Width deviation of convex polygons

Abstract

We consider the width XT(ω) of a convex n-gon T in the plane along the random direction ω∈R/2π Z and study its deviation rate: δ(XT)=E(X2T)-E(XT)2E(XT). We prove that the maximum is attained if and only if T degenerates to a 2-gon. Let n≥ 2 be an integer which is not a power of 2. We show that π4n(π2n) +π28n22(π2n)-1 is the minimum of δ(XT) among all n-gons and determine completely the shapes of T's which attain this minimum. They are characterized as polygonal approximations of equi-Reuleaux bodies, found and studied by K.~Reinhardt. In particular, if n is odd, then the regular n-gon is one of the minimum shapes. When n is even, we see that regular n-gon is far from optimal.We also observe an unexpected property of the deviation rate on the truncation of the regular triangle.