The C1 sample soup collection of the messless_10h bin in Catagolue reached its maximum limit a couple months ago. I have looked through the 499 soups (one is missing for some reason) and found that nine of them evolve to the following diehard pattern that lasts 995 ticks, or a close variation of it:
Code: Select all
x = 12, y = 5, rule = B3/S23
o9bo$4o5b3o$o3bo6bo$2b3o2b3o$8b2o!
The soups are in the following RLE.
Code: Select all
x = 156, y = 156, rule = B3/S23
4o2bo4bo59bobobo2b3o2bobo54bobo5bo4b2o$b5ob4ob4o54bo4bo2bobo3bo60b2ob
2obo2b2o$b2ob5ob2o3bo54b3o4b2o3bob2o56b8obobo$bo2bobo2b2obo57bob2o2b2o
bob2obo55b2ob4obo2bobobo$obo2bobobo3bobo54bob2ob6obo2bo55bob2o2bob4ob
2o$obo6b3obobo59bo5b2ob2o57bobo2bo2b2obo$bob2o2b3obob3o55bo2b3ob2o4b2o
54bobobo4b3o2bo$2o2b3ob2o3b2o56bo2b3ob6obo61bobob2ob2o$2o2b2o2bo2b5o
60b2ob2ob2o57b3o2bo3b4o$b2o2b2obob2obo59bob2o3bob2obo59b2ob2o2bob2o$4o
bo5b3o58bob2obobo3bobo54b3ob4ob2ob4o$2bobob2o2bo2b3o55bo5bo3b3o58bo2b
3obob2obo$2b3o2bo3b3o57b2o2b5o2b2obo56b5o2b2o2bobo$b2o2bobobobo58bob3o
b2obobo2bo55bo11bob2o$bo2b2o2b3o2bo58b2o4b2ob5o57bo6b3obo$3b2obobo2bob
3o56b2o3b2obob2obo54bo3bobob2ob2obo55$2ob2ob2o2b2o3bo54b3obobobob4obo
57bob4obo2bobo$bobo2b2o4bo58b4o2b3o3bobo54b3o2b2obobo2b3o$bo2bo2bo2bo
4bo54bobo3bob2o2bobo58b2o5b2o$b5o2bob2o3bo54bo5bobo2bob3o55bo3bo2bo6bo
$4obob3o3b3o54b4o2b2ob4ob2o54bo2bo4b2ob2o$2o2bo4b2o4bo54b3obo4b2obobo
55b2o2b3o2b3ob2o$2obobobo2bobob2o56b7o2bo2bo55b2obo2b6obo$b3ob2obo2bob
obo54bo4b3obo3bo56b2obobo2b6obo$2o2b4o2b2obobo54bo4b3obo2b2o61bob2ob3o
2bo$o2b3obobo4bo55bo2bobo2bobo4bo58bo2b2o2bobobo$2bob2o5bo3bo55b2ob4o
2bob3o56bobobo5bo$b4obobobo2b3o56bob5o2bobo56b2o3b2ob2ob2ob2o$2o4bob3o
b2o58bob2o2b2o3b2o55bob4o6bo2bo$2ob2obo3b2o2bo58bob2o3bo2bo56b3o2bo6bo
2bo$4o2b5obo2bo55bo2b5ob6o54bob2ob4ob3o2bo$o2b3ob2obo3b2o55b2obob2ob2o
bo60bobobobo4b2o55$o5bo2bob2ob2o54bo3bobob3o4bo54b2o2bobob3obo$2b4obob
2ob4o57bo2bob2o4b2o54b2o2bobo2b3ob3o$ob3o2bo3b3o57b2obobo4bo2b2o54b3o
2bobobo2b4o$bo3bo2bob2obo57b2o5b5obo55b3o3bo2b3obobo$ob8o2b2obo55bobob
ob2ob2obo56bo4bob2ob3obo$2o2b3o2bo2bob2o55b2o2bo4b2ob2o58bobo2bo3bo2bo
$bob2obo5b4o54bo2b2ob2obobo2bo55b4o2bobobob2obo$5bob3o2b4o54bob5ob2o3b
o57b3o3bo6bo$obobo2b2o3bo2bo54bob3o3bobob2obo56b3o2b3o3b2o$2bob4ob3o3b
o58bo5bobo2bo54b2o2bo2bobobob2o$3obob3o4bobo58bo4bo2b2obo54bo5bo3bo2bo
$b3obo3bo2b3o58bob2obobo4bo54bo2b2o2bo2b2o2bo$2o3bo2bob2o3bo56b8obo2bo
55b3o7bo3b2o$bob2obo2b3o2bo56bob2obo3bobo2bo55b3obobob2obo$bobo11bo58b
o3b3o2bo56bob4o3b2ob2obo$4b2o2b2o3bo57bo4b2ob2o3bo56b5o3b3o2bo!
