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Let $T$ be a polygon which tiles the plane. For an instance of $T$ (mirrored or not), call the set of its translates a position of $T$.

My question:

  • How many different positions can occur in a tiling $\mathcal T$ of the plane?

Call this number $p(\mathcal T)$ and define for a tile $p(T):=\max_{\mathcal T} p(\mathcal T)$.
For example, the Voderberg tile has $p(T)\ge60$ and supposedly $p(T)=60$.
But is it even clear that $p(T)$ is always finite? Theoretically a tile containing irrational angles might occur in infinitely many positions, or is there an easy combinatorial argument against that?

A related probably easier question arises if we require $T$ to be convex.

  • For convex tiles $T$, is $p(T)=12$ best possible?

The picture shows a tiling of a certain pentagon with $p(\mathcal T)=12$, where the $12$ marked tiles form a fundamental domain.
It comes from the bottom right tiling of this picture quoted here. enter image description here.
Are there similar constructions, possibly spiral tilings, with bigger $p(\mathcal T)$?

Note that the Voderberg tilings cannot be reduced to tilings with isoceles 12-degree triangles. But in fact, talking about triangles: by subdividing the regular hexagon paving, we see that the triangle $T$ with angles $30°,60°,90°$ has already $p(T)=12$, so there is no need for "sophisticated" tilings as the above to illustrate the (supposedly) extremal case. But I'll keep the picture because of the funny symmetries (with two privileged "directions") which that particular tiling exhibits.

  • And of course we can ask similar questions for tilings in higher dimensions.
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    $\begingroup$ In the pinwheel tiling, the tile appears in infinitely many different positions. $\endgroup$ Dec 20, 2017 at 22:45
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    $\begingroup$ For higher dimensions I think that the aperiodic Schmitt–Conway–Danzer tile answers both questions you asked. The screw-periodicity gives infinitely many orientations, while the periodicity of each "layer" gives that each orientation appear in infinitely many positions. $\endgroup$
    – Nick S
    Jan 9, 2018 at 23:11

1 Answer 1

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Infinitely many, even for a triangle.

Let $T$ be the "Pythagorean" triangle with sides of length $3,4,5$. First, tile the $3\times 4$ rectangle $R$ by two copies of $T$. Tile the $60\times 60$ square $Q_1$ with $R$. Then, attach a $12$-times dilated copy of $T$ to each side of the square $Q_1$, forming a square $Q'_2$.

picture of $Q'_2$

Tile a square $Q_2$ with $25$ copies of $Q'_2$. Repeat these two steps (attaching dilated copies of $T$ to $Q_i$ and multiplying the resulting square $5$ times in each direction).

$Q'_3$$Q'_4$

In each iteration we get one new rotation of $T$, assuming we tile only with rotated copies of $T$, since each square $Q_{i+1}$ is rotated by $\mathrm{arcsin}(3/5)$ with respect to $Q_i$, and this angle is irrational (https://arxiv.org/abs/1006.2938).

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    $\begingroup$ Simple and beautiful. $\endgroup$ Dec 21, 2017 at 2:03
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    $\begingroup$ Very nice, moreover this construction uses only rotations, no reflections. And similar constructions work of course for any Pythagorean triangle (i.e. right triangle with rational sides). $\endgroup$
    – Wolfgang
    Dec 21, 2017 at 9:29
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    $\begingroup$ I added some illustrations, hope that's OK. $\endgroup$
    – j.c.
    Jan 9, 2018 at 22:13

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