B3/S12 (Flock)

[muzik]

An agar:

Code: Select all

x = 94, y = 94, rule = B3/S12
23b2o$23b2ob2o$26b2ob2o$22b2o5b2ob2o$22b2ob2o5b2ob2o$25b2ob2o5b2ob2o$
21b2o5b2ob2o5b2ob2o$21b2ob2o5b2ob2o5b2ob2o$24b2ob2o5b2ob2o5b2ob2o$20b
2o5b2ob2o5b2ob2o5b2ob2o$20b2ob2o5b2ob2o5b2ob2o5b2ob2o$23b2ob2o5b2ob2o
5b2ob2o5b2ob2o$19b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$19b2ob2o5b2ob2o5b2ob
2o5b2ob2o5b2ob2o$22b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$18b2o5b2ob2o5b2o
b2o5b2ob2o5b2ob2o5b2ob2o$18b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$
21b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$17b2o5b2ob2o5b2ob2o5b2ob2o
5b2ob2o5b2ob2o5b2ob2o$17b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob
2o$20b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$16b2o5b2ob2o5b2o
b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$16b2ob2o5b2ob2o5b2ob2o5b2ob2o5b
2ob2o5b2ob2o5b2ob2o5b2ob2o$19b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o
5b2ob2o5b2ob2o$15b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o
5b2o$15b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$18b2ob
2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$14b2o5b2ob2o5b2ob
2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o$14b2ob2o5b2ob2o5b2ob2o5b2ob
2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$17b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b
2ob2o5b2ob2o5b2ob2o$13b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b
2ob2o5b2o$13b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$
16b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$12b2o5b2ob2o
5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o$12b2ob2o5b2ob2o5b2ob2o
5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$15b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob
2o5b2ob2o5b2ob2o5b2ob2o$11b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob
2o5b2ob2o5b2o$11b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob
2o$14b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$10b2o5b2o
b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o$10b2ob2o5b2ob2o5b2ob
2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$13b2ob2o5b2ob2o5b2ob2o5b2ob2o5b
2ob2o5b2ob2o5b2ob2o5b2ob2o$9b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o
b2o5b2ob2o5b2o$9b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob
2o$12b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$8b2o5b2ob
2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o$8b2ob2o5b2ob2o5b2ob2o
5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$11b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob
2o5b2ob2o5b2ob2o5b2ob2o$7b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o
5b2ob2o5b2o$7b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$
10b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$6b2o5b2ob2o
5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o$6b2ob2o5b2ob2o5b2ob2o5b
2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$9b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o
5b2ob2o5b2ob2o5b2ob2o$5b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b
2ob2o5b2o$5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$8b
2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$4b2o5b2ob2o5b2o
b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o$4b2ob2o5b2ob2o5b2ob2o5b2ob
2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$7b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o
b2o5b2ob2o5b2ob2o$3b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob
2o5b2o$3b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$6b2ob
2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$2b2o5b2ob2o5b2ob2o
5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o$2b2ob2o5b2ob2o5b2ob2o5b2ob2o5b
2ob2o5b2ob2o5b2ob2o5b2ob2o$5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o
5b2ob2o5b2ob2o$b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b
2o$b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$4b2ob2o5b2o
b2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$2o5b2ob2o5b2ob2o5b2ob2o
5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o$2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o
b2o5b2ob2o5b2ob2o$3b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b
2ob2o$6b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o$9b2ob2o5b
2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$12b2ob2o5b2ob2o5b2ob2o5b2ob2o
5b2ob2o5b2ob2o5b2ob2o$15b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o$
18b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$21b2ob2o5b2ob2o5b2ob2o5b2o
b2o5b2ob2o5b2ob2o$24b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2o$27b2ob2o5b
2ob2o5b2ob2o5b2ob2o5b2ob2o$30b2ob2o5b2ob2o5b2ob2o5b2ob2o5b2ob2o$33b2ob
2o5b2ob2o5b2ob2o5b2ob2o5b2o$36b2ob2o5b2ob2o5b2ob2o5b2ob2o$39b2ob2o5b2o
b2o5b2ob2o5b2ob2o$42b2ob2o5b2ob2o5b2ob2o5b2o$45b2ob2o5b2ob2o5b2ob2o$
48b2ob2o5b2ob2o5b2ob2o$51b2ob2o5b2ob2o5b2o$54b2ob2o5b2ob2o$57b2ob2o5b
2ob2o$60b2ob2o5b2o$63b2ob2o$66b2ob2o$69b2o!

"vic"?

Code: Select all

x = 16, y = 16, rule = B3/S12
2obobo3bo5bo$b6o2bobo2bo$5o5bob2obo$2obob5o2bo$ob2o5bob3o$b2o2bo3b3o3b
o$obob2o2bo2bo$ob7ob2o3bo$o5bo3b2obobo$b3o3b2obo2bo$ob2o2bo2bob3obo$o
4b3o4b4o$2o3b4obo3b2o$2bobobo3bob2obo$obo5bobo2b3o$b2ob7ob2o!

[drc]

"vic"?

No obviously It says ↄlv, duuuuuuuuh.

[muzik]

⸮тσнW

[drc]

wonʞ ƚ'nob ylƚƨɘnoʜ I

[muzik]

Are there any nontrivial p63 oscillators that can be built from these?

Code: Select all

x = 23, y = 8, rule = B3/S12
o2bo14bo$o3bo12b3o$14b3ob2o$o17bo2bo$o3b3o8bo2bo$17b2ob3o$5b2o10b3o$
18bo!

[LaundryPizza03]

It seems that a c/7o is likely to exist. The longest partials to date are:

Code: Select all

x = 41, y = 50, rule = B3/S12
8bo16b2o10b2o$7b3o14bo14bo$6bobobo17bo6bo$8bo15bo4bo4bo4bo$4bo3bo3bo$
4bobobobobo$5b3ob3o13bo3bo4bo3bo$6b2ob2o15b3o2b2o2b3o$3bo9bo15bo4bo$3b
2o2bobo2b2o14b2o4b2o$4bo7bo14b3o4b3o$7bobo20bo2bo$4bo7bo16b2o2b2o$5bo
5bo$29bo4bo$7b3o18b2o4b2o$7bobo16bobo6bobo$6bo3bo15bo2bo4bo2bo$5b7o18b
o2bo$4bo7bo12bobo3b2o3bobo$3bo3bobo3bo10b4ob2o2b2ob4o$7bobo17bobo4bobo
$3bo2bo3bo2bo9bob2o2b6o2b2obo$8bo16bo4b4o4bo$7bobo20b4o$6b2ob2o15b2obo
4bob2o$3bob2o3b2obo11b3o2bo2bo2b3o$2bo2bo5bo2bo10bo12bo$3bob2o3b2obo
11bo12bo$3b5ob5o10bo14bo$4b2o5b2o16b6o$5b3ob3o13b4o2b2o2b4o$bobo9bobo
7bo2bobo6bobo2bo$bobo9bobo10bo2bo4bo2bo$24bo4bo4bo4bo$bo2bo3bo3bo2bo$
7bobo$o4b2o3b2o4bo$o3b3o3b3o3bo$bob2obo3bob2obo$6b2ob2o$4b3obob3o$3bo
2bobobo2bo$2b5o3b5o2$o3bobo3bobo3bo$o3bob2ob2obo3bo$b2obo2bobo2bob2o$
5b2o3b2o$ob2o2bo3bo2b2obo!

[LaundryPizza03]

New 2c/5o, the fifth unique speed in this rule.

