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Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: January 19th, 2017, 10:04 pm
by dvgrn
Goldtiger997 wrote:16.2318 in 12 gliders (bad cleanup)...
That can easily be reduced by one glider, in at least a couple of ways (found via the Seeds of Destruction Game). Saving another glider looks harder though:
Code: Select all
x = 148, y = 66, rule = B3/S23
75bo5bo3bobo$75b2o5b2ob2o$74bobo4b2o3bo3$119b2o$10bo30bo39bo38bo$11bo
29bo39bo35b3o$9b3o29bo39bo35bo$115b2o$113bo2bobo$10b2o101b2o2b2o$bo7bo
bo$2bo8bo75b2o$3o32bo39bo11bobo$34bobo37bobo10bo$3b3o28bobo37bobo$5bo
29bo39bo$4bo31$47b2o$46bobo$48bo7$145b2o$145bobo$145bo3$135bo$134b2o$
134bobo!
Code: Select all
x = 181, y = 50, rule = B3/S23
158bo$158bobo$158b2o2$126bo29bo$75bo5bo3bobo38bo29bo$75b2o5b2ob2o39bo
29bo$74bobo4b2o3bo3$119b2o28b2o28b2o$10bo30bo39bo38bo29bo29bo$11bo29bo
39bo35b3o27b3o27b3o$9b3o29bo39bo35bo29bo29bo$115b2o28b2o28b2o$113bo2bo
bo24bo2bobo24bo2bobo$10b2o101b2o2b2o24b2o2b2o24b2o2b2o$bo7bobo$2bo8bo
75b2o$3o32bo39bo11bobo$34bobo37bobo10bo$3b3o28bobo37bobo$5bo29bo39bo$
4bo4$110b2o28b2o$110b2o28b2o2$116b2o23bo4b2o$115bobo23b2o2bobo$116bo
23bobo3bo15$115b3o$115bo$116bo!
EDIT: Goldtiger997 wrote:16.1110 in 8 gliders with no cleanup (I wasn't satisfied with any of the cleanups I found)...
Yeah, that looks like a messy one. Seeds of Destruction quickly turns up a large ugly suppression with three more gliders, from which I conclude there's probably a way to do it with two:
Code: Select all
x = 152, y = 137, rule = B3/S23
149bobo$149b2o$150bo56$106bo$105bo$105b3o18$bo$2bo$3o10$63bobo$63b2o$
64bo32$26bo$26bobo$20bobo3b2o8bo$20b2o12b2o$21bo13b2o$24b2o12b3o$23b2o
6bo6bo$25bo4bo8bo$30b3o2$27b3o$27bo$28bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: January 19th, 2017, 10:26 pm
by BlinkerSpawn
This reduces 16.2205 by one, pushing 16.2207 down to 1 glider/bit:
Code: Select all
x = 46, y = 57, rule = B3/S23
obo$b2o$bo26$36bo$32bo3bobo$33bo2b2o$31b3o2$42bo$41bo$41b3o4$24bo$24bo
$24bo5$36b2o6b2o$36b2o5b2o$45bo2$27b2o$26bobo$28bo$22b2o$21bobo7b2o$
23bo7bobo$31bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: January 20th, 2017, 7:27 am
by Goldtiger997
16.1848 in 12 gliders:
Code: Select all
x = 136, y = 49, rule = B3/S23
61bo$59bobo$60b2o7$95bo$93b2o$94b2o12$6bo46bobo$5bo48b2o$5b3o46bo$2bo$
3b2o39b2o38b2o43b2o$2b2o39bo2bo36bo2bo42bo$44b2o38b2o44b3o$38bo39bo53b
