Code: Select all
x = 588, y = 588, rule = B3/S12456
586bo$o584bo$bo582bo$2bo580bo$3bo578bo$4bo576bo$5bo574bo$6bo572bo$7bo
570bo$8bo568bo$9bo566bo$10bo564bo$11bo562bo$12bo560bo$13bo558bo$14bo
556bo$15bo554bo$16bo552bo$17bo550bo$18bo548bo$19bo546bo$20bo544bo$21bo
542bo$22bo540bo$23bo538bo$24bo536bo$25bo534bo$26bo532bo$27bo530bo$28bo
528bo$29bo526bo$30bo524bo$31bo522bo$32bo520bo$33bo518bo$34bo516bo$35bo
514bo$36bo512bo$37bo510bo$38bo508bo$39bo506bo$40bo504bo$41bo502bo$42bo
500bo$43bo498bo$44bo496bo$45bo494bo$46bo492bo$47bo490bo$48bo488bo$49bo
486bo$50bo484bo$51bo482bo$52bo480bo$53bo478bo$54bo476bo$55bo474bo$56bo
472bo$57bo470bo$58bo468bo$59bo466bo$60bo464bo$61bo462bo$62bo460bo$63bo
458bo$64bo456bo$65bo454bo$66bo452bo$67bo450bo$68bo448bo$69bo446bo$70bo
444bo$71bo442bo$72bo440bo$73bo438bo$74bo436bo$75bo434bo$76bo432bo$77bo
430bo$78bo428bo$79bo426bo$80bo424bo$81bo422bo$82bo420bo$83bo418bo$84bo
416bo$85bo414bo$86bo412bo$87bo410bo$88bo408bo$89bo406bo$90bo404bo$91bo
402bo$92bo400bo$93bo398bo$94bo396bo$95bo394bo$96bo392bo$97bo390bo$98bo
388bo$99bo386bo$100bo384bo$101bo382bo$102bo380bo$103bo378bo$104bo376bo
$105bo374bo$106bo372bo$107bo370bo$108bo368bo$109bo366bo$110bo364bo$
111bo362bo$112bo360bo$113bo358bo$114bo356bo$115bo354bo$116bo352bo$117b
o350bo$118bo348bo$119bo346bo$120bo344bo$121bo342bo$122bo340bo$123bo
338bo$124bo336bo$125bo334bo$126bo332bo$127bo330bo$128bo328bo$129bo326b
o$130bo324bo$131bo322bo$132bo320bo$133bo318bo$134bo316bo$135bo314bo$
136bo312bo$137bo310bo$138bo308bo$139bo306bo$140bo304bo$141bo302bo$142b
o300bo$143bo298bo$144bo296bo$145bo294bo$146bo292bo$147bo290bo$148bo
288bo$149bo286bo$150bo284bo$151bo282bo$152bo280bo$153bo278bo$154bo276b
o$155bo274bo$156bo272bo$157bo270bo$158bo268bo$159bo266bo$160bo264bo$
161bo262bo$162bo260bo$163bo258bo$164bo256bo$165bo254bo$166bo252bo$167b
o250bo$168bo248bo$169bo246bo$170bo244bo$171bo242bo$172bo240bo$173bo
238bo$174bo236bo$175bo234bo$176bo232bo$177bo230bo$178bo228bo$179bo226b
o$180bo224bo$181bo222bo$182bo220bo$183bo218bo$184bo216bo$185bo214bo$
186bo212bo$187bo210bo$188bo208bo$189bo206bo$190bo204bo$191bo202bo$192b
o200bo$193bo198bo$194bo196bo$195bo194bo$196bo192bo$197bo190bo$198bo
188bo$199bo186bo$200bo184bo$201bo182bo$202bo180bo$203bo178bo$204bo176b
o$205bo174bo$206bo172bo$207bo170bo$208bo168bo$209bo166bo$210bo164bo$
211bo162bo$212bo160bo$213bo158bo$214bo156bo$215bo154bo$216bo152bo$217b
o150bo$218bo148bo$219bo146bo$220bo144bo$221bo142bo$222bo140bo$223bo
138bo$224bo136bo$225bo134bo$226bo132bo$227bo130bo$228bo128bo$229bo126b
o$230bo124bo$231bo122bo$232bo120bo$233bo118bo$234bo116bo$235bo114bo$
236bo112bo$237bo110bo$238bo108bo$239bo106bo$240bo104bo$241bo102bo$242b
o100bo$243bo98bo$244bo96bo$245bo94bo$246bo92bo$247bo90bo$248bo88bo$
249bo86bo$250bo84bo$251bo82bo$252bo80bo$253bo78bo$254bo76bo$255bo74bo$
256bo72bo$257bo70bo$258bo68bo$259bo66bo$260bo64bo$261bo62bo$262bo60bo$
263bo58bo$264bo56bo$265bo54bo$266bo52bo$267bo50bo$268bo48bo$269bo46bo$
270bo44bo$271bo42bo$272bo40bo$273bo38bo$274bo36bo$275bo34bo$276bo32bo$
277bo30bo$278bo14b2o12bo$279bo13b3o5b6o$280b7o6bo2bo3bo5bo$280bo5bo6bo
3bobo3bo2bo$280bo2bo2b16o2bobo$280bobobob6o4b6obo2bo$280bo4bob4o6b4obo
3bo$280bo2b2obob2o8b2obob4o$281bob3obo12bob3o$282b5obo10bob4o$283b4o2b
ob6obo2b4o$282b4o4bo6bo4b3o$281bob2o4bobo4bobo4b2o$280bo2bo5bo2bo2bo2b
o5bo$279b2o2bo5bo3b2o3bo5b5o$279b5o5bo3b2o3bo5bo2b2o$283bo5bo2bo2bo2bo