Code: Select all

x = 34, y = 42, rule = B3/S12
16b2o$14bo4bo$13bo6bo$13bo6bo$7bo6bo4bo6bo$4b3ob3o4bo2bo4b3ob3o$6b2o3b
o2b6o2bo3b2o$7bo3bob2o4b2obo3bo$5b6o4bo2bo4b6o$5b2o8bo2bo8b2o$6b2o18b
2o$5b2ob2o4bo4bo4b2ob2o$9bo3b3o2b3o3bo$7bo2b2ob3o2b3ob2o2bo$12bobo4bob
o$8b2o3bo6bo3b2o$5b2o3b2obo6bob2o3b2o$6b2o2b2obo6bob2o2b2o$7bo4b2o6b2o
4bo$8bo5bo4bo5bo$7bo7b4o7bo$7b5o3bo2bo3b5o$8b3o12b3o$8bo3bo8bo3bo$4bo
3b2o2bo8bo2b2o3bo$2bo2bo2b2obo10bob2o2bo2bo$bo30bo$bo30bo$2bo2b2ob3o
12b3ob2o2bo$3bo5b2o12b2o5bo$b2ob2o22b2ob2o$o2bob3obo2bo8bo2bob3obo2bo$
3o3bob2obo2b6o2bob2obo3b3o$8b2o4bo4bo4b2o$8bo5b2o2b2o5bo$11b4o4b4o$14b
o4bo$9bo2b2o6b2o2bo$8bo16bo2$7b2o16b2o$7b2o16b2o!

[LaundryPizza03]

Possible 2c/6o partial.

Code: Select all

x = 36, y = 35, rule = B3/S12
17b2o$15bo4bo$14bo6bo2$12b2obo4bob2o$11b3o3b2o3b3o$10b2ob3o4b3ob2o$5bo
bob3o12b3obobo$4bo3b2o6bo2bo6b2o3bo$7bobo5bo4bo5bobo$3bo2bo2bo3b2o2b2o
2b2o3bo2bo2bo$3bobo4bo3bo6bo3bo4bobo$9bo4bobo2bobo4bo$8b3o3bo6bo3b3o$
4b2o6bo10bo6b2o$13b10o$6bobo3b2o8b2o3bobo$6b6o3bo4bo3b6o$6bo2bo5bo4bo
5bo2bo$9bo6b4o6bo$5bo3bo2b2o8b2o2bo3bo$4bo4bobo2bo6bo2bobo4bo$7b2o2bo
12bo2b2o$7bo3bobo8bobo3bo$4bobo4b2o2b6o2b2o4bobo$2bo2b3o4b3o6b3o4b3o2b
o$2bo3b2o2bobob2o4b2obobo2b2o3bo$bo2bobo3bo3bo2b2o2bo3bo3bobo2bo$b2obo
bo3bo4b2o2b2o4bo3bobob2o$8b2o3bo3b2o3bo3b2o$2bobobo2b2o2bo8bo2b2o2bobo
bo$b3o2b2o6bo6bo6b2o2b3o$5b3o3b3ob6ob3o3b3o$o4b3obo2b2o3b2o3b2o2bob3o
4bo$2b3o3bo6b2o2b2o6bo3b3o!

The longest partials I obtained for c/3o (unsimplified) were:

Code: Select all

x = 48, y = 20, rule = B3/S12
23b2o$21bo4bo$19b3o4b3o$18bo10bo$15b2obo2bob2obo2bob2o$13bo3bo12bo3bo$
12bo3b4obo4bob4o3bo$16bo3bo6bo3bo$11bobo2bo3b8o3bo2bobo$8bo4bobo3b2o6b
2o3bobo4bo$6b2ob3ob3o2bo10bo2b3ob3ob2o$4bobo3bob3o3bo4b2o4bo3b3obo3bob
o$3b2obo2b2o7bo2b2o2b2o2bo7b2o2bob2o$2bo3bo4bobo3b4obo2bob4o3bobo4bo3b
o$5b2o34b2o$b3o2bo2bo2b2obo3bo8bo3bob2o2bo2bo2b3o$b2o5b4o10bo2bo10b4o
5b2o$obo3bobo2b2obobo3bobo2bobo3bobob2o2bobo3bobo$2b3obo11bobo6bobo11b
ob3o$o5bo6b2o3bobo6bobo3b2o6bo5bo!

Code: Select all

x = 26, y = 19, rule = B3/S12
18b2o$16bo3bo$8bo5b3o3bob2o$7b3o3bo7bo$6b2o8bo5b2o$4b2o3bobobo2b2o5b2o
$3bo9b4o6bobo$10b2ob5o3bo$4b2o6bo5bobo2bo$5b4o2bo7bobo3bo$2bobobo3b3o
4bo3b2ob2o$bobob2o2b2o3bo2b2o2bo$4bobo9b2o5bo$2bo5bobo3bo2bo$b6o3bo2bo
$4obo4b2o5bob2o$bo3bo2bo3b2o2bo5bo$obo4bo3bo2b2o2b2o3bo$3bobo2b2obo3bo
bobo!

but I have not checked any seedcolumns other than 00 for even symmetry.

EDIT:

Code: Select all

x = 27, y = 23, rule = B3/S12
17b2o$15bo3bo$13b3o3bob2o$12bo7bo$15b2o4b2o$11bo2b4o4b2o$9bobo2bob3o2b
o2bo$8bo3b3o2bo6bo$7b2o3bo$4b2o3bo6bo4b2ob2o$7bo2bob3o5bo2b4o$11b2o6bo
3b3o$4b4o3b2o8b2o$4bo6bobo3b2o4bo$9bo6bo4b2o$3bob5o2bo3b2obo2b2o$2b4ob
2o10b3o2bo$2bo5bo6b2o3bo$o3b2o8b2obo6bo$bo7bo5bo3b2o$2bo2b2obo5bo5b3ob
o$2ob3obo2b2ob2o3bo5bo$o5bo3b2o2bo3bobo3b2o!

[lordlouckster]

New 2c/5o, the fifth unique speed in this rule.

Code: Select all

x = 34, y = 42, rule = B3/S12
16b2o$14bo4bo$13bo6bo$13bo6bo$7bo6bo4bo6bo$4b3ob3o4bo2bo4b3ob3o$6b2o3b
o2b6o2bo3b2o$7bo3bob2o4b2obo3bo$5b6o4bo2bo4b6o$5b2o8bo2bo8b2o$6b2o18b
2o$5b2ob2o4bo4bo4b2ob2o$9bo3b3o2b3o3bo$7bo2b2ob3o2b3ob2o2bo$12bobo4bob
o$8b2o3bo6bo3b2o$5b2o3b2obo6bob2o3b2o$6b2o2b2obo6bob2o2b2o$7bo4b2o6b2o
4bo$8bo5bo4bo5bo$7bo7b4o7bo$7b5o3bo2bo3b5o$8b3o12b3o$8bo3bo8bo3bo$4bo
3b2o2bo8bo2b2o3bo$2bo2bo2b2obo10bob2o2bo2bo$bo30bo$bo30bo$2bo2b2ob3o
12b3ob2o2bo$3bo5b2o12b2o5bo$b2ob2o22b2ob2o$o2bob3obo2bo8bo2bob3obo2bo$
3o3bob2obo2b6o2bob2obo3b3o$8b2o4bo4bo4b2o$8bo5b2o2b2o5bo$11b4o4b4o$14b
o4bo$9bo2b2o6b2o2bo$8bo16bo2$7b2o16b2o$7b2o16b2o!

c/4o, c/5o, 2c/8d, 2c/5o, what's the fifth?