o$37bobo37bobo53b2o$3o34bo2bo36bo2bo49b3o2bo$o37b2o38b2o4bo45bo3b2o$bo
82b2o$83bobo$87b3o$87bo$88bo$92bo$92bobo$92b2o$95b2o$75b3o17bobo$77bo
17bo$76bo$78b3o$78bo$79bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: January 20th, 2017, 7:55 am
by chris_c
I pushed an update with a few improvements and these new costs from this thread:
Code: Select all
+16.2204 xs16_0gilla4z641 16
+16.2207 xs16_0gs2dicz641 15
+16.2205 xs16_0gjlka4z641 14
+16.1109 xs16_gs2dicz65 13
+16.2208 xs16_0gs2dioz641 13
+16.1848 xs16_0jiq453z32 12
+16.2182 xs16_0gjp6426z32 12
+16.1110 xs16_gs2dioz65 11
+16.2318 xs16_0gjp6413z32 11
There are now 66 still lifes without synthesis in the collection in 59 equivalence classes:
Code: Select all
x = 26, y = 1168, rule = Life
2o2bo$o2bobo$2b2o2bo$4b2o$2b2o$bobo$2bo14$2o$o2b2o$2b2o$5bo$2b4o$2bo$
3bo$2b2o13$o2bo2b2o$4o3bo$4b3o$2bobo$2b2o16$o2bo$6o$6bo$2bo2bobo$bobo
2bo$2bo15$2b2o$bo2bo$ob2o2bo$bo2b3o$3bo$4bo$3b2o14$2bo$bobo$o2bo$b3ob
2o$4bobo$3bo$2bo$2b2o13$2b2o$bobo$o2bob2o$b3o2bo$4bo$3bo$3b2o14$2b2o$b
obo$o3b2o$b2obobo$3bo2bo$3bobo$4bo14$2b2o$bo2bo$o2b2o$b2o2b2o$3bobo$3b
obo$4bo14$2b2o$bo2bo$o2bo$b2ob3o$3bo2bo$3bobo$4bo14$2bo$bobo2bo$o2b4o$
b2o$3b2o$3bobo$4bo14$2b2obo$bob2obo$o5bo$b3obo$3bob2o16$2b2ob2o$bobobo
$o5bo$b4obo$3bobo16$3b2o$b3o$o4bo$b5o2$3bo$2bobo$3bo13$3bo$b3o2bo$o3b
3o$b2o$3b2o$3bobo$4bo14$3bobo$b4obo$o5bo$b3obo$3bob2o16$3b2o$b3obo$o5b
o$bo5bo$2bob3o$3b2o15$2b2o$bobo2b2o$o6bo$b2o3bo$2bo2bo$2bobo$3bo14$2bo
$bobo$o2b3o$b2o3bo$2bo2b2o$o$2o14$2b2o$bobo$o2bobo$b2ob2o$2bo$obo$2o
14$3b2o$b3obo$o4bo$b4o$2bo$o$2o14$2ob2o$bobobo$o5bo$b4obo$3bobo16$2obo
bo$bob2obo$o5bo$b5o$3bo16$2obo$bob3o$o5bo$b4obo$3bobo16$3bobo$o2b2obo$
3o3bo$3bobo$2b2ob2o16$b2obo$o2b2o$2o3b2o$2b2o2bo$2bob2o16$b2o$o2bo$ob
2o2bo$bo2b3o$3bo$4bo$3b2o14$b2o$o2bo$obo2bo$bob2obo$3bo2bo$3bobo$4bo
14$bo19bo$obob2o14bobob2o$ob2obo14bob2obo$bo19bo$3b2o18b2o$4bo19bo$2bo
20bo$2b2o19b2o13$bo$obo2b2o$obo3bo$bob3o$3bo$2bo$2b2o14$bob2o$ob2obo$o
5bo$bob2obo$2b2obo16$b2ob2o$obobo$o5bo$bo3b2o$2bobo$3b2o15$b2ob2o$obob
o$obo2bo$bobobo$2bobo$3bo15$b2o$obo$o2b2o$b2o2bo$2bob2o$2bo$b2o14$2b2o
$bobo$bo2b2o$2o4bo$4b3o$3bo$3b2o14$3bobo$3b2obo$b2o3bo$o2bobo$bobob2o$
2bo15$2b2o$3bo$bo2b2o$ob2o2bo$bo2b2o$3bo$2b2o14$3b2o$3bo$2obo2bo$obob
3o$3bo$4bo$3b2o14$4b2o$3bo2bo$2o2b2o$ob2o$3bo$obo$2o14$2b2o$3bo$3o$o2b
3o$2bo2bo$obo$2o14$2b2obo14bob2o$2bob2o14b2obo$obo20bobo$2o2b2o14b2o2b
