xp34_y732acy1ca23wggoy7oggw32acy1ca23zydo8gy132yb23y1g8oz2egoy4ggx643y54m2gxg2m4y5346xggy4oge2zy778dy6ccy13y13y1ccy6d87zwc453x8oy1o8y7g434x434gy78oy1o8x354czy3311y3113y435c6y16c53y4311y3113

#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 34.
	This pattern runs in standard life (b3s23).
	The population fluctuates between 184 and 330.
	This evolutionary sequence works in multiple rules, from b3s23 through to b3s236i.

Pattern RLE

Code: Select all

Glider synthesis

Code: Select all

#C [[ GRID MAXGRIDSIZE 14 THEME Catagolue ]] 

#CSYNTH xp34_y732acy1ca23wggoy7oggw32acy1ca23zydo8gy132yb23y1g8oz2egoy4ggx643y54m2gxg2m4y5346xggy4oge2zy778dy6ccy13y13y1ccy6d87zwc453x8oy1o8y7g434x434gy78oy1o8x354czy3311y3113y435c6y16c53y4311y3113 costs 69 gliders (true).

#CLL state-numbering golly

x = 1100, y = 125, rule = B3/S23

1095bo$1093b2o$1094b2o5$1089bo$1088bo$1088b3o5$1061bobo$1062b2o$

1062bo$1077bo$1077bobo$1077b2o2$1097bo$1097bobo$1038bo58b2o$1039bo

$886bobo148b3o$886b2o190bobo$887bo137bo52b2o$199bobo763bo57bobo32b

o20bo$200b2o763b3o56b2o32b3o$200bo685bo81bo92bo$887bo79b2o91b2o$

885b3o2$990bo90b2o$887bobo98b2o90bo2bo$887b2o100b2o89bo2bo$265bo

52bo52bo53bo78bo67bo78bo62bo81bo80bo10bo52bo19bo92bo26b2o$263b3o

50b3o50b3o51b3o76b3o65b3o76b3o60b3o79b3o78b3o61bobo3bobo11b3o76b2o

12b3o$155bobo104bo52bo52bo53bo78bo67bo78bo62bo81bo80bo65b2o3b2o11b

o78bo2bo10bo$156b2o56bo47b2o3bo47b2o3bo47b2o3bo48b2o3bo73b2o3bo62b

2o3bo73b2o3bo57b2o3bo76b2o3bo11bo63b2o3bo66bo11b2o3bo25b3o45bo2bo

10b2o3bo$156bo3b3o50bobo50bobo50bobo50bobo51bobo76bobo65bobo76bobo

60bobo79bobo11bo66bobo81bobo24bo48b2o15bobo$160bo53b2o51b2o51b2o

51b2o52b2o77b2o66b2o77b2o61b2o80b2o9b3o67b2o82b2o25bo65b2o$161bo

652bobo267bo$105bo708b2o77b2o82b2o91b2o10b2o$104bo96bo311b2o66b2o

77b2o61b2o80b2o8bo70b2o5bobo74b2o5bobo83b2o5bobo10b2o$104b3o93bo

312b2o66b2o77b2o61b2o15bo64b2o79b2o7bo74b2o7bo83b2o7bo$99bobo98b3o

538bo153b2o82b2o91b2o$100b2o49b2o54b2o51b2o51b2o51b2o52b2o77b2o66b

2o77b2o61b2o28b3o49b2o79b2o82b2o91b2o$6bo93bo49bobo53bobo50bobo50b

obo50bobo51bobo76bobo65bobo76bobo60bobo33bobo43bobo78bobo81bobo80b

o9bobo$5bo38bo105bo47bobo5bo52bo52bo52bo53bo78bo67bo78bo62bo35b2o

44bo33b2o45bo33b2o48bo33b2o48b2o7bo33b2o$5b3o35bo105b2o48b2o4b2o

51b2o51b2o51b2o52b2o16bo60b2o66b2o77b2o61b2o36bo43b2o33bobo43b2o

33bobo46b2o33bobo46b2o7b2o33bobo$obo40b3o153bo236bobo75b2o66b2o77b

2o61b2o80b2o18bo60b2o18bo63b2o18bo72b2o18bo$b2o35bobo15b2o47b2o47b

2o54b2o51b2o51b2o51b2o52b2o11b2o64b2o10b2o54b2o10b2o65b2o10b2o49b

2o10b2o68b2o10b2o18b2o47b2o10b2o18b2o50b2o10b2o18b2o59b2o10b2o18b

