Difference between revisions of "LifeWiki:Spaceship Search Status Page"
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m (added (2,2)c/8 (width-7) using Nicolay's version of WLS; established quick lower bounds for (2,0)c/8 and (2,1)c/8 with gfind; increased (3,1)c/8 to width-10 with knight2) |
m ((1,1)c/7 width-7 (Paul Tooke's gfind modification); (3,1)c/8 width-11 (knight2); (2,2)c/8 width-8 (Nicolay's WLS modification)) |
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| (1,1)c/7 | | (1,1)c/7 | ||
| style="background: #ffa0a0;" | | | style="background: #ffa0a0;" | 7 | ||
| style="background: #c0c0c0;" | - | | style="background: #c0c0c0;" | - | ||
| style="background: #c0c0c0;" | - | | style="background: #c0c0c0;" | - | ||
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| (2,2)c/8 | | (2,2)c/8 | ||
| style="background: #ffa0a0;" | | | style="background: #ffa0a0;" | 8 | ||
| style="background: #c0c0c0;" | - | | style="background: #c0c0c0;" | - | ||
| style="background: #c0c0c0;" | - | | style="background: #c0c0c0;" | - | ||
| Line 198: | Line 198: | ||
|- | |- | ||
| (3,1)c/8 | | (3,1)c/8 | ||
| style="background: #ffa0a0;" | | | style="background: #ffa0a0;" | 11<ref name="knight2"/> | ||
| style="background: #c0c0c0;" | - | | style="background: #c0c0c0;" | - | ||
| style="background: #c0c0c0;" | - | | style="background: #c0c0c0;" | - | ||
Revision as of 07:24, 21 December 2015
Known spaceships by width
| Velocity | Asymmetric | Odd-symmetric | Even-symmetric | Gutter | Odd glide-symmetric | Even glide-symmetric |
|---|---|---|---|---|---|---|
| (1,0)c/2 | 21 | 21 | 28 | 21 | - | - |
| (1,0)c/3 | 12 | 15 | 12 | 17 | - | - |
| (1,0)c/4 | 10 | 13 | 16 | 17 | - | - |
| (1,1)c/4 | 3 | - | - | - | - | - |
| (2,0)c/4 | 5 | 11 | 12 | 11 | 5 | 12 |
| (1,0)c/5 | 11 | 19 | 18 | 19 | - | - |
| (1,1)c/5 | 13[1] | - | - | - | - | - |
| (2,0)c/5 | 10 | 15 | 18 | 15 | - | - |
| (1,0)c/6 | 9 | 15 | 18 | 21 | - | - |
| (1,1)c/6 | 8[2] | - | - | - | - | - |
| (2,0)c/6 | 11 | 17 | 12 | 19 | 17 | 14 |
| (2,1)c/6 | 15[1] | - | - | - | - | - |
| (3,0)c/6 | 14 | 21 | 28 | 21 | - | - |
| (1,0)c/7 | 10 | 13 | 14 | 15 | - | - |
| (1,1)c/7 | 7 | - | - | - | - | - |
