A short solution of the kissing number problem in dimension three

Alexey Glazyrin

arXiv:2012.15058·math.MG·July 21, 2021·Discret. Comput. Geom.

A short solution of the kissing number problem in dimension three

Alexey Glazyrin

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TL;DR

This paper presents a concise solution to the classical kissing number problem specifically in three-dimensional space, providing clarity and simplicity to a well-studied geometric problem.

Contribution

It offers a novel, simplified proof of the kissing number in three dimensions, improving understanding and accessibility of the solution.

Findings

01

Kissing number in 3D is 12.

02

The proof is shorter and more straightforward than previous methods.

03

Clarifies geometric reasoning behind the kissing number in three dimensions.

Abstract

In this note, we give a short solution of the kissing number problem in dimension three.

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