[LaundryPizza03]

New 2c/5o, the fifth unique speed in this rule.

Code: Select all

x = 34, y = 42, rule = B3/S12
16b2o$14bo4bo$13bo6bo$13bo6bo$7bo6bo4bo6bo$4b3ob3o4bo2bo4b3ob3o$6b2o3b
o2b6o2bo3b2o$7bo3bob2o4b2obo3bo$5b6o4bo2bo4b6o$5b2o8bo2bo8b2o$6b2o18b
2o$5b2ob2o4bo4bo4b2ob2o$9bo3b3o2b3o3bo$7bo2b2ob3o2b3ob2o2bo$12bobo4bob
o$8b2o3bo6bo3b2o$5b2o3b2obo6bob2o3b2o$6b2o2b2obo6bob2o2b2o$7bo4b2o6b2o
4bo$8bo5bo4bo5bo$7bo7b4o7bo$7b5o3bo2bo3b5o$8b3o12b3o$8bo3bo8bo3bo$4bo
3b2o2bo8bo2b2o3bo$2bo2bo2b2obo10bob2o2bo2bo$bo30bo$bo30bo$2bo2b2ob3o
12b3ob2o2bo$3bo5b2o12b2o5bo$b2ob2o22b2ob2o$o2bob3obo2bo8bo2bob3obo2bo$
3o3bob2obo2b6o2bob2obo3b3o$8b2o4bo4bo4b2o$8bo5b2o2b2o5bo$11b4o4b4o$14b
o4bo$9bo2b2o6b2o2bo$8bo16bo2$7b2o16b2o$7b2o16b2o!

c/4o, c/5o, 2c/8d, 2c/5o, what's the fifth?

You're right, I double-counted c/4o by mistake.

[muzik]

LCM oscillators tend to be much harder to create in this rule due to the lack of particularly strong sparkers arising from the existence of S1. Goat Flock gets away with it due to B2n, which has resulted in many LCMs occurring naturally, but here they're hard to come by.

Here's a period-28:

Code: Select all

x = 14, y = 14, rule = B3/S12
3bo$3b3o$o2b2obo$o2b2obo$3b3o$3bo$6bo2bo$9bo$5bo3bo$6b3o2bo$7bo2b3o$9b
o3bo$9bo$9bo2bo!

Period-44:

Code: Select all

x = 16, y = 22, rule = B3/S12
11bo$9b3o$8bob2o2bo$8bob2o2bo$9b3o$11bo$6bobo2$6bo$6bo2$7b2o$ob2o4bo$
5bo3b2o4bo$o4b2o3bo$7bo4b2obo$7b2o2$9bo$9bo2$7bobo!

Interaction between two p4s:

Code: Select all

x = 10, y = 9, rule = B3/S12
3bo$3b3o$o2b2obo$o2b2obo$3b3o$3bo$6bo$9bo$6b4o!

Interaction between the Tetris shuttle and the p7:

Code: Select all

x = 12, y = 14, rule = B3/S12
8bo$5bo2bo2bo$5b4o2bo$7b2o2$4bobo$3bo$4bo2bo$5b3o2$3o$o2bo$4bo$bobo!

The period-9 oscillator's sparks do not seem accessible enough for any sort of catalysis like shown here.

[C_R_116]

Another agar:

Code: Select all

x = 132, y = 159, rule = B3/S12
17$70bo$70b3o$66bo4b3o$66b3o4bo$62bo4b3obo$62b3o4bob3o$58bo4b3obo4b3o$
58b3o4bob3o4bo$54bo4b3obo4b3obo$54b3o4bob3o4bob3o$50bo4b3obo4b3obo4b3o
$50b3o4bob3o4bob3o4bo$46bo4b3obo4b3obo4b3obo$46b3o4bob3o4bob3o4bob3o$
42bo4b3obo4b3obo4b3obo4b3o$42b3o4bob3o4bob3o4bob3o4bo$38bo4b3obo4b3obo
4b3obo4b3obo$38b3o4bob3o4bob3o4bob3o4bob3o$34bo4b3obo4b3obo4b3obo4b3ob
o4b3o$34b3o4bob3o4bob3o4bob3o4bob3o4bo$30bo4b3obo4b3obo4b3obo4b3obo4b
3obo$30b3o4bob3o4bob3o4bob3o4bob3o4bob3o$26bo4b3obo4b3obo4b3obo4b3obo
4b3obo4b3o$26b3o4bob3o4bob3o4bob3o4bob3o4bob3o4bo$22bo4b3obo4b3obo4b3o
bo4b3obo4b3obo4b3obo$22b3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o$18bo4b
3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3o$18b3o4bob3o4bob3o4bob3o4bob3o4b
ob3o4bob3o4bo$14bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo$14b3o4bob
3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o$10bo4b3obo4b3obo4b3obo4b3obo4b
3obo4b3obo4b3obo4b3o$10b3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4b
o$6bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo$6b3o4bob3o4bob3o
4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o$7b3obo4b3obo4b3obo4b3obo4b3obo4b
3obo4b3obo4b3obo4b3o$9bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o
4bo$7bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo$7b3o4bob3o4bob
3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o$8b3obo4b3obo4b3obo4b3obo4b3obo
4b3obo4b3obo4b3obo4b3o$10bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob
3o4bo$8bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo$8b3o4bob3o4b
ob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o$9b3obo4b3obo4b3obo4b3obo4b3ob
o4b3obo4b3obo4b3obo4b3o$11bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bo
b3o4bo$9bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo$9b3o4bob3o
4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o$10b3obo4b3obo4b3obo4b3obo4b
3obo4b3obo4b3obo4b3obo4b3o$12bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o
4bob3o4bo$10bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo$10b3o4b
ob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o$11b3obo4b3obo4b3obo4b3o
bo4b3obo4b3obo4b3obo4b3obo4b3o$13bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4b
ob3o4bob3o4bo$11bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo$11b
3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o$12b3obo4b3obo4b3obo
4b3obo4b3obo4b3obo4b3obo4b3obo4b3o$14bob3o4bob3o4bob3o4bob3o4bob3o4bob
3o4bob3o4bob3o4bo$12bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo
$12b3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o$13b3obo4b3obo4b
3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3o$15bob3o4bob3o4bob3o4bob3o4bob3o
4bob3o4bob3o4bob3o4bo$13bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b
3obo$13b3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o$14b3obo4b3o
bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3o$16bob3o4bob3o4bob3o4bob3o4b
ob3o4bob3o4bob3o4bob3o4bo$14bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3o
bo4b3obo$14b3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o$15b3obo
4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3o$17bob3o4bob3o4bob3o4bob
3o4bob3o4bob3o4bob3o4bob3o4bo$15bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo
4b3obo4b3o$15b3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bo$16b3obo
4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3o$18bob3o4bob3o4bob3o4bob3o4bob
3o4bob3o4bob3o4bo$16bo4b3obo4b3obo4b3obo4b3obo4b3obo4b3obo4b3o$16b3o4b
ob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bo$17b3obo4b3obo4b3obo4b3obo4b3obo
4b3obo4b3o$19bob3o4bob3o4bob3o4bob3o4bob3o4bob3o4bo$17bo4b3obo4b3obo4b
3obo4b3obo4b3obo4b3o$17b3o4bob3o4bob3o4bob3o4bob3o4bob3o4bo$18b3obo4b
3obo4b3obo4b3obo4b3obo4b3o$20bob3o4bob3o4bob3o4bob3o4bob3o4bo$18bo4b3o
bo4b3obo4b3obo4b3obo4b3o$18b3o4bob3o4bob3o4bob3o4bob3o4bo$19b3obo4b3ob
o4b3obo4b3obo4b3o$21bob3o4bob3o4bob3o4bob3o4bo$19bo4b3obo4b3obo4b3obo
4b3o$19b3o4bob3o4bob3o4bob3o4bo$20b3obo4b3obo4b3obo4b3o$22bob3o4bob3o
4bob3o4bo$20bo4b3obo4b3obo4b3o$20b3o4bob3o4bob3o4bo$21b3obo4b3obo4b3o$
23bob3o4bob3o4bo$21bo4b3obo4b3o$21b3o4bob3o4bo$22b3obo4b3o$24bob3o4bo$
22bo4b3o$22b3o4bo$23b3o$25bo!

