Squarability of rectangle arrangements
Abstract
We study when an arrangement of axis-aligned rectangles can be transformed into an arrangement of axis-aligned squares in while preserving its structure. We found a counterexample to the conjecture of J. Klawitter, M. N\"ollenburg and T. Ueckerdt whether all arrangements without crossing and side-piercing can be squared. Our counterexample also works in a more general case when we only need to preserve the intersection graph and we forbid side-piercing between squares. We also show counterexamples for transforming box arrangements into combinatorially equivalent hypercube arrangements. Finally, we introduce a linear program deciding whether an arrangement of rectangles can be squared in a more restrictive version where the order of all sides is preserved.
Cite
@article{arxiv.1611.07073,
title = {Squarability of rectangle arrangements},
author = {Matěj Konečný and Stanislav Kučera and Michal Opler and Jakub Sosnovec and Štěpán Šimsa and Martin Töpfer},
journal= {arXiv preprint arXiv:1611.07073},
year = {2016}
}