Activity 1-5: Kites and Darts

Activity 1-5: Kites and Darts

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A tessellation is called periodic if you can lift it up and shift it so that it sits exactly on top of itself again.

Sometimes a periodic tiling can be tweaked so that it becomes non-periodic.

Exactly the same tiles, but non-periodic this time.

The question arises – is there a tile or a set of tiles so that EVERY infinite tiling of the plane they make is non-periodic?

Roger Penrose came up with two tiles that fit this criteria in 1974.

He called them ‘the Kite and the Dart’.

Of course, kites and darts can be used on their own and together to generate periodic tilings.

But… the matching rules for the tiles stop these tilings from counting.

The matching rule is this:the tiles can only be placed

with the Hs together and the Ts together.

The only ways that tiles can legally meet at a point are as follows:

The H-T rule can be enforced using red and green lines as above, or by using bumps and dents on the tiles.

Some of these configurations ‘force’ other tiles around them.

StarAce Sun

JackKing

Queen Deuce

Task: have a play with some Kites and Darts, and get a feel for how they tile together.

A sheet of tiles to cut up can be found here.

With these matching rules, it turns out thatevery infinite tiling that these tiles make is non-periodic.

Task: find each

of the seven ways

that tiles can meet at a point

in this tiling.

Note: every point in the diagram

is in an ace.

Note too that every point in the tiling is in a cartwheel shape.

Sometimes Kite and Dart tilings

demonstrate striking 5-fold and 10-fold symmetry.

The red shape at the centre here is called ‘Batman’.

There are many remarkable facts about Kite and Dart tilings.

There are an infinite number of them,

and they are always non-periodic.

In any infinite Kite and Dart tiling, the ratio of Kites to Darts is to 1,

where is the Golden Ratio.

You notice in this tiling it has been possible to colour the tiles

with only three colours so that no two tiles of the same colour

share an edge. Is this possible

in any Kite and Dart tiling?

Notice how the Darts ‘hold hands’ in this tiling (and every tiling) to form rings.

You can ‘inflate’ or ‘deflate’ any Kite and Dart tiling to give another Kite and Dart tiling with bigger or smaller tiles.

This shows that the Penrose tiling has a scaling self-similarity, and so can be thought of as a fractal. Wikipedia

To deflate, add these lines

on the leftto every Kite and Dart in

your tiling. Your tiles

will get smaller,but they will

all remain Kitesand Darts!

Deflate

Deflate

Deflate

How do we inflate a tiling?

Cut every dart in half, and then glue together all

the short edges of the original pieces.

Inflate

One consequence of the inflation/deflation propertyis that any finite Kite and Dart tiling must appear

in any infinite Kite and Dart tiling.

We can prove now that every Kite and Dart tiling is non-periodic.

Suppose we have a periodic such infinite tiling, with translation vector s.

Inflate or deflate twice, and you get backto the tiling you started with (scaled differently).

Now simply inflate the diagram until s lies within a single tile.Now clearly periodicity is impossible.

All inflations and deflations of the tilingmust also be periodic period s.

If we start with either the Star (left) or the Sun (right) and insist on perfect five-fold symmetry,

then every tile is forced as above...

If we inflate or deflate one of these tilings, we get the other.

There are other pairs of shapes that always give non-periodic tilings too.

This picture shows Roger Penrose on a tiled floor

at Texas A&M university,showing an

non-periodic tessellationemploying two rhombuses

that he discoveredafter the Kite and Dart.

One last question;is there a single tile

that only tiles non-periodically?

With thanks to:Roger Penrose.

Wikipedia, for a brilliant article on Penrose tilings.John Conway for his talk on Kites and Darts back in 1979.

Carom is written by Jonny Griffiths, mail@jonny-griffiths.net