff shape exactly. In this paper, we show that if a spherical convex polytope P is of constant width δ, then δ=π/2. As an application of this fact, we prove that a polytope Wulff shape is self-dual if and only if its spherical Wulff shape is a spherical convex body of constant width. We also prove that a smooth Wulff shape is self-dual if and only if for any interior point P of W and for any point Q of the intersection of the boundary of W and the graph of its spherical support function (with respect to P), the image of Q under the spherical blow-up (with respect to P) is always a boundary point of W.