Generalizations of the Yao-Yao partition theorem and the central transversal theorem

Abstract

We generalize the Yao-Yao partition theorem by showing that for any smooth measure in Rd there exist equipartitions using (t+1)2d-1 convex regions such that every hyperplane misses the interior of at least t regions. In addition, we present tight bounds on the smallest number of hyperplanes whose union contains the boundary of an equipartition of a measure into n regions. We also present a simple proof of a Borsuk-Ulam type theorem for Stiefel manifolds that allows us to generalize the central transversal theorem and prove results bridging the Yao--Yao partition theorem and the central transversal theorem.