| (2,0)c/7 | 10[1] | 17[1] | 18 | 21[1] | - | - |
| (2,1)c/7 | 9[2] | - | - | - | - | - |
| (3,0)c/7 | 13[3] | 27[3] | 26[3] | 27[3] | - | - |
| (1,0)c/8 | 8[4] | 11 | 12 | 17[4] | - | - |
| (1,1)c/8 | 6 | - | - | - | - | - |
| (2,0)c/8 | 7 | 11 | 14 | 15 | 13 | 14 |
| (2,1)c/8 | 7 | - | - | - | - | - |
| (2,2)c/8 | 8 | - | - | - | - | - |
| (3,0)c/8 | 10[5] | 19[2] | 22[5] | 19[2] | - | - |
| (3,1)c/8 | 11[2] | - | - | - | - | - |
| (4,0)c/8 | 10 | 13 | 14 | 15 | 13 | 14 |
x = 946, y = 368, rule = B3/S23 7b3ob3o153b3ob3o189b3o2b4o2b3o200b3ob3o195b3o153b3o4b3o$6bo2bobo2bo 151bo2bobo2bo187bo3bob4obo3bo198bo2bobo2bo193bo2bo153bo2bo3bo2bo$5bo3b obo3bo149bo3bobo3bo185bo6bo2bo6bo196bo3bobo3bo195bo153bo6bo$5bo9bo149b o9bo185bo3b2o6b2o3bo196bo9bo195bo153bo6bo$7bo5bo153bo5bo189bo12bo200bo 5bo194bobo155bobo4bobo$4bobo7bobo147bobo7bobo183bobo14bobo194bobo7bobo $3b2obob2ob2obob2o145b2obob2ob2obob2o181b2obob2o8b2obob2o192b2obob2ob 2obob2o$2bobobo2bobo2bobobo143bobobo2bobo2bobobo179bobobob2o8b2obobobo 190bobobo2bobo2bobobo$b2obo4bobo4bob2o141b2obo4bobo4bob2o177b2o3bo2bo 8bo2bo3b2o188b2obo4bobo4bob2o$o3bob2obobob2obo3bo139bo3bob2obobob2obo 3bo175bo3bobo2b2o6b2o2bobo3bo186bo3bob2obobob2obo3bo$4bo4bobo4bo147bo 4bobo4bo182bo20bo193bo4bobo4bo$2o3bo2bo3bo2bo3b2o139b2o3bo2bo3bo2bo3b 2o175b2o24b2o186b2o3bo2bo3bo2bo3b2o9$780bo$779bobo$778bo3bo$779b3o2$ 777b2o3b2o$774b2o3bobo3b2o$774b2o3bobo3b2o$772b2o5bobo5b2o$776b2obobob 2o$9b2o159bo198b2o202b3o9b3o184bo6bobo6bo$5b2obo2bob2o154bobo193b2obo 2bob2o197bobob2o5b2obobo186b2o2bobo2b2o$5b2o6b2o153bo3bo192b2o6b2o197b obobo7bobobo184bo2bobo3bobo2bo$5bobo4bobo154b3o193bobo4bobo198bob2ob2o b2ob2obo185b2o11b2o$7b2o2b2o354b2o2b2o204bobobobo189b2o11b2o$6b2ob2ob 2o153b2o3b2o192b2ob2ob2o201bobobobobobo190bo7bo$8bo2bo153bo3bobo3bo 192bo2bo202b2obobobobob2o189b3o3b3o$6bo6bo150b2o3bobo3b2o189bo6bo200b 3o2bobo2b3o191bo3bo$6bo6bo149bo5bobo5bo188bo6bo200b2o2bo3bo2b2o188b2ob o3bob2o$164bob2obobob2obo396bo4b2ob2o4bo189b2o3b2o$6b8o352b8o199bo13bo 189bobobobo$5b2o6b2o350b2o6b2o$777bo2bo2bo$778b2ob2o$777b2o3b2o$774b2o bo5bob2o$774b2o3b3o3b2o$774bob9obo$778b2ob2o$778bo3bo$776bo2bobo2bo$ 777bobobobo$779bobo$774bo3bo3bo3bo$773b3o2bobobo2b3o$772bo3bobo3bobo3b