The Archimedean Projection Property

Abstract

Let H be a hypersurface in Rn and let π be an orthogonal projection in Rn restricted to H. We say that H satisfies the Archimedean projection property corresponding to π if there exists a constant C such that Vol(π-1(U)) = C · Vol(U) for every measurable U in the range of π. It is well-known that the (n-1)-dimensional sphere, as a hypersurface in Rn, satisfies the Archimedean projection property corresponding to any codimension 2 orthogonal projection in Rn, the range of any such projection being an (n-2)-dimensional ball. Here we construct new hypersurfaces that satisfy Archimedean projection properties. Our construction works for any projection codimension k, 2 ≤ k ≤ n - 1, and it allows us to specify a wide variety of desired projection ranges n-k ⊂ Rn-k. Letting n-k be an (n-k)-dimensional ball for each k, it produces a new family of smooth, compact hypersurfaces in Rn satisfying codimension k Archimedean projection properties that includes, in the special case k = 2, the (n-1)-dimensional spheres.