A rule that
can become chaotic and possibly never stabilize, but very rarely for small soups.
Known spaceships (c/26d, 2c/10d, c/13o, c/13o):
Code: Select all
x = 44, y = 72, rule = B3-n56-c78/S3i4a5-i678
35bo$34b5o$33b7o$3o9bobob3o3bo10b7o$2bo8bo2bobobo3bo10b7o$3ob3o3bo3bob
obob3o11b7o$o3bo4bo4bobobobobo12b5o$3ob3obo5bob3ob3o13b3o13$36bo$10bob
3ob3o3bo12b5o$9bo4bobo5bo11b5o$2b3o3bo3b3ob3ob3o10b6o$2bo4bo4bo3bobobo
bo11b4o$2b3obo5b3ob3ob3o12b3o15$34bob2o$35b4o$34b6o$33b7o$33bobobobo$
33bobobobo$33bobobobo$12bobob3o14bobobobo$11bo2bo3bo14b7o$4b3o3bo3bob
3ob3o11b6o$4bo4bo4bo3bobobo12b4o$4b3obo5bob3ob3o11bob2o9$36bo$36b6o$
34b9o$34b10o$33b11o$33bob9o$33bob9o$13bob3o15b11o$12bo4bo16b10o$5b3o3b
o3b3o2b3o11b9o$5bo4bo6bo2bobo13b6o$5b3obo5b3o2b3o13bo!
Some higher-period volatile non-trivial oscs (p30, p62):
Code: Select all
x = 41, y = 25, rule = B3-n56-c78/S3i4a5-i678
2o9b2o$13o22bo$b5ob5o22b4o$b11o21b5o$b11o20b7o$b11o19b7o$bob7obo18b7o$
b11o19b5o$b11o19b4o$b11o21bo$b5ob5o$13o$2o9b2o6$5b3ob3o22b3ob3o$7bobob
o22bo5bo$b3ob3obobo18b3ob3ob3o$bobo3bobobo18bobobobobo$b3ob3ob3o18b3ob
3ob3o$bo28bo$bo28bo!
Known odd-period oscillators (P3,5,7,9):
Code: Select all
x = 52, y = 17, rule = B3-n56-c78/S3i4a5-i678
42b2o4b2o$41b10o$28b3o10b10o$16bo10b5o8bob8obo$b4o10b3o8b6o8bob8obo$6o
8b5o7b6o9b10o$b4o10b3o8b5o10b10o$bo2bo11bo10b3o12b2o4b2o5$b3o11b3o9b3o
15b3o$3bo11bo13bo15bobo$b3o11b3o11bo15b3o$3bo13bo11bo17bo$b3o11b3o11bo
15b3o!
P24 single dot sparkers exist:
Code: Select all
x = 9, y = 17, rule = B3-n56-c78/S3i4a5-i678
5bo$3b4o$b8o$b8o$b7o$7o$b6o$2b3obo$2b3obo$2b3obo$b6o$7o$b7o$b8o$b8o$3b4o$5bo!
Some more common-ish oscs
Code: Select all
x = 80, y = 16, rule = B3-n56-c78/S3i4a5-i678
76b2obo$17b2o53bob2ob2o$2b3o12b3o12b5obo13b3o18b7o$b5o10b4o11b7o13b6o
15b6obo$7o8b3o13b8o13b5o15b7o$b5o8b3o14b7o14b6o13bob6o$2b3o10bo16b5obo
15b3o14b7o$72b2ob2obo$71bob2o3$bob3o8bob3o14bobobo15bob3o15bob3o$bobob
o8bo3bo14bobobo15bobo17bobobo$bobobo8bob3o14bob3o15bob3o15bob3o$bobobo
8bobo16bo3bo15bobobo15bobobo$bob3o8bob3o14bo3bo15bob3o15bob3o!
As usual, more known objects are available on the Catagolue page:
https://catagolue.appspot.com/census/b3 ... 3i4a5-i678
Apgluxe refuses to search D2_x symmetry, getting stuck on the usual "Failed to detect periodic behaviour!", although I have yet to encounter any explosive / chaotic soups, even with larger soup sizes
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A neighboring rule (B3-n56-ce78/S3i4a5-i678) keeps the 2c/10d and the c/26d, but removes the funky c/13o's, but also adds some volatile high-period oscillators:
Code: Select all
x = 152, y = 25, rule = B3-n56-ce78/S3i4a5-i678
4b2obo19b5o16bo19bo20bo16b6o14b5o17bo$3b4obo17b6o14b4o17b4o14b4o16b7o
13b7o15b4o$2b6o17b7o13b6o15b5o13b5o15b8o12b8o14b5o$2b7o16bob5o12b7o14b
7o11b6o15b8o11b9o15b5o$3b6o18b5o13b7o12b7o12b6o15b8o11b9o15b4o$2bob4o
21b2o14b6o12b7o13b5o16b8o11b9o17bo$3bob2o21b2o16b4o14b5o14b4o17b7o12b
8o$47bo16b4o14bo21b6o13b7o$66bo57b5o12$3ob3ob3o13bob3ob3o12b3ob3o12b3o
b3o11b3ob3o15bobobobo13bobob3o14b3ob3o$2bobo3bobo13bo3bobobo12bobo3bo
12bo5bo11bo5bo15bobobobo13bobo3bo16bobobo$3ob3obobo13bob3obobo12b3ob3o
12b3ob3o11b3ob3o15b3ob3o13b3ob3o14b3ob3o$o5bobobo13bobo3bobo12bobobo
14bobobo15bobo19bo3bo15bobo16bo3bobo$3ob3ob3o13bob3ob3o12b3ob3o12b3ob
3o11b3ob3o17bo3bo15bob3o14b3ob3o!