o$773bobo2bob2o2bo2bo$777b5o2b2o$780bo3bo$781bobo$13bo29b3o122bo3bo33b 3o3b3o151bo6bo31b3o4b3o162b3ob3o32b3o3b3o155bobo$13bo29bo2bo121bo3bo 32bo2bo3bo2bo150bo6bo30bo2bo4bo2bo162bo3bo32bo2bo3bo2bo$12bobo28bo123b 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11b3o761bo9bo$10b4o762bo7bo$9bo2bo762b2ob5ob2o$11bo764bo2bobo2bo$11bo 765bobobobo$8b2o$8b3o767b2ob2o$9bo768bo3bo$10bo766b2o3b2o$10b2o158bo 36bo5bo563b2o3b2o$170bo35b3o3b3o$11bo158bo34bo2bo3bo2bo561b2o3b2o$9b2o 155bo3bo3bo29b3o7b3o559bo2bobo2bo$163bobob2obob2obobo27bobo5bobo563bob o$162b2obobob3obobob2o28b2o3b2o562bo2bobo2bo$161bo3bo9bo3bo23bo4bo3bo 4bo557b2ob2ob2ob2o$161bobobob2o3b2obobobo28bo3bo562b4obob4o$165b2obo3b ob2o27b2o3bo3bo3b2o561b3o$162b2obo9bob2o26bo2bo3bo2bo564bo$165b2o2bobo 2b2o31bo5bo155b2o32bo12bo157bo11bo30bo5bo$165bobobobobobo193b2o31bobo 10bobo154b2obobo5bobob2o27b3o3b3o155bo$167bobobobo193bob2obo28b2ob2o8b 2ob2o156bob2o3b2obo29bo2bo3bo2bo153b4o$167bobobobo191b3o4b3o26b2o14b2o 153b2obo3bobo3bob2o25b3o7b3o150b2o3b2o$167bobobobo188b2o12b2o25bo12bo 155b3o2bobobobo2b3o26bobo5bobo151b2o3b2o$164b2obobobobob2o185b2o2bob4o bo2b2o25b4o6b4o160bobobobo33b2o3b2o152bob3o2bo$163bobobobobobobobo188b obo2bobo29bo2b2o4b2o2bo157bo2bobobobo2bo26bo4bo3bo4bo147bo2b2o2bo$164b 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bob2o194b3obobobobob3o$4bo2bo35bo319b3o3b2o3b3o195bo6bobo6bo$4b7o32bo 319bo12bo198bo3bobo3bo$5bo2b3o33bobo318b2o2b2o2b2o203b2ob2o$5bo5bo34b 2o317b10o197bo2b2o2bobo2b2o2bo$6bobob2o31b2ob2o317bob2o2b2obo197bo2bob 2o3b2obo2bo$12bo354bo4bo200b2o11b2o$5b2o5bo29bo325bo2bo$4bobobob2obo 28bobo321bobo2bobo199bobo9bobo$5bo3bobo31bo321b2ob4ob2o198bo2bo7bo2bo$ 13bo28b2o321b2ob4ob2o198bo3bo5bo3bo$8bo3bo29b2o322bo6bo201bo2bo3bo2bo$ 6b3o35bo320b3o4b3o200b2o7b2o$6bo2b4o29b2o2b2o315bobo8bobo$9bo36b2o314b o14bo197bob3ob3obo$6bo6bo32bo315b2ob2o6b2ob2o195b2o2b3ob3o2b2o$6b3obo 2bo196bo36b3ob3o111b2o6b2o198b2o2bo5bo2b2o$8b2o3bo195bobo34bo2bobo2bo 109b2ob6ob2o198b2o9b2o$9b3obo194bo3bo32bo3bobo3bo106b2obo8bob2o196b3o 7b3o$8bo4b2o194b3o33bo9bo110bo6bo199bob2ob2ob2ob2obo$7b2o2b3o233bo5bo 319b3o2b2ob2o2b3o$7b2o2bo195b2o3b2o30bobo7bobo316bobo3bobo3bobo$7bo2bo 