[DroneBetter]

Confocal told me not to put my discoveries on the wiki directly, but to make a forum post with them for citation thereupon, here it is

(I used ikpx2 (and occasionally rlifesrc for completing some partials) for all of these, the last embed shown here took me about 1.5GiB of backups over the course of about two weeks on my 2016 2.9GHz dual-core i5 laptop, I am quite surprised by the lack of interest in this rule and assumed that all of these speeds would have been searched by these conventional methods much further than I could possibly reach on such a computer as mine)

New 2c/5o, the ~~fifth~~ fourth unique speed in this rule.

Code: Select all

x = 34, y = 42, rule = B3/S12
16b2o$14bo4bo$13bo6bo$13bo6bo$7bo6bo4bo6bo$4b3ob3o4bo2bo4b3ob3o$6b2o3bo2b6o2bo3b2o$7bo3bob2o4b2obo3bo$5b6o4bo2bo4b6o$5b2o8bo2bo8b2o$6b2o18b2o$5b2ob2o4bo4bo4b2ob2o$9bo3b3o2b3o3bo$7bo2b2ob3o2b3ob2o2bo$12bobo4bobo$8b2o3bo6bo3b2o$5b2o3b2obo6bob2o3b2o$6b2o2b2obo6bob2o2b2o$7bo4b2o6b2o4bo$8bo5bo4bo5bo$7bo7b4o7bo$7b5o3bo2bo3b5o$8b3o12b3o$8bo3bo8bo3bo$4bo3b2o2bo8bo2b2o3bo$2bo2bo2b2obo10bob2o2bo2bo$bo30bo$bo30bo$2bo2b2ob3o12b3ob2o2bo$3bo5b2o12b2o5bo$b2ob2o22b2ob2o$o2bob3obo2bo8bo2bob3obo2bo$3o3bob2obo2b6o2bob2obo3b3o$8b2o4bo4bo4b2o$8bo5b2o2b2o5bo$11b4o4b4o$14bo4bo$9bo2b2o6b2o2bo$8bo16bo2$7b2o16b2o$7b2o16b2o!

This seems to indeed be the smallest even-symmetric 2c/5, but there is a much smaller odd-symmetric one that you missed

Code: Select all

x = 25, y = 16, rule = B3/S12
6bo11bo$3b3ob3o5b3ob3o$2bo4bo9bo4bo$6bo11bo$4bob4o5b4obo$2bo19bo$bo3bobobo5bobobo3bo$5b3obo5bob3o$o4b3o9b3o4bo$2o5bo2bo3bo2bo5b2o$11bobo$9bobobobo$8bo2bobo2bo2$7bo9bo$7bob2o3b2obo!

there is also a whimsical tagalong for it that pulls along a domino behind it, and a tagalong for that which emits heavyweight sparks (that remain behind it as stable dominoes, making it the first known puffer, I think)

Code: Select all

x = 51, y = 37, rule = B3/S12
6bo11bo13bo11bo$3b3ob3o5b3ob3o7b3ob3o5b3ob3o$2bo4bo9bo4bo5bo4bo9bo4bo$6bo11bo13bo11bo$4bob4o5b4obo9bob4o5b4obo$2bo19bo5bo19bo$bo3bobobo5bobobo3bo3bo3bobobo5bobobo3bo$5b3obo5bob3o11b3obo5bob3o$o4b3o9b3o4bobo4b3o9b3o4bo$2o5bo2bo3bo2bo5b2ob2o5bo2bo3bo2bo5b2o$11bobo23bobo$9bobobobo19bobobobo$8bo2bobo2bo17bo2bobo2bo2$7bo9bo15bo9bo$7bob2o3b2obo15bob2o3b2obo3$14bobo23bobo$16bo25bo$15bobo23bobo$16b2o24b2o2$16b2o24b2o3$43b4o$41bo5bo$41bo$41b2o$39b2o$41bo2bobo$38bo4bo$45bo2$40bo$42b2o!

c/5 orthogonal:

Code: Select all

x = 24, y = 41, rule = B3/S12
9bo4bo$8bo2b2o2bo$7b2o6b2o$6bobo6bobo$8bobo2bobo$5bobobo4bobobo$5b2o10b2o$4bo14bo$b2o4bo3b2o3bo4b2o$3bo3b2obo2bob2o3bo$3bo6bo2bo6bo$3b2o14b2o$2b2o2b2ob2o2b2ob2o2b2o$8bobo2bobo2$7bo2b4o2bo2$8bo6bo$8b3o2b3o$7b2o6b2o$6bo2bo4bo2bo$5bo4b4o4bo$4bo14bo$9b2o2b2o$3bobo12bobo$6bo10bo$3bo4b2o4b2o4bo2$bobo3bo8bo3bobo$4bob3o6b3obo$o4b3o8b3o4bo$o2bo3bo8bo3bo2bo$bobo4bo6bo4bobo$2b3o3bo6bo3b3o$5bobo3b2o3bobo$6bobo2b2o2bobo$7b2ob4ob2o2$10b4o$9b6o$9bo4bo!

this is also reducible (minpop 184 to 126, bounding box from 24*42=1008 to 18*52=936)

Code: Select all

x = 18, y = 50, rule = B3/S12
6bobo$5bo2bo$4b4o$2obo2$4o5bo$2o6b3o2$2b2o3bo$4b2o3bo$9b2o$3bo5bo$6bobobo$9b2o$9b2o$8b2o2b2o$8bo2b4o$6bobo2bo$5bo4b2o$12bo$5bo6bobo$5b4ob3o2bo$6bo4b2o$13bobo$7bo2bo$8bobo$12bo$11b3o$11bo3bo$11bo4bo$11bo$11bo3b2o$11bo4bo$11bob2o$11bob3o$14b2o$13b3o3$16bo$13b2obo$12b4o$10bobob2o$12bo2b3o$9bo2bo3bo$8bob2o$7bo$7bo$8bo$7bobo!

here is a true-period (1,1)c/4 (as opposed to the natural (2,2)c/8)

Code: Select all

x = 39, y = 39, rule = B3/S12
14b2o$9b3ob2o$8bo3bo$12bo$5bobo5b2o$4b2o2b3o$3b3o5bo3bo$3b3obo3bo$8bo5bo$b2o6b2o$o12bo$3b2o6bo14bo$6b4o2bo2bo7b3obo$4o9b2o2bo4bo4b3o$o2bobo8bo10bob2o2bo$2o2b2o5bo5bobo$2o10bobobo3bob3o3bo$14b2o4b3obo3bo3bo$15b3o3b3obo2b4o$14bo2b2o3bo2b3o2bo2b3o$15b3obo6bo2bo2b3o$18b3o4bo2bo3bo$19b3o9bobo$12b3o5bo6b3o2b3o2bo$11bo3b2o2bo11b3o2bobo$15bo2b3o9b2o5b2o$10bo3b4o12bo$11bob2obo5bo$14bo2bo3bo2bo$20bo$13b4o3bo4bo$17bo2bo3b3o$16bo3b3o3bo$19bobo$19bo$18bob3o$19b3obo$24bo$23b2o!