2o$5bo14bo$3bo17bo$3b2o15b2o14$b2o$2b3o$o4bo$4obo$4bo$2bo$2b2o14$b2o$
2bo$o2b2o$3o2bo$3b3o$2bo$2b2o14$2b2o$bo2bo$o2bobo$4obo$4bo$2bo$2b2o14$
3bo$b3o$o$6o$5bo$2bo$bobo$2bo13$3bo$b3o$o$ob2o$bobo$3bob2o$3b2obo14$2b
o$bobo$obo$o4bo$b5o2$3bo$2bobo$3bo12$2b2o$3bo$3o$o$b2o$3bo$3b3o$6bo$5b
2o12$4b2o$4bo$2o3bo$o5bo$bo3b2o$2bo2bo$3bobo$4bo13$3bo$2bobo$o2bobo$2o
bobo$bob2o$bo$2o14$4bo$3bobo$3bo2bo$b2o2b2o$o$3o$3bo$2b2o13$3bo$2bobo$
3bobo$bobobo$obobo$obo$bobo$2bo13$2b2o17b2o$bo2bo16bo2bo$2b2obo16b2obo
$4bo19bo$4o16b4o$o19bo$bo19bo$2o18b2o13$2obo$ob2o$4b2o$b2o2bo$o2b2o$2o
15$2bob2o$2b2obo$2o$bob2o$o2b2o$2o15$3b2o$3bobo$bobo2bo$obobobo$obob2o
$bo15$2b2o$2bo$3bo$3o2bo$o2b3o$2bo$3bo$2b2o13$4b2o$5bo$2b3o$2bo2b3o$3b
o3bo$3o$o14$4bo$3bobo$3bo2bo$2b2o3bo$2bo3b2o$3bo$3o$o!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: January 20th, 2017, 8:53 am
by Goldtiger997
16.233 in 11 gliders (16.233 was in the previously posted collection of equivalence classes):
Code: Select all
x = 72, y = 53, rule = B3/S23
69bo$69bobo$69b2o16$25bo$26bo$24b3o$obo$b2o$bo31bo3bo$31bobob2o$32b2o
2b2o8$46bo$45bo$45b3o2$49bo$33bo14b2o$34bo13bobo$32b3o$36bo$36bobo$36b
2o4$29b3o$31bo$30bo$32b3o$32bo$33bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: January 20th, 2017, 12:10 pm
by AbhpzTa
Goldtiger997 wrote:16.1848 in 12 gliders:
Code: Select all
x = 136, y = 49, rule = B3/S23
61bo$59bobo$60b2o7$95bo$93b2o$94b2o12$6bo46bobo$5bo48b2o$5b3o46bo$2bo$
3b2o39b2o38b2o43b2o$2b2o39bo2bo36bo2bo42bo$44b2o38b2o44b3o$38bo39bo53b
o$37bobo37bobo53b2o$3o34bo2bo36bo2bo49b3o2bo$o37b2o38b2o4bo45bo3b2o$bo
82b2o$83bobo$87b3o$87bo$88bo$92bo$92bobo$92b2o$95b2o$75b3o17bobo$77bo
17bo$76bo$78b3o$78bo$79bo!
10 gliders:
Code: Select all
x = 136, y = 42, rule = B3/S23
24bo$22bobo$23b2o8$6bo$5bo$5b3o$2bo$3b2o39b2o43b2o38b2o$2b2o39bo2bo42b
o39bo$44b2o44b3o37b3o$38bo53bo39bo$37bobo53b2o38b2o$3o34bo2bo49b3o2bo
34b3o2bo$o37b2o4bo45bo3b2o34bo3b2o$bo42b2o$43bobo$47b3o$47bo$48bo$52bo
bo36b2o$52b2o37b2o$53bo34b2o$56bo30bobo$55b2o32bo$55bobo8$22b3o$24bo$
23bo!
Goldtiger997 wrote:16.233 in 11 gliders (16.233 was in the previously posted collection of equivalence classes):
Code: Select all
x = 72, y = 53, rule = B3/S23
69bo$69bobo$69b2o16$25bo$26bo$24b3o$obo$b2o$bo31bo3bo$31bobob2o$32b2o
2b2o8$46bo$45bo$45b3o2$49bo$33bo14b2o$34bo13bobo$32b3o$36bo$36bobo$36b
2o4$29b3o$31bo$30bo$32b3o$32bo$33bo!