2o$bo37b2o14bobo32b2o12bobo32b2o12bobo39b2o12bobo36b2o12bobo36b2o

12bobo36b2o12bobo37b2o12bobo62b2o12bobo51b2o12bobo62b2o12bobo46b2o

12bobo65b2o12bobo64b2o12bobo67b2o12bobo76b2o12bobo$39bo15bo33bobo

12bo33bobo12bo40bobo12bo37bobo12bo37bobo12bo37bobo12bo38bobo12bo

63bobo12bo52bobo12bo29bo33bobo12bo47bobo12bo66bobo12bo65bobo12bo

68bobo12bo77bobo12bo$54b2o33bo13b2o33bo13b2o40bo13b2o37bo13b2o37bo

13b2o37bo13b2o38bo13b2o13b2o48bo13b2o52bo13b2o29bobo31bo13b2o47bo

13b2o66bo13b2o65bo13b2o68bo13b2o77bo13b2o$88b2o47b2o54b2o51b2o51b

2o51b2o52b2o27b2o48b2o30bo35b2o44b2o31b2o61b2o80b2o79b2o82b2o91b2o

$437bo78bo67b2o77b2o61b2o80b2o79b2o82b2o91b2o$516b3o65b2o77b2o61b

2o80b2o79b2o82b2o91b2o$521b2o$520b2o57bo78bo62bo81bo80bo$522bo56bo

78bo62bo81bo80bo82b3o90b3o$579bo78bo62bo81bo80bo3$584bo447bobo$

452b2o128b2o449b2o$314b2o51b2o52b2o29bobo45b2o66b2o13b2o62b2o61b2o

80b2o79b2o82b2o74bo16b2o36bobo$315bo52bo53bo29bo48bo67bo78bo62bo

81bo80bo83bo92bo36b2o$261bo53bobo50bobo51bobo76bobo65bobo76bobo60b

obo79bobo78bobo81bobo90bobo35bo$261b2o53b2o51b2o52b2o77b2o14b2o50b

2o11b2o64b2o10b2o49b2o10b2o68b2o10b2o67b2o10b2o70b2o10b2o79b2o10b

2o$260bobo255bobo62bobo75b2o61b2o80b2o79b2o82b2o91b2o$265b3o96b2o

52b2o77b2o19bo46b2o16bo60b2o61b2o80b2o79b2o82b2o91b2o$265bo99bo53b

o78bo67bo78bo62bo81bo80bo83bo92bo$266bo44bo53bobo51bobo76bobo65bob

o76bobo60bobo79bobo78bobo81bobo90bobo$311b2o53b2o52b2o77b2o66b2o

77b2o61b2o80b2o79b2o82b2o91b2o$310bobo582b2o82b2o91b2o$315b3o342b

2o61b2o80b2o79b2o7bo48bo25b2o7bo83b2o7bo9b2o$315bo57bo286b2o61b2o

80b2o8bo70b2o5bobo49bo24b2o5bobo83b2o5bobo8b2o$316bo56bobo438b2o

77b2o48b3o31b2o91b2o11bo$373b2o271bo167bobo$427b2o77b2o66b2o68bobo

6b2o61b2o80b2o9b3o67b2o82b2o91b2o$426bobo76bobo65bobo69b2o5bobo60b

obo79bobo11bo66bobo81bobo73b2o15bobo$371b2o54bo78bo67bo78bo57b2o3b

o76b2o3bo11bo63b2o3bo64b2o12b2o3bo73bo2bo10b2o3bo$372b2o337bo81bo

80bo70b2o11bo78bo2bo10bo$371bo275b2o63b3o79b3o78b3o66bo14b3o76b2o

12b3o$648b2o64bo81bo80bo10bo72bo92bo26b2o$647bo239b2o100bo90bo2bo$

887bobo93b2o3b2o90bo2bo$982bobo3bobo90b2o$984bo$885b3o$887bo79b2o

91b2o$886bo81bo92bo$965b3o56b2o32b3o$965bo57bobo32bo20bo$887bo137b

o52b2o$886b2o190bobo$886bobo148b3o$1039bo$1038bo58b2o$1097bobo$

1097bo2$1077b2o$1077bobo$1077bo$1062bo$1062b2o$1061bobo5$1088b3o$

1088bo$1089bo5$1094b2o$1093b2o$1095bo!

Sample occurrences

There are 5 sample soups in the Catagolue:

Unofficial symmetries

Symmetry	Soups	Sample soup links

b3s23osc_stdin	3	• • •

oscthread_stdin	2	• •

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