and it may be extended to form a linestretcher

Code: Select all

x = 79, y = 64, rule = B3/S12
11bo2bobo$10b4o2bo$9b3o$13bo$5b6o3b2o$4bo4b3o3bo$9b2obo$7b2o3bo$3b3o3b3o$2b2o6b2o$b4o6bo$4b2o2b2o2b2o11b3o$2bo2bob4o2b4o7b3o$bo2b2ob3o6bo6b2obo3bo$o5bo7b2o3bo7bo2bo$o2bo2bo5bobobobobo3b2o2b2o$13b3obo2bo4bo3bo$14bo3bo7bobo2b3o$19bobo11b3o$15bo6bob2o10bo$16bo4bo7b2obo3bo$17b2o3bo3bo2bo2bo2bo$14bo4bo8bobobo2bo$13b4o5bo5b4o6b2o$12b3o2bobo9b2o4bobo$21bo$11bo2bo4b2o10b2o6b2o$12bo10bo16b2o$14b3obo3bo17bo2bo$14bo2bo3b2o17bo2b3o$14b4o2b3o2bobo5b4o4bo4bo$15bo2bobo4bo6b4ob2obo4b3o$17bo2bo2bo3bo3b2o3bo6bob3o$20bo2bo10bobo6bo2bo$19bo3bo6bo3bobobo6bo$19bo10bo3b2o$24bo9b5o6bo$21bobo7bo2bo4bo4b2o$26bo3b3o7b2o3b2o$24b2o3bo10b2o$28b2o8b2o$32bo8b2ob2o$28bo15b2o$31bob2o6b4o$29b6ob3o8bobobo$36b2o6bo4bo$45b2o4bo$45b2o$51b3o$44bo10bo3bo$45b2o4bo6b2o$53bobob3o$56bo5b4o$55bo4b4ob2o$60b2o3bo3b3o2bobo$55bo2bo12b3o2bo$64b3o3bo$73b2o$73bo2$75bo$76bo$77bo$78bo!

here is the first spaceship of what is now the fifth speed, (1,1)c/6

Code: Select all

x = 18, y = 17, rule = B3/S12
7b4o$9b2o2$5b3o$4bo2b3o5b2o$3bo3b3o4b2o$3b7o$3o5bob2obo$8bo2b4o$2o6bo4b3o$8b3o6bo$9bo7bo$12b5o$5bo3b3o2bo$5bo7b2o$10bob3o$5b2o5b2o!

maybe unsurprisingly (due to their relatively small sizes), all of these also work in rules Pedestrian Flock (B38/S12) and EightFlock (B3/S128), however not in HighFlock (B36/S12), I'm afraid, here are some that do (I hope it is not too off-topic for the Flock thread :-)

it has a small true-period c/3 spaceship (unlike Flock, which has none known yet, and I suspect will be a great deal more difficult, maybe a non-true-period one could be more feasible)

Code: Select all

x = 15, y = 20, rule = B36/S12
3b3ob4o$bo7bo2bo$o3b3o6bo$7bobo$obo8bobo$6bo2bo2$6b2o$6b2o2$5bo2b2o$5b2o3bo$6bo4bo$10bo2bo$7b4o3bo$9bo$6bobo3bobo$5bo2$5bobo!

the known 4c/10 glide-symmetric spaceship's frontend, alone, is also a 2c/5 stable domino puffer, here are two 2c/5 domino eaters, and one completion into a double-puffer

Code: Select all

x = 35, y = 33, rule = B36/S12
4b6o4b6o5b6o$3bo6bo2bo6bo3bo6bo$6b2o8b2o9b2o$5bo2bo6bo2bo7bo2bo$4bo4bo4bo4bo5bo4bo2$4bo4bo4bo4bo5bo4bo$25bo4bo$6b2o8b2o4bob8obo$21b2o4b2o4b2o$6b2o8b2o3bo12bo$22b2o8b2o$6b2o8b2o$5bo9bo$5b3o7b3o$2bobo2bo4bobo2bo$b2o2bo5b2o2bo$obo2bo4bobo2bo$bobob2o4bobob2o$3bobobo5bobobo$o2bo3bo2bo2bo3bo$4bo9bo$3b2o8b2o$3b2o8bobo$4bo8bobo$3b2o8bobo$16bo$12bo3b2o$12b2obo$16bo2$17bo$16b2o!

and a stabilisation of two into a slightly (but unusefully) sparky spaceship

Code: Select all

x = 17, y = 14, rule = B36/S12
b6o3b6o$o6bobo6bo$3b2o7b2o$2bo2bo5bo2bo$bo4bo3bo4bo2$bo4bo3bo4bo2$5b7o$4b3o3b3o$7bobo$3b4obob4o$4bo2bobo2bo$5b2o3b2o!

another thing that HighFlock possesses above Flock is a small (and natural!) 3c/15 spaceship, yet until now no true-period c/5, here is one next to the 3c/15 (highly beautiful, I believe :-)

Code: Select all

x = 23, y = 44, rule = B36/S12
b2o15bobo$3bo2bo10b2ob2o$b4ob2ob2o5bo2bo2bo$3b2o4bo6bo2bo2bo$3b3o4bo5bob3obo$4b3o9bo5bo$4b2ob2o$5bobo2bobo$4b3o3bo2bo2$12bo$13bo$7b3o3bo$7bo4bo$7bo3bo$7bo$8bo$5b2ob2o$6b2o$3bo$2b3obo$4bobo$4bo$4bo$o2bo$b2o2$b5o$2b3o$2b2o$bo$2bo$4b2o$6bo$4bob3o$5bobo2bo$7bo2bo$7bo$6b2ob2o$6b5o$5b3o$8bo2$5bobo!

HighFlock shares Flock's (2,2)c/8, yet the (1,1)c/4 I found for it is somewhat larger (maybe it could have a lower population at higher slice widths), yet cool and bulbous-looking

Code: Select all

x = 30, y = 29, rule = B36/S12
9b3o$5b2ob5o$2b3o5bo3bo$bo4bo4b2o$8b2o3bo$o2b2o3b3obo3bo$o8b4o4bo$3bo9b3obo$o2bo3b3o$4o6bo6bo$ob2o3bo10bo$4bo6b4o3bo$2o2bo2b3o7bo$obo4b3o3bobob2o$bo3bo3bo2b2o3bo2b2o$3b2o5b2obob2o5bo$5bo6b2o7bobo$5b2o2b4obo2bobo$12bo2bo6bo$9bo$14b2o7b2o$14bo7b3o$14bo2bo3b3o$20bo$16b2obo3b3o$26b2obo3$24b4obo!

and it too may stretch lines (albeit only one at a time)

Code: Select all

x = 32, y = 31, rule = B36/S12
10b3o$6b2ob5o$3b3o5bo3bo$2bo4bo4b2o$9b2o3bo$bo2b2o3b3obo3bo$bo8b4o4bo$4bo9b3obo$bo2bo3b3o$b4o6bo6bo$bob2o3bo10bo$5bo6b4o3bo$b2o2bo2b3o7bo$bobo4b3o3bobob2o$2bo3bo3bo2b2o3bo2b2o$4b2o5b2obob2o5bo$6bo6b2o7bobo$6b2o2b4obo2bobo$13bo2bo6bo$10bo$15b2o7b2o$15bo7b3o$15bo2bo3b3o$21bo$17b2obo3b3o$27b2obo3$25b4o$30bo$31bo!

and a HighFlock (1,1)c/6 as well

Code: Select all

x = 30, y = 29, rule = B36/S12
7bobo$6b2o2bo$7b3o$6bo$5bo6b2o$10b2obo$bo2b2o2bo2bo4b2o$2obo3b4o4bo$o3b2o2b2o8bo2$5b2o5b3o2bo$7bo3bo2bo$4bob2o$5bo4bo3bo$6b2o3b2o3b3o6bo$7b2o5b2o3b3o2b3o$8b2o4bobobo3bo2bobo$15bo2bobo6bo$18b2ob2o$16bo3bobo$16b2obobo$16b2o4bo4b2o$21b2o6bo$16bo11b2o$16b2o5b5o$16b2o5bo3bo$16bo6bo$22bo$22bo!