9 gliders:
Code: Select all
x = 177, y = 24, rule = B3/S23
93bobo$94b2o$obo91bo80bo$b2o62bo108bo$bo22bo38bobo59b2o37bo6bo2b3o$23b
o40b2o55b2o2b2o35b3o6b2o$23b3o34b3o58b2o38bo9b2o$62bo97bo2b2o7bo$61bo
12b3o57b3o23b3obo$22b3o138bo$22bo49bo5bo53bo5bo23bo$23bo48bo5bo53bo5bo
23b2o$72bo5bo53bo5bo2$74b3o57b3o2$122bo$120bobo$121b2o2b3o$125bo$126bo
2$60b2o58b2o$60b2o58b2o!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: January 21st, 2017, 12:24 am
by Goldtiger997
16.1862 in 9 gliders:
Code: Select all
x = 48, y = 30, rule = B3/S23
bo$2bo$3o6$34bo$33bo$33b3o$31bo$29bobo$30b2o4$21bobo$22b2o12bo$22bo11b
2o$35b2o2$38b2o5b2o$37bobo4b2o$39bo6bo2$24bo$24b2o20b2o$23bobo19b2o$
47bo!
16.957 in 8 gliders:
Code: Select all
x = 40, y = 29, rule = B3/S23
37bobo$37b2o$27b2o9bo$26b2o$10bo12b2o3bo$8bobo13b2o$9b2o12bo$obo$b2o$b
o$25b2o$25bobo$25bo11$35bo$34b2o$34bobo$7b3o$9bo$8bo!
EDIT:
16.211 in 13 gliders:
Code: Select all
x = 38, y = 52, rule = B3/S23
19bo$17b2o$18b2o$10bo$11b2o$10b2o10bo$22bobo$22b2o$12bo$10bobo$11b2o$
20bo$19bo$15bo3b3o$16b2o$15b2o20bo$22bo12b2o$20b2o14b2o$21b2o$32bo$31b
o$22bo8b3o$21bo$21b3o$32b3o$32bo$33bo2$21bo$20b2o$20bobo19$3o$2bo$bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: January 31st, 2017, 12:15 am
by Goldtiger997
16.1697 in 11 gliders:
Code: Select all
x = 144, y = 49, rule = B3/S23
48bobo$49b2o$49bo$71bobo$71b2o$72bo5$41bobo$42b2o$42bo$51b3o36b2o28b2o
18b2o$26b2o25bo2b2o32bo29bo19bo$25bo2bo23bo2bo2bo28b2obobo24b2obobo14b
2obobo$26b2o28b2o29bobobobo23bobobobo13bobobobo$91bobo27bobo17bobo$o3b
o85bobo27bobo17bobo$b2obobo5bo32b2o43b2o28b2o19bo$2o2b2o5b2o31b2o$11bo
bo32bo78b2o$125bobo$125bo$121b3o$40b2o81bo$39bobo80bo$28b2o11bo16b2o$
28b2o28b2o18$76b2o$76bobo$76bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: January 31st, 2017, 12:35 pm
by BobShemyakin
Goldtiger997 wrote:16.1697 in 11 gliders:
Code: Select all
x = 144, y = 49, rule = B3/S23
48bobo$49b2o$49bo$71bobo$71b2o$72bo5$41bobo$42b2o$42bo$51b3o36b2o28b2o
18b2o$26b2o25bo2b2o32bo29bo19bo$25bo2bo23bo2bo2bo28b2obobo24b2obobo14b
2obobo$26b2o28b2o29bobobobo23bobobobo13bobobobo$91bobo27bobo17bobo$o3b
o85bobo27bobo17bobo$b2obobo5bo32b2o43b2o28b2o19bo$2o2b2o5b2o31b2o$11bo
bo32bo78b2o$125bobo$125bo$121b3o$40b2o81bo$39bobo80bo$28b2o11bo16b2o$
28b2o28b2o18$76b2o$76bobo$76bo!
Only 12 gliders: stroked objects interact before.