5bo2bo$283b2o4bobo4bobo4b2obo$283b3o4bo6bo4b4o$283b4o2bob6obo2b4o$283b
4obo10bob5o$283b3obo12bob3obo$281b4obob2o8b2obob2o2bo$281bo3bob4o6b4ob
o4bo$281bo2bob6o4b6obobobo$281bobo2b16o2bo2bo$281bo2bo3bobo3bo6bo5bo$
281bo5bo3bo2bo6b7o$281b6o5b3o13bo$280bo12b2o14bo$279bo30bo$278bo32bo$
277bo34bo$276bo36bo$275bo38bo$274bo40bo$273bo42bo$272bo44bo$271bo46bo$
270bo48bo$269bo50bo$268bo52bo$267bo54bo$266bo56bo$265bo58bo$264bo60bo$
263bo62bo$262bo64bo$261bo66bo$260bo68bo$259bo70bo$258bo72bo$257bo74bo$
256bo76bo$255bo78bo$254bo80bo$253bo82bo$252bo84bo$251bo86bo$250bo88bo$
249bo90bo$248bo92bo$247bo94bo$246bo96bo$245bo98bo$244bo100bo$243bo102b
o$242bo104bo$241bo106bo$240bo108bo$239bo110bo$238bo112bo$237bo114bo$
236bo116bo$235bo118bo$234bo120bo$233bo122bo$232bo124bo$231bo126bo$230b
o128bo$229bo130bo$228bo132bo$227bo134bo$226bo136bo$225bo138bo$224bo
140bo$223bo142bo$222bo144bo$221bo146bo$220bo148bo$219bo150bo$218bo152b
o$217bo154bo$216bo156bo$215bo158bo$214bo160bo$213bo162bo$212bo164bo$
211bo166bo$210bo168bo$209bo170bo$208bo172bo$207bo174bo$206bo176bo$205b
o178bo$204bo180bo$203bo182bo$202bo184bo$201bo186bo$200bo188bo$199bo
190bo$198bo192bo$197bo194bo$196bo196bo$195bo198bo$194bo200bo$193bo202b
o$192bo204bo$191bo206bo$190bo208bo$189bo210bo$188bo212bo$187bo214bo$
186bo216bo$185bo218bo$184bo220bo$183bo222bo$182bo224bo$181bo226bo$180b
o228bo$179bo230bo$178bo232bo$177bo234bo$176bo236bo$175bo238bo$174bo
240bo$173bo242bo$172bo244bo$171bo246bo$170bo248bo$169bo250bo$168bo252b
o$167bo254bo$166bo256bo$165bo258bo$164bo260bo$163bo262bo$162bo264bo$
161bo266bo$160bo268bo$159bo270bo$158bo272bo$157bo274bo$156bo276bo$155b
o278bo$154bo280bo$153bo282bo$152bo284bo$151bo286bo$150bo288bo$149bo
290bo$148bo292bo$147bo294bo$146bo296bo$145bo298bo$144bo300bo$143bo302b
o$142bo304bo$141bo306bo$140bo308bo$139bo310bo$138bo312bo$137bo314bo$
136bo316bo$135bo318bo$134bo320bo$133bo322bo$132bo324bo$131bo326bo$130b
o328bo$129bo330bo$128bo332bo$127bo334bo$126bo336bo$125bo338bo$124bo
340bo$123bo342bo$122bo344bo$121bo346bo$120bo348bo$119bo350bo$118bo352b
o$117bo354bo$116bo356bo$115bo358bo$114bo360bo$113bo362bo$112bo364bo$
111bo366bo$110bo368bo$109bo370bo$108bo372bo$107bo374bo$106bo376bo$105b
o378bo$104bo380bo$103bo382bo$102bo384bo$101bo386bo$100bo388bo$99bo390b
o$98bo392bo$97bo394bo$96bo396bo$95bo398bo$94bo400bo$93bo402bo$92bo404b
o$91bo406bo$90bo408bo$89bo410bo$88bo412bo$87bo414bo$86bo416bo$85bo418b
o$84bo420bo$83bo422bo$82bo424bo$81bo426bo$80bo428bo$79bo430bo$78bo432b
o$77bo434bo$76bo436bo$75bo438bo$74bo440bo$73bo442bo$72bo444bo$71bo446b
o$70bo448bo$69bo450bo$68bo452bo$67bo454bo$66bo456bo$65bo458bo$64bo460b
o$63bo462bo$62bo464bo$61bo466bo$60bo468bo$59bo470bo$58bo472bo$57bo474b
o$56bo476bo$55bo478bo$54bo480bo$53bo482bo$52bo484bo$51bo486bo$50bo488b
o$49bo490bo$48bo492bo$47bo494bo$46bo496bo$45bo498bo$44bo500bo$43bo502b
o$42bo504bo$41bo506bo$40bo508bo$39bo510bo$38bo512bo$37bo514bo$36bo516b
o$35bo518bo$34bo520bo$33bo522bo$32bo524bo$31bo526bo$30bo528bo$29bo530b
o$28bo532bo$27bo534bo$26bo536bo$25bo538bo$24bo540bo$23bo542bo$22bo544b
o$21bo546bo$20bo548bo$19bo550bo$18bo552bo$17bo554bo$16bo556bo$15bo558b
o$14bo560bo$13bo562bo$12bo564bo$11bo566bo$10bo568bo$9bo570bo$8bo572bo$
7bo574bo$6bo576bo$5bo578bo$4bo580bo$3bo582bo$2bo584bo$bo!
