Polar Zonohedra Edge-Unfold to Nets

Joseph O'Rourke

arXiv:2302.07747·cs.CG·February 17, 2023

Polar Zonohedra Edge-Unfold to Nets

Joseph O'Rourke

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TL;DR

This paper proves that all polar zonohedra can be unfolded along edges to produce a flat, non-overlapping net, advancing understanding of polyhedral unfoldings.

Contribution

It establishes that every polar zonohedron admits an edge-unfolding to a non-overlapping net, a new result in polyhedral unfolding theory.

Findings

01

All polar zonohedra can be edge-unfolded without overlap.

02

The proof applies to a broad class of convex polyhedra.

03

This result extends previous work on polyhedral nets.

Abstract

This note proves that every polar zonohedron has an edge-unfolding to a non-overlapping net.

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Taxonomy

TopicsComputational Geometry and Mesh Generation