On the shadow boundary of a centrally symmetric convex body

Abstract

We discuss the concept of the shadow boundary of a centrally symmetric convex ball K (actually being the unit ball of a Minkowski normed space) with respect to a direction x of the Euclidean n-space Rn. We introduce the concept of general parameter spheres of K corresponding to this direction and prove that the shadow boundary is a topological manifold if all of the non-degenerated general parameter spheres are, too. In this case, using the approximation theorem of cell-like maps we get that they are homeomorphic to the (n-2)-dimensional sphere S(n-2). We also prove that the bisector (equidistant set of the corresponding normed space) in the direction x is homeomorphic to R(n-1) iff all of the non-degenerated general parameter spheres are (n-2)-manifolds implying that if the bisector is a homeomorphic copy of R(n-1) then the corresponding shadow boundary is a topological (n-2)-sphere.