Ants

Ants is a period-5 wick with standard form shown to the right. Beyond the standard form, there is a wide variety of other ants because that is a general form of patterns moving orthogonally, one cell per generation. For example, it is also possible for any ant to be displaced by one or two cells relative to either or both of its neighbouring ants. Dean Hickerson found fenceposts for both ends of this wick in October 1992 and February 1993.

Ants
<html><div class="rle"><div class="codebox"><div style="display:none;"><code></html>x = 44, y = 4, rule = B3/S23 2o3b2o3b2o3b2o3b2o3b2o3b2o3b2o3b2o$2b2o3b2o3b2o3b2o3b2o3b2o3b2o3b2o3b 2o$2b2o3b2o3b2o3b2o3b2o3b2o3b2o3b2o3b2o$2o3b2o3b2o3b2o3b2o3b2o3b2o3b2o 3b2o! #C [[ THUMBSIZE 2 THEME 6 GRID GRIDMAJOR 0 SUPPRESS THUMBLAUNCH ]] <nowiki></nowiki> <html></code></div></div><canvas width="200" height="300" style="margin-left:1px;"><noscript></html> <html></noscript></canvas></div></html>
Pattern type Wick
Period 5
Speed c
Discovered by Unknown
Year of discovery Unknown

Ants can be either wide or narrow while still maintaining the spatial (and hence temporal) periodicity 5; but they can also be much longer yet still retaining the same style of movement. There is a grammar, derived from de Bruijn diagrams, succintly encompassing the alternatives.

Longitudinal period 5 de Bruijn diagram

eight nodes encompass possible ant sections
de Bruijn diagram defining an ant grammar
width 5 longitudinal de Bruijn diagram
sample path with the zero node at both ends

This de Bruijn diagram has two major subdiagrams. On the left, the cycle ABC generates the classical ant stream. A detour through the self loop at Z provides parallel streams with arbitrary vertical spacing, which is possible because the ant's legs are only of length 2. The yellow box indicates a slip line along which adjacent streams could be displaced.

The linkage between cycles on the right side of the diagram is more complicated. Streams containing ants with legs of length three (or more) need a guard rail separating them, which is provided by the self loop at node G; taken by itself it generates the Zebra stripes agar. Equally with the free space, this node generates slip lines.

The loop DE taken in that order generates 4×3 ants which can snuggle next to each other without the guard rail, although DGE can include it every now and then. Including node F in the cycle yields the head of a 4×5 ant which requires the legs of the ant to its right to guide it.

Making the excursion EA, returning via BD, creates an intermixture wherein the classical ants can travel amongst ants from the right side, short legs alongside each other. Altogether any path through the diagram generates a phalanx of ants whose spatial period is 5 and which advance longitudinally one cell per generation - at light speed, if one wishes to say so.

In practice, an ant stream might terminate on the left, creating a wick; it is also possible to realign ants vertically. It requires transversal de Bruijn diagrams, and diagrams of different spatial periodicities to encompass all these variants; here we have examined only the one special case to show that ants can be foreseen, and that they occur in a large variety which nevertheless can be enumerated.

Quadfuse

On January 10, 1994, Alan Hensel noticed that if a single cell is removed from the back end of the trailing ant, it becomes a fuse with the peculiar property that its burning reaction grows quadratically.[1] This reaction is known as the quadfuse.

The quadfuse
Download RLE: click here
The quadfuse after burning
gollark: *needs extra monitor*
gollark: I prefer to write OSes in scratch.
gollark: -0·-1 KST.
gollark: Lignum: that works though it's rare.
gollark: What?

See also

References

This article is issued from Conwaylife. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.