Edit: Also six of the soups evolved to the following diehard pattern that lasts 1065 ticks, or a close variation of it:
Code: Select all
x = 19, y = 7, rule = B3/S23
8b2o$8b2o$17bo$4bo11bobo$4obo11bo$3o3bo$3bobo!
It is the second most common sequence in this bin, after the first pattern of this post. I think no other sequence had more than three occurences in this bin.
The soups are in the following RLE.
Code: Select all
x = 156, y = 86, rule = B3/S23
3o3bobob3ob2o54b5o3b5o2bo56bo3bobob2obobo$2bobo2bob2o2b2o60bob2ob6o55b
o2bob2o2b2o$o2bo2bo4bobo56bo4bobobob3o58b2obob5o2bo$o4b2o3b4o56b4obob
2obob2o57b2ob3o4bob3o$obob2o2b6obo54bob7o4b2o55b5o2b2o6bo$o4bobob2obob
2o54b2ob2obob4obobo54bob2o2b10o$obob2obobo2b3o55bo2b2ob5ob3o55b4obob4o
3b2o$3obob3o3bobo56b2o2b2o2b4o2bo56b2o2bob3o3b2o$obo4b2obob4o56b7ob2o
3bo54bo2bobob2ob2obobo$b2o2bo3bo2b4o58b2o4b5o55bobobo4b2o4bo$ob6o3b2ob
o57bo2b2obobobo2bo55b4o2b5obo$o3b3o2b5o56bo2bobo2b4o2b2o61b2ob3obo$ob
5o2bob2obo56b5o2b3o4bo54bo2b3o3bo2b2o$bo2bobob3o2bo56b2o2bo2b3o4bo55bo
bobo4b6o$b2obob3ob2o2b2o60bobobo3b2o55bo4b2ob7o$o2bob2ob3ob4o55b3o3b4o
b2o56b2o2b3o3b2obo55$o2bo3b2obo2bo56bo2bob4obob3o55bob4obobobo$3b3ob4o
b2obo54b2obob2obobob4o60bo5bobo$bob5o2bo2bo56b2obo6bo4bo56bo3bobobo3b
2o$2bob3o4bob3o54b3obob2obo3bobo54bo2bo2b3o5bo$2bobo2b2o5b2o54b5obo3b
2ob2o57bobob3ob2o$3b2o2bobob2ob2o56bo4bo3b2obo55bob2obo2b2ob2o2bo$o2b
2ob3ob2ob2o56bo2bobobo3bo2bo54bo2bo2bo5bo2bo$bobo2bob2o2b4o57b3ob3obo
63bo7bo$2o2bob2obob2ob2o56bo4b3o2bo57bo3bobob2o3b2o$2ob4o2bo2bo59b3ob
2ob2o2bobo55b3ob2o3bob3o$2b2ob2obobob3o55bob4o2bobob2obo54b2o3bo4bo3b
2o$3obo2b2o2b2obo56b3o5b3ob3o54bo4bobobo3bo$o3b5o3bobo56bo8bo2b3o54b3o
bobo4b2ob2o$2b4obob4ob2o55bo2b2o3b2o2b2o56bob2ob3o2bob3o$4ob3obo3bobo
59bo2b8o55bo2b3ob5o2bo$2ob3obobo4b2o54bobob3obob2obobo60b2o2bo3bo!
This diehard also has ten C1 occurences in the messless_11h bin so far, out of 110 soups in total.