If you make the clockwise pattern, and connect on edge with the uploaded one (four of them connected), you'd have a central counterclockwise, surrounded by 4 clockwise. You'd then make a larger grid of them, so the picture of them looks like a chain link fence, of alternating clockwise, counterclockwise rotation.
That's one large square. Then you make a grid of those larger squares where they are close to each other in a grid of those large squares (composed of those intersecting lines and central rotating square). Then you have to do something different. If you try to make a grid of larger squares composed of the aforementioned now smaller squares from that large square, the edge doesn't zig zag large. So you have to make the larger grid of squares like the blancmange function on edge, so it's still a square but like the blancmange function of saw tooth, so that each triangle in the saw tooth on the edge, is composed of smaller saw teeth.
Now when zoomed all the way out, you see what appears to be a grid of white squares, where it's white square, skip a square, white square, skip a square, then skip a row beneath it completely, and do white square, skip a square, etc.
What happens is, that since the original pattern found here: https://www.youtube.com/watch?v=XL7kGMP03D8&t=5s is symmetric in the grid of repeating images connected at the diagonals of that pattern, the vortex at the center of each pattern doesn't disintegrate, and they mesh well. If you explode that pattern against something else, the central vortex, or the repeating pattern at the very center in that youtube link would disintegrate, but it doesn't disintegrate in the grid. When zoomed all the way out in the final grid of squares, you'd see the random appearance at the four corners of a ball (due to the video compression, an artefact of phantom squares, which only appears in the uploaded video), and as each of the original pattern explodes out, the ball will then collapse down between the teeth, and a smaller ball will shoot down between the tubes. The ball is being phase shifted, and it's a boson sampler. The smaller spaces between the squares percolate out (all at once) to the most zoomed out squares (and only due to video compression and the presence of the lighter colored phantom squares you can see along the diagonal as it explodes out in the youtube link, and also along the edge of the automata in the black area beginning at 0:10).
And it also can be considered coupled vortexed laser cavities in that on the edge at the largest zoom out, two pointy triangles right next to each other, along the inside walls of those two pointy triangles, a flow shoots down between the two triangles in the next smaller fractal grid, and half-donuts appear on the edge of the blancmanged function pair of triangles. At each half donut poking out of the triangle (and they're from the phantom squares), the presence of the donuts is an entanglement. But viewed as a boson sampler, the presence of randomly occurring balls, that move down the spaces between squares are being phase shifted, and they can be sampled on the edge in a boson sampler computer.
I thought I'd post it, and I'm going to start working on it. It shouldn't take too long, since repeated ctrl-A, ctrl-S, ctrl-C, ctrol-V of smaller collections of the original pattern, can then be copied and pasted as they grow larger.