A four-dimensional body of constant width (2510.16672v1)

Abstract: The study of bodies of constant width is a classical subject in convex geometry, with the three-dimensional Meissner bodies being canonical examples. This paper presents a novel geometric construction of a body of constant width in $R^4$, addressing the challenge of constructing such bodies in higher dimensions. Our method produces a natural analogue of the second Meissner body, by modifying a 4-dimensional Reuleaux simplex. The resulting body possesses tetrahedral symmetry and has a boundary composed of both smooth surfaces and a non-smooth subset of the Reuleaux 4-simplex. Furthermore, we analyze the orthogonal projection of this body onto the 3-dimensional hyperplane of its base. This "shadow" is a new 3-dimensional body of constant width with tetrahedral symmetry. It has six elliptical edges and we estimate its volume to be only slightly larger than that of the Meissner bodies.