The hamburger theorem

Abstract

We generalize the ham sandwich theorem to d+1 measures in Rd as follows. Let μ1,μ2, …, μd+1 be absolutely continuous finite Borel measures on Rd. Let ωi=μi(Rd) for i∈ [d+1], ω=\ωi; i∈ [d+1]\ and assume that Σj=1d+1 ωj=1. Assume that ωi 1/d for every i∈[d+1]. Then there exists a hyperplane h such that each open halfspace H defined by h satisfies μi(H) (Σj=1d+1 μj(H))/d for every i ∈ [d+1] and Σj=1d+1 μj(H) (1/2, 1-dω) 1/(d+1). As a consequence we obtain that every (d+1)-colored set of nd points in Rd such that no color is used for more than n points can be partitioned into n disjoint rainbow (d-1)-dimensional simplices.