p73 lumps of muck hassler

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p73 lumps of muck hassler
x = 35, y = 33, rule = B3/S23 bo$b3o$4bo$3b2o6$22bo$21bobo3b2o$22bo4bobo$8b3o18bo$8bobo17b2ob2obo$8b o2bo19bob2o$9bobo19bo$3b2o4b3o11b3o4b2o$3bo19bobo$2obo19bo2bo$ob2ob2o 17bobo$5bo18b3o$5bobo4bo$6b2o3bobo$12bo6$30b2o$30bo$31b3o$33bo! #C [[ THUMBSIZE 2 THEME 6 GRID GRIDMAJOR 0 SUPPRESS THUMBLAUNCH ]] #C [[ AUTOSTART ]] #C [[ HEIGHT 500 THUMBSIZE 3 ZOOM 12 GPS 37 LOOP 73 ]]
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Pattern type Oscillator
Number of cells 68
Bounding box 35 × 33
Period 73 (mod: 73)
Heat 42.2
Volatility 0.89 | 0.89
Kinetic symmetry Unspecified
Discovered by Luke Kiernan
Year of discovery 2022

p73 lumps of muck hassler is a period-73 oscillator found by Luke Kiernan on October 30, 2022.[1] In terms of its minimum population of 68 cells, it is the smallest known oscillator of this period; it is also the first known oscillator of this period that does not rely on glider loops or Herschel track technology. It consists of two lumps of muck being hassled by a pair of bookend catalysts, a pair of tubs, and a pair of fishhooks.

The finding of this p73 completed one of David Raucci's partials, as shown below. The object being hassled is a medium-lifespan traffic light predecessor.

x = 90, y = 90, rule = B3/S23 24bo$24b3o$27bo$26b2o2$30bo$28b3o$35bo$27bo4bob3o$28bo4bo3bo7bo$29b3o 3b2o7bobo3b2o$31bob3o9bo4bobo$34bo17bo$51b2ob2obo$36b2o16bob2o$35bo2bo 15bo$26b2o8b2o5b2o8b2o$26bo15bo2bo$23b2obo16b2o$23bob2ob2o$28bo17bo$ 28bobo4bo9b3obo$29b2o3bobo7b2o3b3o$18b2o15bo7bo3bo4bo$2o16bo25b3obo4bo $bo17bo25bo$bobo12b4o30b3o$2b2o4bo7bo33bo$6bo2bo9b3o$6bo3bo8bo2bo30b2o $5b2o3bo10b2o30bo$10b2o42b3o$8bo47bo18b2o$9bobo45b2o16bo$8bo2b2o9bo35b o17bo$7b2ob2o3bo5bobo34bobo12b4o$8bobo3bobo5bo36b2o4bo7bo$9bo4bobo46bo 2bo9b3o$15bo27b3o17bo3bo8bo2bo$42bo19b2o3bo10b2o$42b3o22b2o$65bo$17bo 21b2o25bobo$16bobo4bo14bobo24bo2b2o9bo$10bo5bobo3bobo13bobo10bo12b2ob 2o3bo5bobo$9bobo5bo3b2ob2o12bo10bobo13bobo3bobo5bo$10bo9b2o2bo24bobo 14bo4bobo$21bobo25b2o21bo$24bo$21b2o22b3o$10b2o10bo3b2o19bo$10bo2bo8bo 3bo17b3o27bo$11b3o9bo2bo46bobo4bo$16bo7bo4b2o36bo5bobo3bobo$13b4o12bob o34bobo5bo3b2ob2o$13bo17bo35bo9b2o2bo$14bo16b2o45bobo$13b2o18bo47bo$ 33b3o42b2o$36bo30b2o10bo3b2o$35b2o30bo2bo8bo3bo$68b3o9bo2bo$39bo33bo7b o4b2o$37b3o30b4o12bobo$44bo25bo17bo$36bo4bob3o25bo16b2o$37bo4bo3bo7bo 15b2o$38b3o3b2o7bobo3b2o$40bob3o9bo4bobo$43bo17bo$60b2ob2obo$45b2o16bo b2o$44bo2bo15bo$35b2o8b2o5b2o8b2o$35bo15bo2bo$32b2obo16b2o$32bob2ob2o$ 37bo17bo$37bobo4bo9b3obo$38b2o3bobo7b2o3b3o$44bo7bo3bo4bo$53b3obo4bo$ 54bo$59b3o$59bo2$62b2o$62bo$63b3o$65bo! #C [[ THUMBSIZE 2 THEME 6 GRID GRIDMAJOR 0 SUPPRESS THUMBLAUNCH ]] #C [[ WIDTH 600 HEIGHT 600 THUMBSIZE 2 ZOOM 6 GPS 37 AUTOSTART ]]
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RLE: here Plaintext: here
Catagoluehere

LCM oscillators

The LCM oscillators below are listed due to being the smallest known ones by population, while also satisfying the condition that at least one cell oscillates at the full period. The oscillators are shown with visible envelopes, to highlight interactions between subpatterns.

x = 41, y = 35, rule = B3/S23 18b2o$2o16bo$bo17bo$bobo12b4o$2b2o12bo$19b3o$19bo2bo$21b2o2$12b3o$15bo$13bobo 6bo8b3o$14bo6bobo8b2o$22bo8b2o$32bo$28b2o$29bob2o$31bo$31bo2$38b2o$10bo21b2o 3bo2bo$9bobo6bo15bo3b2o$10bo6bobo10bo3bo$17bo12b4o$18b3o2$10b2o$10bo2bo$11b3o $16bo12b2o$13b4o12bobo$13bo17bo$14bo16b2o$13b2o! #C [[ THUMBSIZE 2 THEME 6 GRID GRIDMAJOR 0 SUPPRESS THUMBLAUNCH ]] #C [[ WIDTH 600 HEIGHT 600 THUMBSIZE 2 ZOOM 12 GPS 37 THEME BOOK STARTFROM 219 ]]
94P219 using caterer and hive five.
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Catagoluehere

References

  1. David Raucci (October 30, 2022). Re: Oscillator Discussion Thread (discussion thread) at the ConwayLife.com forums

See also

External links

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