# Directions sets: A generalization of ratio sets

**Authors:** Paolo Leonetti, Carlo Sanna

arXiv: 1907.11877 · 2020-12-15

## TL;DR

This paper introduces and analyzes the concept of k-directions sets, generalizing ratio sets, and characterizes their accumulation points and density properties within the unit sphere.

## Contribution

It defines k-directions sets as a generalization of ratio sets, characterizes their accumulation points, and provides conditions for their density in the sphere.

## Key findings

- Characterization of sets of accumulation points of k-directions sets.
- A simple sufficient condition for density of D^k(A) in the sphere.
- Extension of ratio set concepts to higher dimensions.

## Abstract

For every integer $k \geq 2$ and every $A \subseteq \mathbb{N}$, we define the \emph{$k$-directions sets} of $A$ as $D^k(A) := \{{\bf a} / \|{\bf a}\| : {\bf a} \in A^k\}$ and $D^{\underline{k}}(A) := \{{\bf a} / \|{\bf a}\| : {\bf a} \in A^{\underline{k}}\}$, where $\|\cdot\|$ is the Euclidean norm and $A^{\underline{k}} := \{{\bf a} \in A^k : a_i \neq a_j \text{ for all } i \neq j\}$. Via an appropriate homeomorphism, $D^k(A)$ is a generalization of the \emph{ratio set} $R(A) := \{a / b : a,b \in A\}$, which has been studied by many authors. We study $D^k(A)$ and $D^{\underline{k}}(A)$ as subspaces of $S^{k-1} := \{{\bf x} \in [0,1]^k : \|{\bf x}\| = 1\}$. In~particular, generalizing a result of Bukor and T\'oth, we provide a characterization of the sets $X \subseteq S^{k-1}$ such that there exists $A \subseteq \mathbb{N}$ satisfying $D^{\underline{k}}(A)^\prime = X$, where $Y^\prime$ denotes the set of accumulation points of $Y$. Moreover, we provide a simple sufficient condition for $D^k(A)$ to be dense in $S^{k-1}$. We conclude leaving some questions for further research.

## Full text

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## References

23 references — full list in the complete paper: https://tomesphere.com/paper/1907.11877/full.md

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Source: https://tomesphere.com/paper/1907.11877