Of course many objects that exists in
B35/S23-j6 (https://catagolue.appspot.com/census/b35s23-j6/C1)
also exists there - but B358/S23-j6 is at the edge of being stable for random soups, and B358/S23-j6 (such as B35/S23-j6) have something like a natural spaceship (NS), as the glider, it is just moving orthogonally.
With these natural spaceships we can do everything we are used in B3/S23 - and even more.
Of cource there are many ways for the NSs to eliminate each other, here some examples:
Code: Select all
x = 95, y = 21, rule = B358/S23-j6
9$16b3o26b3o23b3o$14b5o7b3o14b5o21b5o$16b3o7b5o14b3o7b3o13b3o$26b3o26b
5o21b3o$55b3o23b5o$81b3o!
Code: Select all
x = 110, y = 19, rule = B358/S23-j6
5$94bo$94bo$93b3o$93b3o$93b3o$11b3o9b3o17b3o10b3o$9b5o9b5o13b5o10b5o$
11b3o9b3o17b3o10b3o2$86b3o$84b5o$86b3o!
Code: Select all
x = 83, y = 15, rule = B358/S23-j6
3$15bo$15bo$14b3o54b3o$14b3o24b3o27b5o$14b3o13b3o8b5o16b3o6b3o$28b5o8b
3o16b5o$30b3o29b3o$5b3o$3b5o$5b3o!
Code: Select all
x = 22, y = 22, rule = B358/S23-j6
5$17bo$17bo$16b3o$16b3o$16b3o6$10b3o$8b5o$10b3o!
Here a say standard one
Code: Select all
x = 31, y = 19, rule = B358/S23-j6
2$21bo$20bo$19bo2bo$20bo$21bo2$5b3o$3b5o$5b3o!
Code: Select all
x = 54, y = 37, rule = B358/S23-j6
12$33bo$32bo$31bo2bo$32bo$33bo2$18b3o$16b5o$18b3o!
Unfortunately, I can not run standard C1 soups on B358/S23-j6. However, based on https://catagolue.appspot.com/census/b358s23-j6/1x256 I got the linear growth:
Code: Select all
x = 40, y = 41, rule = B358/S23-j6
5$27b2o$27b2o$25bo5bo$24b2obo2bo$22bo4bo2bobobo$21bobo3bo8bo$21b2o8bo
4bo$21bobo3bo8bo$22bo4bo2bobobo$24b2obo2bo$25bo5bo$27b2o$27b2o2$27b2o$
27b2o$25bo5bo$24b2obo2bo$22bo4bo2bobobo$21bobo3bo8bo$21b2o8bo4bo$21bob
o3bo8bo$22bo4bo2bobobo$24b2obo2bo$25bo5bo$27b2o$27b2o!
Code: Select all
x = 37, y = 30, rule = B358/S23-j6
2$18b3o$7bobo9b3o$6bo2b2o8bob2o$7bobo9b3o$18b3o13$9bo15bo$8bobo13bobo$
11bo13b2o$7bo2bo$7bobo15bo$25bo$25bo!