Talk:Binary tiling

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Does anyone have a view of this tiling in the Poincaré disk model? I think this would illustrate better the fact that the tiles are not polygons. — Preceding unsigned comment added by TheKing44 (talk • contribs) 21:53, 28 January 2018 (UTC)[reply]

There's one in the Penrose article, but we can't just copy it directly and I don't think it does what you want it to do. (The horocycle edges are drawn as circular arcs, just as straight lines in the disk model would be, but that's not different from what we have now where the horocycles are horizontal lines. Anyone who knows enough about the hyperbolic plane to know that the circular arcs of the disk model are the wrong direction to be straight lines would also know that the horizontal lines in the halfplane model are the wrong direction to be straight lines.) —David Eppstein (talk) 22:32, 28 January 2018 (UTC)[reply]

@David Eppstein: Well, maybe a view in which the horocycles are replaced by straight edges would be useful (to demonstrate what the difference looks like). (In particular, the edges would form a bunch of regular aperigons.)

Ok, done. —David Eppstein (talk) 01:55, 29 January 2018 (UTC)[reply]

Nice! It would still be informative to see the shape of a single tile drawn "centered" on a Poincaré disk model. Then it would be more clear that the bottom pair edges are the same length as the top one. Tom Ruen (talk) 01:58, 29 January 2018 (UTC)[reply]

It's not a regular polygon, so I'm not sure what "centered" means here.

The binary tiling is related to the one in figure 3 of this paper about a strongly aperiodic tiling of the hyperbolic plane (in particular, it also uses rectangles in the half-plane model, and they have a picture of the Binary tiling in Figure 1). Should we talk about in the article somehow?