Rotors in triangles and tethrahedra

Abstract

A polytope P is circumscribed about a convex body ⊂ Rn if ⊂ P and each facet of P is contained in a support hyperplane of . We say that a convex body ⊂ Rn is a rotor of a polytope P if for each rotation of Rn there exist a translation τ so that P is circumscribed about τ. In this paper we shall prove that if P is a triangle, then there is a baricentric formula that describes the curvature of bd at the contact points, \A1, A2,A3\. We prove also that if ⊂ R3 is a convex body which is a rotor in a tetrahedron T and if intersects the faces of T at the points \x1, …, x4\, then the normal lines of at the contact points with T, \x1, …, x4\ generically belong to one ruling of a quadric surface.