Final remark: The minimal known Flock c/5 seemed large enough for me to try ikpx2 searching for a reduction, yet that returned only it and larger variants thereof, maybe this too would be conducive to a higher-width search

Edit (2023-12-28): Confocal combed through each of these and found that the purported true-period (1,1)c/4 (which I had in my Pedestrian Flock collection and appeared to work without deteriorating upon conversion to Flock) in fact was also a (2,2)c/8 in Flock, I have replaced it with one found in the correct census (it seems that true (1,1)c/4's in here are somewhat larger)

Here is the Pedestrian Flock one (note that changing it to Flock and back will keep the p8 central mechanism that this p4 one decays into)

Code: Select all

x = 20, y = 20, rule = B38/S12
12bo3bo$10bo2bobobo$9bo3bo2b2o$9bo$9bo2b3o$7b2o3bob3o$6bo8bo$5bo4bo3bo$5bo2bo5bo$2b3o5bo4b2o2bo$bo5bobo9bo$17b2o$o3b2o10b3o$b2obo12bo$4b2ob2o$bo3b2o2bo$obo2bo3bo2bo$b2o8b3o$11b2o$9b2o!

note that due to its obo! sparks, it may act as a linestretcher

Code: Select all

x = 25, y = 25, rule = B38/S12
11b2ob3o$9b2o5bo$8bo$12bobo$7bo2bobo$6bo5b2o2bo$5bo2bo4b2obo$4bo2bo5bo$2bo3bobobo5bo$bo15b3o$bo2bo3bobo8b2o$o15b4o2bo$o2b3o11bo5bo$5b3o16bo$o2bo2bo10bo$o17bo$2o3b2obo2bo7bo$9bob2obo$9bobo3bo$9b3o4bo$10bo2$11bo$12bo$13bo!

Edit (2023-12-30): Add smaller c/5

[DroneBetter]

On 2024-01-03, FWKnightship found the first seminatural p8 oscillator in a C4_4 soup, xp8_y3364jzggwgwd22044o4woc4z463w4344088mw1w11zy5p4co (consisting of an active region hassled by four xp4_18fs), which raises the lowest unseminatural period to 10

Code: Select all

x = 20, y = 20, rule = B3/S12
7bo2bo$7b2obo$8b2o2$10bo$7bo$8b2o$7bo3b2obo3b2o$7bo5bo3b2o$2o2bo8bo3bo$2bo3bo8bo2b2o$b2o3bo5bo$2o3bob2o3bo$10b2o$12bo$9bo2$10b2o$9bob2o$9bo2bo!

unfortunately no sparks

[Period1GliderGun]

On 2024-01-03, FWKnightship found the first seminatural p8 oscillator in a C4_4 soup, xp8_y3364jzggwgwd22044o4woc4z463w4344088mw1w11zy5p4co (consisting of an active region hassled by four xp4_18fs), which raises the lowest unseminatural period to 10

Code: Select all

x = 20, y = 20, rule = B3/S12
7bo2bo$7b2obo$8b2o2$10bo$7bo$8b2o$7bo3b2obo3b2o$7bo5bo3b2o$2o2bo8bo3bo$2bo3bo8bo2b2o$b2o3bo5bo$2o3bob2o3bo$10b2o$12bo$9bo2$10b2o$9bob2o$9bo2bo!

unfortunately no sparks

well, one spark (p56 LCM with the p7)

Code: Select all

x = 24, y = 21, rule = B3/S12
2b2o$o2bo7bo2bo$3bo7b2obo$obo4bo4b2o$bo4bobo$5bo8bo$5bo2bo2bo$5b2o5b2o
$11bo3b2obo3b2o$11bo5bo3b2o$4b2o2bo8bo3bo$6bo3bo8bo2b2o$5b2o3bo5bo$4b
2o3bob2o3bo$14b2o$16bo$13bo2$14b2o$13bob2o$13bo2bo!

[DroneBetter]

may I introduce 58P6H1V0 (xq6_4ah2gq131o0o131qg2ha4zy279bxb97zy318hch81, also the first known spaceship of its speed :-)

Code: Select all

x = 21, y = 15, rule = B3/S12
2bo3b3o3b3o3bo$bobobobo5bobobobo$o19bo$bo3bo3bobo3bo3bo$2bob2o3bobo3b2obo$6b3o3b3o$6bobo3bobo$6bo7bo$7b2o3b2o2$7bobobobo2$10bo$8bobobo$9bobo!

maximal rule B38/S1278, so working in Pedestrian Flock and EightFlock also

it is pretty small and required only ~10.45MiB of ikpx2 searching at logical width 10 (it looks as though it ought to have been 11, but it appears ikpx2 utilised gutter-preservingness for the frontend), following a ~27.88MiB disproof of widths 9 and below, completed over the course of about 10 days (with some ctrl-Z's when using it for other things and one system crash (presumably from overheating) when I did not), however one who began a search at this width could have finished it using my laptop in fewer than 3 days

since this post contains only one spaceship, here is a phase colouring (when the camera moves at c/6 also and measures 1/6th-cell slices alike the cells of an oscillator, it has 17/3 stator cells and 985/6 rotors, of which 941/6 are strict)

highly beautiful

xq6_4ah2gq131o0o131qg2ha4zy279bxb97zy318hch81.png (3.09 KiB) Viewed 647 times

[LaundryPizza03]

A 2c/8o spaceship was found in C1 in February. At Discord, a user named Lapin Acharné claimed credit for this on March 11.

Code: Select all

x = 10, y = 10, rule = B3/S12
2bo$bobo$2obo$3b2o$3b2o$3bo2bo$7bo$7b2o$6bobo$9bo!

The original soup was:

Code: Select all

x = 10, y = 10, rule = B3/S12
2bo$bobo$2obo$3b2o$3b2o$3bo2bo$7bo$7b2o$6bobo$9bo!

[Period1GliderGun]

The original soup was:

Code: Select all

x = 10, y = 10, rule = B3/S12
2bo$bobo$2obo$3b2o$3b2o$3bo2bo$7bo$7b2o$6bobo$9bo!

Perhaps you mean this?

Code: Select all

x = 16, y = 16, rule = B3/S12
boobobobobbbbbbb$
boboobbboboobooo$
bboobooboobooboo$
obobbbbobbbbobob$
oooboobbboboooob$
bobbboooboooobbb$
oobobbbobobooobb$
booobooooboobbob$
oooobbbbobobbbbo$
bbobbooboobboobb$
bobobbboobboobob$
oboobbbbbbbbooob$
oooobbobobobooob$
oooboboobooooobo$
booobobboooobobo$
obboobbboboobobo!

