Some attempts toward 3-dimensional Phyllotaxy
Abstract
This paper investigates several distinct attempts to generalize in higher dimension the standard 2-dimensional phyllotaxy set construction. We first recall known contructions for these sets on manifolds of constant curvature (the Euclidean plane , the sphere and the hyperbolic plane ). We then propose a first attempt to get a phyllotactic set by piling up suitably shifted Euclidean phyllotactic sets. A different, radially triggered, solution is then analyzed. An interesting phyllotactic set on the hypersphere is then generated using a Hopf fibration approach. Finally,a simple 4-dimensional example is presented, generated as a simple product of two 2-dimensional planar sets. A phyllotaxy candidate is then derived by applying a "Cut and Project" algorithm.
Cite
@article{arxiv.2511.15450,
title = {Some attempts toward 3-dimensional Phyllotaxy},
author = {Rémy Mosseri and Jean-François Sadoc},
journal= {arXiv preprint arXiv:2511.15450},
year = {2025}
}
Comments
13 pages, 10 figures