Topology of the Gr\"unbaum--Hadwiger--Ramos problem for mass assignments

Abstract

In this paper, motivated by recent work of Schnider and Axelrod-Freed \& Sober\'on, we study an extension of the classical Gr\"unbaum--Hadwiger--Ramos mass partition problem to mass assignments. Using the Fadell--Husseini index theory we prove that for a given family of j mass assignments μ1,…,μj on the Grassmann manifold G(d) and a given integer k≥ 1 there exist a linear subspace L∈ G(d) and k affine hyperplanes in L that equipart the masses μ1L,…,μjL assigned to the subspace L, provided that d≥ j + (2k-1-1)22j.