More bisections by hyperplane arrangements
Abstract
A union of an arrangement of affine hyperplanes in is the real algebraic variety associated to the principal ideal generated by the polynomial given as the product of the degree one polynomials which define the hyperplanes of the arrangement. A finite Borel measure on is bisected by the arrangement of affine hyperplanes if the measure on the "non-negative side" of the arrangement is the same as the measure on the "non-positive" side . In 2017 Barba, Pilz \& Schnider considered special cases of the following measure partition hypothesis: For a given collection of finite Borel measures on there exists a -element affine hyperplane arrangement that bisects each of the measures into equal halves simultaneously. They showed that there are simultaneous bisections in the case when and . They conjectured that every collection of measures on can be simultaneously bisected with a -element affine hyperplane arrangement provided that . The conjecture was confirmed in the case when by Hubard and Karasev in 2018. In this paper we give a different proof of the Hubard and Karasev result using the framework of Blagojevi\'c, Frick, Haase \& Ziegler (2016), based on the equivariant relative obstruction theory of tom Dieck, which was developed for handling the Gr\"unbaum--Hadwiger--Ramos hyperplane measure partition problem. Furthermore, this approach allowed us to prove even more, that for every collection of measures on , where , there exists a -element affine hyperplane arrangement that bisects all of them simultaneously. Our result was extended to the case of spherical arrangements and reproved by alternative methods in a beautiful way by Crabb in 2020.
Cite
@article{arxiv.1809.05364,
title = {More bisections by hyperplane arrangements},
author = {Pavle V. M. Blagojević and Aleksandra Dimitrijević Blagojević and Roman Karasev and Jonathan Kliem},
journal= {arXiv preprint arXiv:1809.05364},
year = {2022}
}
Comments
2 figures