193b2o3bobo3b2o26b2obob2ob2obob2o108b8o202b3o3b3o$8bo195b2o3bobo3b2o 25bobobo2bobo2bobobo107b2o4b2o201bob2o3b2obo$10bo191b2o5bobo5b2o22b2ob 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573b3o9b3o$573b3o9b3o$574b3o7b3o$577b2o3b2o$573b2o11b2o$573bo3bobobobo 3bo$572bo2b2o7b2o2bo$575b2o2bobo2b2o$576bob2ob2obo2$577b2o3b2o$576bo2b obo2bo$575bobobobobobo$572b4obobobobob4o$571bo4bo2bobo2bo4bo$572bobo4b obo4bobo$403bo12bo157b3o7b3o$403bo12bo159bob2ob2obo$402bobo10bobo154bo 4b2o3b2o4bo$403bo12bo154b2o4bo5bo4b2o$403bo12bo154b2o15b2o$404bo3b4o3b o156bo2b2o2bobo2b2o2bo$408b4o163b4o3b4o$404b4o4b4o160b2o5b2o$578bo3bo$ 406bo6bo160b2obo5bob2o$407b2o2b2o160bobo2bo3bo2bobo$574b2ob2o3b2ob2o2$ 574bob3o3b3obo$574b2o9b2o$574bo11bo2$572b3o11b3o2$573b6o3b6o$12bo560b 2obo2bobo2bob2o$11bobo560bobo2bobo2bobo$10bo2bo560bobobo3bobobo$11b2o 561bo2bo5bo2bo$574bo2b2o3b2o2bo$7bo5bo564bo3bo$6bobo3bo560bo5bobo5bo$ 5bo2bo3b2o559b2o2bobobobo2b2o$5bo2b2o3bo562b2obobob2o$577bobobobo$578b o3bo$578b2ob2o$576bobo3bobo$577bo5bo$578bo3bo$577b3ob3o$575b3obobob3o$ 575bobobobobobo$576bo2bobo2bo$576bo2bobo2bo$575b3obobob3o$574bo4bobo4b o$575bo3bobo3bo$576bo7bo$573bobo9bobo$574b2o9b2o$572bo15bo$573bo2bo7bo 2bo$575bobo5bobo$576bo7bo2$572b3o11b3o$574b3o7b3o$574bo2bo5bo2bo2$574b o11bo$574bobo7bobo$575b3o5b3o$576b2o5b2o$576bobo3bobo$577bo5bo20$572b 2o13b2o25bob3o3b3obo30b3ob3o$574bobo7bobo26b2ob2obobob2ob2o28bo2bobo2b o$571bo3bob2o3b2obo3bo22bo2b2o2bobo2b2o2bo26bo3bobo3bo$572b5o7b5o27bo 2bobo2bo30bo9bo$612bo4bobobobo4bo28bo5bo$611b2o2bobobobobobo2b2o24bobo 7bobo$572bobo11bobo22b2o6bobo6b2o23b2obob2ob2obob2o$572bo3bobo3bobo3bo 23bobo3b2ob2o3bobo23bobobo2bobo2bobobo$572bo3b3o3b3o3bo24b2o2bobobobo 2b2o23b2obo4bobo4bob2o$578bo3bo29b2o2b2obobob2o2b2o21bo3bob2obobob2obo 3bo$575bobo5bobo33bobo32bob3o3b3obo$577bo5bo29bo5bobo5bo22b2o3bo2b2ob 2o2bo3b2o$578b2ob2o29bobo3b2ob2o3bobo25b2o9b2o$579bobo35bobobobo30bo 11bo$576b2obobob2o27bo3b2obobob2o3bo24bobo9bobo$575bo3bobo3bo26bobo4bo bo4bobo23bo15bo$572b2o5bobo5b2o25bo4bobo4bo27bo11bo$571bobo5bobo5bobo 21b2o6bobo6b2o21b2obo11bob2o$572b2o2b2obobob2o2b2o26b3obobob3o24bo3b2o 9b2o3bo$572bo3b2obobob2o3bo24bo4b2ob2o4bo23bo2bo11bo2bo$572b2o5bobo5b 2o22b2o6bobo6b2o26b2o5b2o$572bo15bo22bobo2b2obobob2o2bobo23b2ob2o5b2ob 