The 2c/5 width-12 knightt search finished. I'm not sure how useful the resulting ships are.
Edit: I started the width-13 2c/5 search, which has found this new 65-cell ship:
Code: Select all
x = 24, y = 13, rule = B3/S23
19bobo$17b3o3bo$11b2o3bo5bo$10bo4b2o$5bo2bo2bo3bo4bo$b2ob2o3bo3b2obo2b
o$2obo5bo2b2o$bo2b5obo2b2obobo$2bo6bo6bo2bo$3b3ob3o6bo2bo$5bobo3bo5bob
2o$11bo5bo$20bo!
The ship can pull a well known p10 tagalong:
Code: Select all
x = 30, y = 14, rule = B3/S23
29bo$19bobo3b2o$17b3o3bob2o$11b2o3bo5bo6bo$10bo4b2o$5bo2bo2bo3bo4bo$b
2ob2o3bo3b2obo2bo$2obo5bo2b2o$bo2b5obo2b2obobo$2bo6bo6bo2bo$3b3ob3o6bo
2bo$5bobo3bo5bob2o$11bo5bo$20bo!
Edit 2: a new 85-cell 2c/5 ship:
Code: Select all
x = 26, y = 11, rule = B3/S23
5b2o8bob2o4b2o$b2ob3o8bo2bo3bo$2obo10bo2bo3b2ob2o$bobob2o2b2o4b2o3bo2b
3o$2b2ob2o12bo2bo$5bo2b2o3bob2o2bo3b2o$5bobo5bo4b2obob2o$5bo3bo7bobobo
$6bob2obo5bobo2b3o$7bo4b4obo5b2o$14bo3b3o!
Edit 3: a 78-cell ship and an 87-cell ship:
Code: Select all
x = 32, y = 38, rule = B3/S23
5b2o$b2ob3o$2obo25bo$bobob2o2b2o9b2o4bo3bo$2b2ob2o12bo3bo2bo3bo$5bo2b
2o3b2o4bo4bobo3bo$5bobo5bobob3o4b2o4bo$5bo3bo8bob2o7bo$6bob2ob2obo2bo
4bo2b4o$7bo7b2o8bo2bo$26b3o$27bob2o$28bo14$2b4o13bo$2bo2b2o11bob2o$2b
2o4bo7b2o4b2o$4bo3bo8bob2obo2b2o$9b2o3bo2b2o$4bo4bo4bobo9bo$4bobo6bo2b
o6bo2bo$b2obo3bo4b3o7bo2bo3b2o$b2o5bo2bo2b2o6bo6b2o$o6bo2bo4bo7b2obobo
bo$bo9b5o7b2obobobo$bo9b2obo10bo!
The 87-cell ship can support this small component, but it's not small enough for the small ships collection:
Code: Select all
x = 32, y = 16, rule = B3/S23
2b4o13bo$2bo2b2o11bob2o$2b2o4bo7b2o4b2o$4bo3bo8bob2obo2b2o$9b2o3bo2b2o
$4bo4bo4bobo9bo$4bobo6bo2bo6bo2bo$b2obo3bo4b3o7bo2bo3b2o$b2o5bo2bo2b2o
6bo6b2o$o6bo2bo4bo7b2obobobo$bo9b5o7b2obobobo$bo9b2obo10bo$7bo$4bob2o$
3b2o$4b2o2b2o!
Edit 4: a 62-cell c/4 orthogonal ship:
Code: Select all
x = 21, y = 12, rule = B3/S23
3b2o6b2o$2b2o3b2obo$2b3o2b2obobobo4bo$7bo6b2ob2obo$3bob2obo3bo3bobobo$
6bo3bo2b2obobo$b2o2bob2o5bo$2bo9bobo4b2o$2bo7bo2b2o5bo$o9bo3bo$2o8bobo
$o!