English

Saturated Fully Leafed Tree-Like Polyforms and Polycubes

Combinatorics 2018-03-28 v1

Abstract

We present recursive formulas giving the maximal number of leaves in tree-like polyforms living in two-dimensional regular lattices and in tree-like polycubes in the three-dimensional cubic lattice. We call these tree-like polyforms and polycubes \emph{fully leafed}. The proof relies on a combinatorial algorithm that enumerates rooted directed trees that we call abundant. In the last part, we concentrate on the particular case of polyforms and polycubes, that we call \emph{saturated}, which is the family of fully leafed structures that maximize the ratio \mbox(numberofleaves)/\mbox(numberofcells)\mbox{(number of leaves)}/\mbox{ (number of cells)}. In the polyomino case, we present a bijection between the set of saturated tree-like polyominoes of size 4k+14k+1 and the set of tree-like polyominoes of size kk. We exhibit a similar bijection between the set of saturated tree-like polycubes of size 41k+2841k+28 and a family of polycubes, called 44-trees, of size 3k+23k+2.

Keywords

Cite

@article{arxiv.1803.09181,
  title  = {Saturated Fully Leafed Tree-Like Polyforms and Polycubes},
  author = {Blondin Massé Alexandre and de Carufel Julien and Goupil Alain},
  journal= {arXiv preprint arXiv:1803.09181},
  year   = {2018}
}
R2 v1 2026-06-23T01:04:06.160Z