The Leaf Function of Penrose P2 Graphs
Abstract
We study a graph-theoretic problem in the Penrose P2-graphs which are the dual graphs of Penrose tilings by kites and darts. Using substitutions, local isomorphism and other properties of Penrose tilings, we construct a family of arbitrarily large induced subtrees of Penrose graphs with the largest possible number of leaves for a given number of vertices. These subtrees are called fully leafed induced subtrees. We denote their number of leaves for any non-negative integer , and the sequence is called the leaf function of Penrose P2-graphs. We present exact and recursive formulae for , as well as an infinite sequence of fully leafed induced subtrees, which are caterpillar graphs. In particular, our proof relies on the construction of a finite graded poset of 3-internal-regular subtrees.
Keywords
Cite
@article{arxiv.2312.08262,
title = {The Leaf Function of Penrose P2 Graphs},
author = {Carole Porrier and Alain Goupil and Alexandre Blondin Massé},
journal= {arXiv preprint arXiv:2312.08262},
year = {2025}
}
Comments
25 pages, 19 figures