From mono- + tiling. <span class="searchmatch">monotiling</span> (plural <span class="searchmatch">monotilings</span>) (mathematics) A tiling using a <span class="searchmatch">monotile</span>...
<span class="searchmatch">monotilings</span> plural of <span class="searchmatch">monotiling</span> 2015, Nikita Moriakov, “Computable Følner <span class="searchmatch">monotilings</span> and a theorem of Brudno II”, in arXiv[1]: For every d ∈ N {\displaystyle...
<span class="searchmatch">monotiles</span> plural of <span class="searchmatch">monotile</span>...
original on 2023-04-04: An aperiodic <span class="searchmatch">monotile</span> never repeats a formation, no matter how long the pattern. <span class="searchmatch">monotiling</span> Siobhan Roberts (2023 March 28) “Elusive...
From mono- (“one”) + -hedral. monohedral (not comparable) (mathematics, of a tessellation) Having exactly one prototile. monohedrally <span class="searchmatch">monotile</span>...
of non-congruent shapes from which a larger set of shapes, some of which may be congruent, can be produced. <span class="searchmatch">monotile</span> Prototile on Wikipedia.Wikipedia...
or “one stone” — more loosely, “one tile” or “one shape.”) aperiodic, <span class="searchmatch">monotiling</span>, tessellation ^ "Klaassen, Bernhard (2022) “Forcing nonperiodic tilings...
ignorance is further illustrated by the fact that we do not know all the different shapes of convex pentagons which will tile the plane monohedrally. <span class="searchmatch">monotile</span>...