# Antipodal Hadwiger numbers of finite-dimensional Banach spaces

**Authors:** S.K.Mercourakis, G.Vassiliadis

arXiv: 1902.05593 · 2021-02-04

## TL;DR

This paper introduces and studies the antipodal Hadwiger numbers for finite-dimensional Banach spaces, providing exact values for Minkowski planes, estimates for classical spaces, and showing exponential growth with dimension.

## Contribution

It defines the antipodal Hadwiger numbers, computes these for Minkowski planes, estimates them for ℓ_p^n spaces, and demonstrates exponential growth in dimension.

## Key findings

- H'_	ext{α}(X)=4 for Minkowski planes
- Estimates for H_	ext{α}(X) and H'_	ext{α}(X) in ℓ_p^n spaces
- H'_	ext{α}(X) grows exponentially with dimension

## Abstract

Let $X$ be a finite-dimensional Banach space; we introduce and investigate a natural generalization of the concepts of Hadwiger number $H(X)$ and strict Hadwiger number $H'(X)$. More precisely, we define the antipodal Hadwiger number $H_\alpha(X)$ as the largest cardinality of a subset $S \subseteq S_X$, such that $\forall x \neq y \in S \,\,\, \exists f \in B_{X^*}$ with \[1 \le f(x)-f(y) \,\,\, \textrm{and} \,\,\, f(y) \le f(z) \le f(x) \,\,\, \textrm{for} \,\,\, z \in S.\] The strict antipodal Hadwiger number $H'_\alpha(X)$ is defined analogously. We prove that $H'_\alpha(X)=4$ for every Minkowski plane and estimate (or in some cases compute) the numbers $H_\alpha(X)$ and $H'_\alpha(X)$, where $X=\ell_p^n, 1 < p \le +\infty$ and $n \ge 2$. We also show that the number $H'_\alpha(X)$ grows exponentially in $\dim X$.

## Full text

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## Figures

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## References

21 references — full list in the complete paper: https://tomesphere.com/paper/1902.05593/full.md

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Source: https://tomesphere.com/paper/1902.05593