Code: Select all
x = 144, y = 49, rule = B3/S23
48bobo$49b2o$49bo$71bobo$71b2o$72bo5$41bobo$42b2o$42bo$51b3o36b2o28b2o
18b2o$26b2o25bo2b2o32bo29bo19bo$25bo2bo23bo2bo2bo28b2obobo24b2obobo14b
2obobo$26b2o15bo2bo9b2o29bobobobo23bobobobo13bobobobo$49bo41bobo27bobo
17bobo$o3bo36bo48bobo27bobo17bobo$b2obobo5bo32b2o5bo37b2o28b2o19bo$2o
2b2o5b2o31b2o$11bobo27bo4bo8bo69b2o$125bobo$43bo14bo66bo$121b3o$40b2o
4bo14bo61bo$39bobo80bo$28b2o11bo7bo8b2o$28b2o28b2o2bo$52bo$55bo$58bo2b
o15$76b2o$76bobo$76bo!
Bob Shemyakin
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: January 31st, 2017, 1:10 pm
by chris_c
BobShemyakin wrote:Goldtiger997 wrote:16.1697 in 11 gliders:
Only 12 gliders: stroked objects interact before.
Well spotted. Also the first 3G collision does not produce the correct constellation for the second step. The block is displaced by one cell in the x-direction. I will hopefully update the lists tomorrow.
EDIT: Pushed an update with the following new costs. Hope I didn't miss anything.
Code: Select all
+16.211 xs16_32qjc453 13
+16.1697 xs16_4a5la8czx23 13
+16.1848 xs16_0jiq453z32 10
+16.233 xs16_178jt246 9
+16.1862 xs16_31km9a4z0121 9
+16.957 xs16_31kmiozw56 8
EDIT2: List of all still lifes without synthesis in 15 gliders sorted by Catagolue frequency:
Code: Select all
16.1854 xs16_39s0ca4z321 16 696398
16.656 xs16_8o6p96z1221 18 179699
16.1973 xs16_0ggm9icz1243 16 43214
16.776 xs16_2llm853z01 17 34628
16.1928 xs16_c88q552z311 17 33895
16.761 xs16_4aqb96z32 999 23266
16.157 xs16_330fhar 24 12900
16.143 xs16_4a9r2pm 999 12075
16.124 xs16_69ari96 27 10365
16.1113 xs16_0gs2arz3421 20 9193
16.2186 xs16_wml1e8z643 20 8663
16.643 xs16_o4o7picz01 999 8218
16.739 xs16_2l2s53z321 16 8029
16.150 xs16_5b8ra96 999 7223
16.128 xs16_65pajkc 999 6736
16.738 xs16_3lka96z121 24 5411
16.149 xs16_5b8ri96 17 4685
16.202 xs16_354cgn96 27 4612
16.657 xs16_695q4ozw321 16 4403
16.1752 xs16_695q84ozx121 999 4250
16.800 xs16_c8al96z311 19 4172
16.645 xs16_caikm96zw1 16 3993
16.131 xs16_660uhar 32 3702
16.1706 xs16_2ege9a4zw23 999 3655
16.121 xs16_3pq3pm 999 2747
16.663 xs16_69r4koz023 999 2661
16.1701 xs16_4a9jc4ozx121 999 2425
16.1856 xs16_39u06a4z32 16 2408
16.626 xs16_69n8jdzx1 999 2282
16.1739 xs16_g88r2qkz121 20 2219
16.1716 xs16_4a9mk46zx121 999 2174
16.1880 xs16_259q453z032 25 1975
16.665 xs16_699mkiczx1 18 1857
16.829 xs16_0md1e8z1226 23 1475
16.142 xs16_5b8raic 999 1465
16.641 xs16_c9baiczw32 999 1429
16.748 xs16_39ege2z321 17 1372
16.799 xs16_c8al56z311 17 1176
16.642 xs16_6s1raa4zw1 53 1101
16.228 xs16_178bp2sg 20 1047
16.2017 xs16_039s0ccz2521 18 975
16.159 xs16_2egmd1e8 21 960