2o$573bo4bo3bo4bo31bobo31b4o7b4o$578bo3bo32b2o2bobo2b2o26b2o4b2ob2o4b 2o$578b2ob2o31b2o2bo3bo2b2o29bob2ob2obo$618b2ob2o32b5ob5o$576b2o5b2o 29b2o9b2o28b2o7b2o$576b2o5b2o29b2o9b2o$574bo11bo26bobo9bobo30b2ob2o$ 574bobo7bobo25bo15bo29bo3bo$574bobo7bobo25bo15bo28bo5bo$612bo15bo29bo 3bo$573bobob2o3b2obobo26b3o7b3o$574b3ob2ob2ob3o30bo5bo$575bob3ob3obo 29bobo5bobo$574b2o9b2o30b2o3b2o$575b5ob5o30bob2ob2obo$572bob3o2bobo2b 3obo26bo3bobo3bo$572b3o3b2ob2o3b3o26bo2bo3bo2bo$574bo2b2o3b2o2bo$575b 2o7b2o31b2o3b2o$616bo2bobo2bo$576b2obobob2o34bobo$575bo3bobo3bo30b2obo bob2o$576b2obobob2o31b2obobob2o$574bobob2ob2obobo28b2o2bobo2b2o$573bo 3bo5bo3bo29bo5bo$574b2o9b2o$576bo7bo$574bo11bo$572b2o13b2o$572bo2bo9bo 2bo$571bo17bo$572bo4b2o3b2o4bo$574b2ob2o3b2ob2o$578b2ob2o2$577b3ob3o!
Known spaceships by height
| Velocity | minimum height |
|---|---|
| (1,0)c/2 | 8 |
| (1,0)c/3 | 5 |
| (1,0)c/4 | 8 |
| (2,0)c/4 | 6 |
| (1,0)c/5 | 8 |
| (2,0)c/5 | 11 |
| (1,0)c/6 | 9 |
| (2,0)c/6 | 7 |
| (3,0)c/6 | 9 |
| (1,0)c/7 | 8 |
| (2,0)c/7 | 8 |
| (3,0)c/7 | 7 |
All results checked by Matthias Merzenich using WLS.
x = 65, y = 70, rule = B3/S23 6bo17bo$5b3o15b3o$3b2ob3o13b3ob2o$4bo2bob2o4bo4b2obo2bo$b2obo4bobob2ob 2obobo4bob2o$b2obobo2bobo7bobo2bobob2o$bo8b3obobob3o8bo$2o7b2o9b2o7b2o 13$15bo$8b2ob3ob3o$8b2o4bo2b2ob2o$7bo2bob2o3bo2b2o$19bo2bo16$3bo53bo$ 3bo7b3o11b3o28b3o$2bobo4b2o5b3o36b2obo$9b5ob5o4bo2bo27b3o$7bobo2bo2bo 3bo5bo30b2o$3b6o3bo2b2o4b6o$4b2o6bobo2b2o3bo$14bo6bo13$11bo7bo33bo$5b 2obobob2o3b2obobob2o26b3o$2b3obob3o9b3obob3o22bo3bo$2bo3bobo5bobo5bobo 3bo22b2ob2o5bo$6b2o6bobo6b2o36b2o$3b2o9bobo9b2o22b4obo5bob2o$3b2ob2o 15b2ob2o23bo2bo2b3o2bo$7bo15bo33b3o$61bo$61bob2o!
References
- ↑ 1.0 1.1 1.2 1.3 1.4 Tim Coe (December 18, 2015). "Re: 3c/7 othogonal and 2c/9 diagonal spaceships". Retrieved on December 18, 2015.
- ↑ 2.0 2.1 2.2 2.3 2.4 Checked with knight2.c
- ↑ 3.0 3.1 3.2 3.3 Checked by Paul Tooke with gfind
- ↑ 4.0 4.1 Tanner Jacobi (December 16, 2015). "Re: 3c/7 othogonal and 2c/9 diagonal spaceships". Retrieved on December 17, 2015.
- ↑ 5.0 5.1 Tanner Jacobi (December 4, 2015). "Re: 3c/7 othogonal and 2c/9 diagonal spaceships". Retrieved on December 4, 2015.