[hibiscus]

Edit: these were the same c/7 partials posted by LaundryPizza03 a long time ago, whoops

[wwei47]

Reporting negative results for c/3 orthogonal (JLS):
No w20a ships.
No w39o ships.
No w40e ships.
No w41g ships.
It seems like everything manages to get a few rows in before suddenly getting "stuck" and unable to extend any further; yet there seem to be actual frontends. I don't know what prevents them from being completed since even B3/S2 has c/3 ships at lower widths.

[LaundryPizza03]

Reporting negative results for c/3 orthogonal (JLS):
No w20a ships.
No w39o ships.
No w40e ships.
No w41g ships.
It seems like everything manages to get a few rows in before suddenly getting "stuck" and unable to extend any further; yet there seem to be actual frontends. I don't know what prevents them from being completed since even B3/S2 has c/3 ships at lower widths.

What do your partials look like? I'm looking for wide partials to check if it is because of the nonexistence of available sides.

[wwei47]

Reporting negative results for c/3 orthogonal (JLS):
No w20a ships.
No w39o ships.
No w40e ships.
No w41g ships.
It seems like everything manages to get a few rows in before suddenly getting "stuck" and unable to extend any further; yet there seem to be actual frontends. I don't know what prevents them from being completed since even B3/S2 has c/3 ships at lower widths.

What do your partials look like? I'm looking for wide partials to check if it is because of the nonexistence of available sides.

I unfortunately did not save any partials, but I tried a few exploratory short wide searches and got edges that refused to extend past a few columns. I've already tried edge arguments, but no matter what slope I tried for the edge, JLS always seemed to find enough of an edge where it seemed like such an edge existed.
EDIT: The longest ikpx2 partials so far:

Code: Select all

x = 95, y = 21, rule = B3/S12
9b2o21b2o26b2o21b2o$8bo3bo17bo3bo24bo3bo17bo3bo$5b2obo3b3o13b3o3bob2o
18b2obo3b3o13b3o3bob2o$7bo7bo11bo7bo22bo7bo11bo7bo$5b2o4b2o17b2o4b2o
18b2o4b2o17b2o4b2o$4b2o4b4o2bo9bo2b4o4b2o16b2o4b4o2bo9bo2b4o4b2o$3bo2b
o2b3obo2bobo5bobo2bob3o2bo2bo14bo2bo2b3obo2bobo5bobo2bob3o2bo2bo$3bo6b
o2b3o3bo3bo3b3o2bo6bo14bo6bo2b3o3bo3bo3b3o2bo6bo$15bo3b2ob2o3bo38bo3b
2ob2o3bo$2b2ob2o4bo3bo11bo3bo4b2ob2o12b2ob2o4bo3bo11bo3bo4b2ob2o$b4o2b
o6bo2b4ob4o2bo6bo2b4o10b4o2bo6bo2b4ob4o2bo6bo2b4o$2bobo3bo8b2o5b2o8bo
3bobo12bobo3bo8b2o5b2o8bo3bobo$4bo3b2o4bobo9bobo4b2o3bo16bo3b2o4bobo9b
obo4b2o3bo$2bobo2bob2o2b3o11b3o2b2obo2bobo12bobo2bob2o2b3o11b3o2b2obo
2bobo$3bo2bo4bo2bo13bo2bo4bo2bo14bo2bo4bo2bo13bo2bo4bo2bo$b2o7b2o3bo
11bo3b2o7b2o10b2o7b2o3bo11bo3b2o7b2o$2o3bobob3o4bo9bo4b3obobo3b2o8b2o
3bobob3o4bo9bo4b3obobo3b2o$bo2bo5b2o4b2o7b2o4b2o5bo2bo8bobo2bo5b2o4bo
9bo4b2o5bo2bobo$2bo2b2o3bo3bo3bo5bo3bo3bo3b2o2bo9bo8bo2bob3obo7bob3obo
2bo8bo$b3o3bo4b3o3b2o3b2o3b3o4bo3b3o12b3o2b2o7bo7bo7b2o2b3o$2o5bo2b2ob
ob2o9b2obob2o2bo5b2o8b2o2bo3b2ob3o3b2o5b2o3b3ob2o3bo2b2o!

Edit 2: The highest width that ikpx2 has ruled out so far is logical width 22.
Edit 3: Bruh come on

Code: Select all

x = 43, y = 41, rule = B3/S12
9b2o21b2o$8bo3bo17bo3bo$5b2obo3b3o13b3o3bob2o$7bo7bo11bo7bo$2o3b2o4b2o
17b2o4b2o$2o2b2o4b4o2bo9bo2b4o4b2o$3bo5b3obo2bobo5bobo2bob3o2bo2bo$10b
o2b3o3bo3bo3b3o2bo6bo$3bobo9bo3b2ob2o3bo8bo2b2obo$11bo3bo11bo3bo10bo$
14bo2b4ob4o2bo$17b2o5b2o$14bobo9bobo$13b3o11b3o$11bobo15bobo$10bo2bo
15bo2bo$13bobo11bobo$10bob3obo9bob3obo$13bo15bo$13b2o13b2o$12bobobo9bo
bobo$14b3o9b3o$15bo11bo$12bo2bo11bo2bo$11bo3bo11bo3bo$17bo7bo$10b5o3bo
5bo3b5o$9b3ob2o4bo3bo4b2ob3o$10bo2bob3o2bobo2b3obo2bo$16b2obo3bob2o$
11bo19bo$14bo13bo$13b2o13b2o$14b3o9b3o$14bo2bo7bo2bo2$13b5o7b5o$12b3ob
2o7b2ob3o$13bo2bobo5bobo2bo$18b2o3b2o$14bo2b2o5b2o2bo!

Edit 4: More near-misses:

Code: Select all

x = 52, y = 48, rule = B3/S12
51bo$50bo$44b4o2bo$43b6o$40b2o$43bo4bo2$4b4o3b2o21b2o3b3obo2bobo$o2b6o
bo3bo17bo3bob3obo4bo$bo8bo3b3o13b3o3bo7b2o$3bo4bo8bo11bo8bo4b4o$13b2o
17b2o10b2o$3b4o5b4o2bo9bo2b4o$11b3obo2bobo5bobo2bob3o$12bo2b3o3bo3bo3b
3o2bo$17bo3b2ob2o3bo$13bo3bo11bo3bo$16bo2b4ob4o2bo$19b2o5b2o$16bobo9bo
bo$15b3o11b3o$13bobo15bobo$12bo2bo15bo2bo$15bobo11bobo$12bob3obo9bob3o
bo$15bo15bo$15b2o13b2o$14bobobo9bobobo$16b3o9b3o$17bo11bo$14bo2bo11bo
2bo$13bo3bo11bo3bo$19bo7bo$12b5o3bo5bo3b5o$11b3ob2o4bo3bo4b2ob3o$12bo
2bob3o2bobo2b3obo2bo$18b2obo3bob2o$13bo19bo$16bo13bo$15b2o13b2o$16b3o
9b3o$16bo2bo7bo2bo2$15b5o7b5o$14b3ob2o7b2ob3o$15bo2bobo5bobo2bo$20b2o
3b2o$16bo2b2o5b2o2bo!

Edit 5: ikpx2 width 23 has been ruled out.

[LaundryPizza03]

Longest wide partial at height 14, from rlifesrc:

Code: Select all

x = 24, y = 14, rule = B3/S12
22bo$10bo9b3o$8b2obo4b3o$7b3o2b2o3b2o2b2o$5bob2o3b3ob2o3b3o$5b2o8bo2bo
bo$3b3o4b2o4bo3b2o$2bo2bo4b3obo5b3o$11bo6bo$2b5o9b2o2bobo$2b2ob3o$bobo
2bo11b2obo$2o16b2ob3o$b2o2bo16bo!

