xp56_y8o8bp6o8a6z0cc08gy512303156zw12066y6o4sozye1y4osq596zo48me6z011y56e96y6oo0gzy6o80g0ggy6240dczy71pl47o7k46zyd11

#C [[ GRID THUMBLAUNCH THUMBSIZE 2 THEME Catagolue ]] 
x = 1, y = 1, rule = B3/S23
b!

	This pattern is an oscillator.
	This pattern is periodic with period 56.
	This pattern runs in standard life (b3s23).
	The population fluctuates between 128 and 244.
	This evolutionary sequence works in multiple rules, from b3s23 through to b38s234ce.

Pattern RLE

Code: Select all

Glider synthesis

Code: Select all

#C [[ GRID MAXGRIDSIZE 14 THEME Catagolue ]] 

#CSYNTH xp56_y8o8bp6o8a6z0cc08gy512303156zw12066y6o4sozye1y4osq596zo48me6z011y56e96y6oo0gzy6o80g0ggy6240dczy71pl47o7k46zyd11 costs 84 gliders (true).

#CLL state-numbering golly

x = 1248, y = 64, rule = B3/S23

372bo$370bobo766bo$371b2o767b2o$416bo722b2o$364bo49b2o734bo$365bo

49b2o733bobo$363b3o779bo4b2o$1146b2o$1145b2o$861bo$861bobo365bo$

602bo241bobo14b2o7bo359b2o$600bobo23bobo216b2o23bobo356b2o$601b2o

23b2o217bo19bobo2b2o353b2o$627bo237b2o357bo2bo$866bo357bobo$925b2o

69b2o69b2o69b2o76b2o7bo8bobo$bo695bo226bo2bo67bo2bo67bo2bo67bo2bo

74bo2bo16b2o3b2o$2bo692b2o227bobobo66bobobo66bobo68bobo75bobobo15b

o3b2o$3o693b2o5bo221bob3o66bob3o66bob2o67bob2o74bo2bo21bo$532bo5bo

163bo72bo90bo60b3o68b3o67b3o15bo52b3o78bo$530bobo5bobo81bo79b3o69b

o92bo137bobo61b2o15bobo51b2o75bobo$4b2o525b2o5b2o83b2o69b2o78b3o

88b3o137b2o79b2o$4bobo9bo605b2o69bo2bo309bo76bo141bo$4bo10bo611b2o

64bo2bo10bo373bobo139b2o$15b3o522b2o85bobo64b2o10b2o159bobo212b2o

70b2o68b2o6b2o$539b2o86bo78bobo64b2o3bo65b2o21b2o46b2o69b2o13bo55b

2o69b2o24b2o50b2o24b2o$533b2o6bo77b2o3bo72b2o3b2o68bo2bo2bobo62bob

o22bo45bobo68bobo11b2o55bobo68bobo75bobo$53b2o45b2o41b2o40b2o36b2o

49b2o49b2o96b2o33b2ob2o31b2o33b2obo2bo29b2o51bo2bobobo28b2o40bo2bo

bobo28b2o34b2o2bobo3b2o23b2o34b2o2bo30b2o34b2o2bo30b2o34b2o2bo14b

2o14b2o34b2o2bo10b2o18b2o34b2o2bo10b2o18b2o41b2o2bo10b2o18b2o$54bo

8bo37bo42bo41bo37bo50bo50bo97bo33b2obobo31bo33b2obob2o30bo51b2obob

2o30bo40b2obob2o30bo34bobob2o30bo34bobob2o30bo34bobob2o30bo34bobob

2o30bo34bobob2o8bo2bo18bo34bobob2o8bo2bo18bo41bobob2o8bo2bo18bo$2b

o51bob2o4bo33bo4bob2o39bob2o38bob2o34bob2o47bob2o47bob2o55bo38bob

2o33bobo31bob2o33bo33bob2o51bo33bob2o31bo8bo33bob2o33bo33bob2o33bo

33bob2o33bo33bob2o33bo33bob2o33bo11bobo19bob2o33bo11bobo19bob2o40b

o11bobo19bob2o5b2o$2b2o49b2o2bo4b3o32bo2b2o2bo37b3o2bo36b3o2bo32b

3o2bo45b3o2bo45b3o2bo56bo35b3o2bo33b2o30b3o2bo33b4o28b3o2bo51b4o

28b3o2bo31b2o7b4o28b3o2bo33b4o28b3o2bo33b4o28b3o2bo33b4o14bobo11b

