Bisecting masses with families of parallel hyperplanes

Abstract

We prove a common generalization of several mass partition results using hyperplane arrangements to split Rd into two sets. Our main result implies the ham sandwich theorem, the necklace splitting theorem for two thieves, a theorem about chessboard splittings using hyperplanes with fixed directions, and all known cases of Langerman's conjecture about bisections with n hyperplanes. Our main result also confirms an infinite number of previously unknown cases of the following conjecture of Takahashi and Soberón: For any d+k-1 measures in Rd, there exist an arrangement of k parallel hyperplanes that bisects each of the measures. The general result follows from the case of measures that are supported on a finite set with an odd number of points. The proof for this case is inspired by ideas of differential and algebraic topology, but it is a completely elementary parity argument. Additionally, we disprove a conjecture by Langerman on bisections of measures using hyperplane arrangements, showing that the conditions in our main result are sometimes necessary.