Same average in every direction

Abstract

Given a polytope P⊂ R3 and a non-zero vector z ∈ R3, the plane \x∈ R3:zx=t\ intersects P in convex polygon P(z,t) for t ∈ [t-,t+] where t-= \zx: x ∈ P\ and t+= \zx: x∈ P\, zx is the scalar product of z,x ∈ R3. Let A(P,z) denote the average number of vertices of P(z,t) on the interval [t-,t+]. For what polytopes is A(P,z) a constant independent of z?

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