3o2bo33b4o11bo16b3o2bo33b4o9bo18b3o2bo33b4o9bo18b3o2bo40b4o9bo18b

3o2bo4b2o$bobo10b3o38b2o38b3o4b2o37bo3b2o36bo3b2o32bo3b2o45bo3b2o

5bobo37bo3b2o55b3o10bobo21bo3b2o32b2o4b3o24bo3b2o32b2o3bo27bo3b2o

50b2o3bo27bo3b2o31bobo5b2o3bo27bo3b2o32b2o3bo27bo3b2o32b2o3bo27bo

3b2o32b2o3bo14b2o11bo3b2o32b2o3bo11b2o14bo3b2o32b2o3bo27bo3b2o32b

2o3bo27bo3b2o31bo7b2o3bo27bo3b2o7bo$14bo38b2o45b2o39b4o38b4o34b4o

47b4o7b2o38b4o70b2o22b4o33bo2b2o2bo26b4o33bo2b3o28b4o51bo2b3o28b4o

40bo2b3o28b4o33bo2b3o28b4o33bo2b3o28b4o33bo2b3o16bo11b4o33bo2b3o

11bobo4bo9b4o33bo2b3o18bo9b4o33bo2b3o18bo9b4o34b2o4bo2b3o18bo9b4o$

15bo36bobo44bobo42bo41bo37bo50bo8bo41bo71bo25bo33b2obo4bo28bo33b2o

bo33bo51b2obo33bo40b2obo33bo33b2obo33bo33b2obo33bo33b2obo33bo33b2o

bo19bobo11bo33b2obo19bobo11bo33b2obo19bobo11bo33b2o5b2obo19bobo11b

o$53bo45bobob2o36b2obob2o35b2obob2o31b2obob2o44b2obob2o44b2obobo

92b2obobo34bo30b2obobo34bo30b2obobo52bo30b2obobo41bo30b2obobo34bo

30b2obobo34bo30b2obobo34bo30b2obobo34bo18bo2bo8b2obobo34bo18bo2bo

8b2obobo34bo18bo2bo8b2obobo41bo18bo2bo8b2obobo$100b2ob2o36bo2bob2o

34bobobo2bo30bobobo2bo43bobobo2bo38b2o3bobo2b2o93bo2b2o34b2o30bo2b

2o34b2o30bo2b2o52b2o30bo2b2o41b2o30bo2b2o34b2o30bo2b2o34b2o30bo2b

2o34b2o14b2o14bo2b2o34b2o18b2o10bo2b2o34b2o18b2o10bo2b2o34b2o18b2o

10bo2b2o41b2o18b2o10bo2b2o$135bo6b2o39bo3b2o31b2o3b2o44b2o3b2o38bo

bo2bo2bo95bobo68bobo68bobo86bobo75bobo68bobo45bo22bobo55b2o11bobo

68bobo68bobo68bobo75bobo$59b3o74b2o42bo85bobo49bo3b2o96b2o69b2o69b

2o87b2o76b2o69b2o46b2o21b2o55bo13b2o69b2o69b2o43b2o24b2o50b2o24b2o

$48b2o9bo75b2o41bobo86b2o10b2o102b3o461bobo209b2o68b2o76b2o6b2o$

49b2o9bo118b2o47bo38bo10bo2bo103bo10bo662bobo154b2o$48bo135b2o42b

2o3b2o43bo2bo102bo9bobo526bo135bo155bo$52b2o83b2o5b2o37b2o42bobo3b

obo43b2o39b3o72b2o452b3o71b2o130b2o$52bobo81bobo5bobo38bo47bo36b3o

49bo526bo72bobo129bobo15b2o69b2o76bobo$52bo85bo5bo127bo48bo528bo

78b3o68b3o53bo15b3o68b3o74bo$271bo5b2o119b3o528b3obo66b3obo67b2obo

67b2obo52bo21bo2bo$278b2o118bo531bobobo66bobobo68bobo68bobo52b2o3b

o15bobobo$277bo121bo531bo2bo67bo2bo67bo2bo67bo2bo51b2o3b2o16bo2bo$

932b2o69b2o69b2o69b2o57bobo8bo7b2o$850bo363bobo$850b2o361bo2bo$

845b2o2bobo19bo342b2o$844bobo23b2o338b2o$360b3o483bo7b2o14bobo336b

2o$362bo490bobo355bo$361bo493bo$1138b2o$1137b2o$1133b2o4bo$1132bob

o$1134bo$1144b2o$1143b2o$1145bo!

Sample occurrences

There are 1 sample soups in the Catagolue:

Unofficial symmetries

Symmetry	Soups	Sample soup links

oscthread_stdin	1	•

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