16.765 xs16_4ap78cz321 999 926
16.686 xs16_mkkb2acz1 39 903
16.152 xs16_5b8r9ic 999 897
16.2309 xs16_8kk31e8z641 21 779
16.846 xs16_caab8oz0252 999 684
16.1696 xs16_4a9mk4ozx121 17 639
16.19 xs16_caarz39c 18 505
16.810 xs16_ca9la4z311 16 471
16.1992 xs16_25is0cczw65 16 470
16.1881 xs16_259q453zw32 19 433
16.813 xs16_c4lb8oz321 999 425
16.834 xs16_8u15a4z1226 25 422
16.774 xs16_69raa4z32 21 419
16.691 xs16_co2ticz23 999 419
16.1863 xs16_4aq32acz32 17 381
16.360 xs16_2egu16413 16 360
16.848 xs16_ca9b8oz0252 18 359
16.2014 xs16_25a8kk8z0253 17 340
16.717 xs16_31kmp3z032 33 337
16.827 xs16_ciaj2ak8zw1 999 329
16.1717 xs16_4aajk46zx121 999 328
16.995 xs16_0raik8z643 16 320
16.666 xs16_q6ge1daz01 17 308
16.1722 xs16_4aq32acz032 17 307
16.1940 xs16_c48q552z321 999 281
16.716 xs16_3pmk46zx23 32 272
16.265 xs16_259m861ac 17 270
16.1757 xs16_g8idik8z123 18 267
16.2060 xs16_69akg4czx56 16 260
16.1773 xs16_ciarzx3213 999 259
16.1703 xs16_4a9la8ozx121 999 250
16.647 xs16_8k4r2pmzw1 999 241
16.740 xs16_3l2s53z121 16 236
16.153 xs16_4a9r8jd 999 227
16.18 xs16_caarzbd 19 208
16.1684 xs16_4aab9k8zx32 19 163
16.2174 xs16_08u164koz32 27 160
16.1768 xs16_mk461acz121 17 157
16.353 xs16_321fgc453 23 155
16.1740 xs16_69acga6zx32 23 155
16.1143 xs16_ciligozw4a4 999 154
16.668 xs16_gbq1daz121 17 152
16.2503 xs16_ckl3zx32ac 999 147
16.1990 xs16_8e1tazx1252 18 143
16.1857 xs16_39u0652z32 16 141
16.144 xs16_4aar2pm 999 141
16.243 xs16_2egu16426 16 138
16.2018 xs16_25a8c826zw33 18 125
16.619 xs16_j9ajkcz11 999 120
16.819 xs16_ra178cz23 999 120
16.126 xs16_69ir9ic 999 117
16.1112 xs16_0gs2arz6421 26 114
16.822 xs16_8ehikozw56 16 112
16.2445 xs16_ciligzx254c 16 105
16.1787 xs16_069m4koz311 16 104
16.1699 xs16_8e13kkozx32 999 99
16.953 xs16_0cil56z6221 16 98
16.1991 xs16_8e1qbzx1252 17 97
16.1929 xs16_0g5r8b5z121 16 94
16.213 xs16_35861tic 23 89
16.15 xs16_178c1f84c 17 83
16.2295 xs16_0g8go8brz23 24 74
16.1755 xs16_696o8a6z032 999 73
16.921 xs16_ghn831e8z1 16 73
16.155 xs16_3pabp46 18 72
16.634 xs16_ca9diczw32 999 71
16.839 xs16_g8idicz1252 999 70
16.1694 xs16_4a5p6o8zx121 19 65
16.2347 xs16_g8861acz0db 28 64
16.1847 xs16_39c8a52z033 23 62
16.628 xs16_kc32qkz0113 28 62
16.1954 xs16_8kk31e8z065 21 61
16.731 xs16_3iajkcz23 28 57
16.836 xs16_4aajkczx56 20 57
16.833 xs16_0mp2sgz1243 20 56
16.616 xs16_i5pajoz11 17 53
16.640 xs16_c9bkkozw32 999 49
16.854 xs16_4aab9czw252 999 45
16.801 xs16_08eharz321 19 43
16.1904 xs16_8u164koz32 32 41
16.230 xs16_178jd2ko 19 39
16.1743 xs16_696o8a6zw32 999 39
16.795 xs16_c87p46z311 53 39
16.2132 xs16_0g8it2sgz23 17 38
16.927 xs16_4akgf9zw65 18 38