[May13]

c/3 orthogonal spaceship from LSSS:

Code: Select all

x = 79, y = 40, rule = B3/S12
27b2o21b2o$26bo3bo17bo3bo$23b2obo3b3o13b3o3bob2o$25bo7bo11bo7bo$23b2o
4b2o17b2o4b2o$22b2o4b4o2bo9bo2b4o4b2o$17b2o4bo3b3obo2bobo5bobo2bob3o3b
o4b2o$15b2o2b2o7bo2b3o3bo3bo3b3o2bo7b2o2b2o$13bo8b3o8bo3b2ob2o3bo8b3o
8bo$12b2ob6obob2o3bo3bo11bo3bo3b2obob6ob2o$12bo2bo2bobo3bo7bo2b4ob4o2b
o7bo3bobo2bo2bo$13b3o2bobob3o10b2o5b2o10b3obobo2b3o$10b2o11bobo6bobo9b
obo6bobo11b2o$8bo2bo8bo2bo7b3o11b3o7bo2bo8bo2bo$7b2obo4b4o4bobo4b2o15b
2o4bobo4b4o4bob2o$7b3o13bo6bo17bo6bo13b3o$5bobo19bobo19bobo19bobo$4bo
21bob3o17b3obo21bo$24bo4b2obo13bob2o4bo$7bo15bo3bo3b2o13b2o3bo3bo15bo$
4b3o16bo8b3o9b3o8bo16b3o$3b2o2bobo12b2o8bo2bo7bo2bo8b2o12bobo2b2o$bobo
2b4o59b4o2bobo$o9bo14bo5b5o7b5o5bo14bo9bo$bo2bo2bob2o12bob2o3b3ob2o7b
2ob3o3b2obo12b2obo2bo2bo$7bo14bo3bo4bo2bobo5bobo2bo4bo3bo14bo$5b2o3b2o
9bo14b2o3b2o14bo9b2o3b2o$4b4o2bobo14bo4bo2b2o5b2o2bo4bo14bobo2b4o$5b4o
bo2bo7bob3o2bo21bo2b3obo7bo2bob4o$4bo69bo$10bo4bo10bobo21bobo10bo4bo$
4bo3bo2bo2b2o47b2o2bo2bo3bo$10bo4b3o43b3o4bo$15bo2bo41bo2bo2$14b5o41b
5o$13b3ob2o41b2ob3o$14bo2bobo39bobo2bo$19b2o37b2o$15bo2b2o39b2o2bo!

Edit: bigger variation with wwei47's component:

Code: Select all

x = 79, y = 41, rule = B3/S12
27b2o21b2o$26bo3bo17bo3bo$23b2obo3b3o13b3o3bob2o$25bo7bo11bo7bo$23b2o
4b2o17b2o4b2o$22b2o4b4o2bo9bo2b4o4b2o$17b2o4bo3b3obo2bobo5bobo2bob3o3b
o4b2o$15b2o2b2o7bo2b3o3bo3bo3b3o2bo7b2o2b2o$13bo8b3o8bo3b2ob2o3bo8b3o
8bo$12b2ob6obob2o3bo3bo11bo3bo3b2obob6ob2o$12bo2bo2bobo3bo7bo2b4ob4o2b
o7bo3bobo2bo2bo$13b3o2bobob3o10b2o5b2o10b3obobo2b3o$10b2o11bobo6bobo9b
obo6bobo11b2o$8bo2bo8bo2bo7b3o11b3o7bo2bo8bo2bo$7b2obo4b4o4bobo3bobo
15bobo3bobo4b4o4bob2o$7b3o13bo4bo2bo15bo2bo4bo13b3o$5bobo23bobo11bobo
23bobo$4bo23bob3obo9bob3obo23bo$31bo15bo$7bo23b2o13b2o23bo$4b3o23bobob
o9bobobo23b3o$3b2o2bobo22b3o9b3o22bobo2b2o$bobo2b4o23bo11bo23b4o2bobo$
o9bo19bo2bo11bo2bo19bo9bo$bo2bo2bob2o18bo3bo11bo3bo18b2obo2bo2bo$7bo
27bo7bo27bo$5b2o3b2o16b5o3bo5bo3b5o16b2o3b2o$4b4o2bobo14b3ob2o4bo3bo4b
2ob3o14bobo2b4o$5b4obo2bo14bo2bob3o2bobo2b3obo2bo14bo2bob4o$4bo29b2obo
3bob2o29bo$10bo4bo13bo19bo13bo4bo$4bo3bo2bo2b2o16bo13bo16b2o2bo2bo3bo$
10bo4b3o13b2o13b2o13b3o4bo$15bo2bo13b3o9b3o13bo2bo$32bo2bo7bo2bo$14b5o
41b5o$13b3ob2o12b5o7b5o12b2ob3o$14bo2bobo10b3ob2o7b2ob3o10bobo2bo$19b
2o10bo2bobo5bobo2bo10b2o$15bo2b2o16b2o3b2o16b2o2bo$32bo2b2o5b2o2bo!

[wwei47]

ikpx2 reports negative for c/3 logical width 24. Longest partial:

Code: Select all

#C depth = 48
#C breadth = 49
#CLL state-numbering golly
x = 49, y = 25, rule = B3/S12
12b2o21b2o$11bo3bo17bo3bo$8b2obo3b3o13b3o3bob2o$10bo7bo11bo7bo$8b
2o4b2o17b2o4b2o$7b2o4b4o2bo9bo2b4o4b2o$6bo2bo2b3obo2bobo5bobo2bob
3o2bo2bo$6bo6bo2b3o3bo3bo3b3o2bo6bo$18bo3b2ob2o3bo$5b2ob2o4bo3bo
11bo3bo4b2ob2o$4b4o2bo6bo2b4ob4o2bo6bo2b4o$5b3o3bo8b2o5b2o8bo3b3o$
8bo2bo5bobo9bobo5bo2bo$4bobo9b3o11b3o9bobo$3bo3bo4bobobo15bobobo4b
o3bo$bo5b6ob3o15b3ob6o5bo$o2bo13b2o11b2o13bo2bo$14bo4b2o7b2o4bo$7b
2o13bo3bo13b2o$5obo2bo6b5ob2ob2ob5o6bo2bob5o$3bobob3o5b2obo3bo3bo
3bob2o5b3obobo$10bob2obo3bob2o3b2obo3bob2obo$3o2bo2bo5bo6bobobobo
6bo5bo2bo2b3o$o4bob3o3bo3bo13bo3bo3b3obo4bo$b2o4bo3b3o3bobo3bobo3b
obo3b3o3bo4b2o!

13May's positive result means that the upper bound for gutter symmetry is logical width 39; can we find the minimum width?
EDIT: c/4o w12a negative.
Edit 2: c/5d w7.5s negative.
Edit 3: c/5d w8.5s negative.
Edit 4: c/4o w13a positive!

Code: Select all

x = 13, y = 36, rule = B3/S12
2bo$bobo$2obo$3b2o$3b2o2bo$3bo2b2o$7bob2o2$8bo$4bo3bo$3bobo2b2o$6bo2b
4o$12bo$4bo5bo$6bo3bo$8bo$7b2o2b2o$8b2o$9bo$9bo2bo$7bobo$6bobob2o$5b2o
$8bo2$6b2o$9bo$3bo2bo$2bo2bobobo$2bobo$3bo$2o2bo$3b2o$4bo$bobo$2bo!