English

More bisections by hyperplane arrangements

Metric Geometry 2022-02-03 v3 Algebraic Topology

Abstract

A union of an arrangement of affine hyperplanes HH in RdR^d is the real algebraic variety associated to the principal ideal generated by the polynomial pHp_{H} given as the product of the degree one polynomials which define the hyperplanes of the arrangement. A finite Borel measure on RdR^d is bisected by the arrangement of affine hyperplanes HH if the measure on the "non-negative side" of the arrangement {xRd:pH(x)0}\{x\in R^d : p_{H}(x)\ge 0\} is the same as the measure on the "non-positive" side {xRd:pH(x)0}\{x\in R^d : p_{H}(x)\le 0\}. In 2017 Barba, Pilz \& Schnider considered special cases of the following measure partition hypothesis: For a given collection of jj finite Borel measures on RdR^d there exists a kk-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 d=k=2d=k=2 and j=4j=4. They conjectured that every collection of jj measures on RdR^d can be simultaneously bisected with a kk-element affine hyperplane arrangement provided that dj/kd\ge \lceil j/k \rceil. The conjecture was confirmed in the case when dj/k=2ad\ge j/k=2^a 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 2a(2h+1)+2^a(2h+1)+\ell measures on R2a+R^{2^a+\ell}, where 12a11\leq \ell\leq 2^a-1, there exists a (2h+1)(2h+1)-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.

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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}
}

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