16.313 xs16_3pm44og4c 35 36
16.804 xs16_c871arzx32 999 36
16.1106 xs16_0iu0dbz641 25 35
16.1691 xs16_4a9l6o8zx121 999 35
16.1754 xs16_695m88czx23 999 35
16.442 xs16_0cai3z4aip 17 32
16.2201 xs16_0ggml96z641 18 32
16.1304 xs16_0okih3zc8421 16 32
16.312 xs16_62s53zbd 29 31
16.1391 xs16_ca168ozc8421 16 31
16.1976 xs16_g8861acz1156 999 29
16.1994 xs16_0g9fgka4z121 16 28
16.929 xs16_3iaj2ak8zw1 999 28
16.1704 xs16_4a9fg4czx32 999 28
16.2541 xs16_g8861aczc93 28 28
16.1846 xs16_25a8c93zw33 23 27
16.227 xs16_5b8r5426 17 23
16.856 xs16_kc32acz1252 16 23
16.623 xs16_o5r8jdz01 27 23
16.914 xs16_8kkja952zx1 18 22
16.1791 xs16_03lkaa4z3201 20 19
16.1096 xs16_ckjaa4z641 18 19
16.1464 xs16_08o696z6ip 16 18
16.1702 xs16_4a5p68ozx121 23 18
16.706 xs16_39s0qmz023 24 17
16.1766 xs16_kc321e8z123 16 17
16.101 xs16_0c9jzi5dz11 21 15
16.2219 xs16_0oe12koz643 16 14
16.350 xs16_312461tic 16 14
16.621 xs16_g5r8jdz11 25 14
16.723 xs16_i5p64koz11 20 14
16.1034 xs16_3lkaa4z065 24 13
16.1962 xs16_4a9eg8ozw65 999 13
16.1723 xs16_4ap64koz032 999 13
16.2820 xs16_wmk4871z643 25 13
16.915 xs16_0gs2pmz1243 20 12
16.1790 xs16_178cia4z0321 18 12
16.803 xs16_c9bk46z311 17 12
16.1323 xs16_031e8gzc9311 29 11
16.177 xs16_25b8r54c 16 11
16.278 xs16_32qj43146 29 11
16.786 xs16_3pa3ia4zw11 28 11
16.724 xs16_j5o64koz11 16 11
16.1758 xs16_4a4o796zw121 17 10
16.996 xs16_2lm853z056 16 9
16.2542 xs16_g88c871zc93 16 9
16.2546 xs16_j9cz122c84c 16 9
16.1115 xs16_08kaarz6221 17 8
16.1018 xs16_3p6o8ge2zw1 27 8
16.2302 xs16_4ap6413z65 16 8
16.682 xs16_69j0j9czx11 999 8
16.838 xs16_ci9b8ozw56 16 8
16.3163 xs16_wo443123zbd 17 8
16.872 xs16_2lla8oz065 20 7
16.695 xs16_5b8bl8zx32 25 7
16.1995 xs16_cik8a52z065 18 7
16.2630 xs16_31e8gzxo9a6 16 6
16.1680 xs16_8e123ckzx311 17 6
16.1127 xs16_giligoz104a4 32 6
16.2322 xs16_raak8zx1252 16 6
16.3227 xs16_31e8gzy012ego 27 5
16.147 xs16_32qjap3 32 5
16.772 xs16_3h4e1daz011 16 5
16.1753 xs16_695q4gozw23 21 5
16.2547 xs16_j9cz122c826 16 5
16.2805 xs16_0gs2c871z641 16 4
16.591 xs16_1784cggc4go 27 4
16.2029 xs16_25ao4a4z2521 16 4
16.106 xs16_31246116853 17 4
16.926 xs16_3iajc4gozw1 21 4
16.3066 xs16_4a9jzx12ego 23 4
16.151 xs16_64kr2pm 999 4
16.2058 xs16_69akg4czx146 20 4
16.778 xs16_69la8oz321 36 4
16.1967 xs16_o86178cz056 16 4
16.713 xs16_o8bap3z23 24 4
16.1107 xs16_02egdbz2521 18 3
16.1867 xs16_069q453z311 17 3
16.2030 xs16_0i5q8a52z121 16 3
16.1882 xs16_259m453zx23 17 3
16.358 xs16_321fgc2ko 19 3
16.354 xs16_35s26zbd 29 3
16.1080 xs16_3lo0kcz3421 16 3
16.1710 xs16_4a9bk46zx32 16 3
16.828 xs16_4alhe8z0641 28 3
16.1861 xs16_4ap64koz32 999 3
16.2305 xs16_6413ia4z6421 16 3
16.890 xs16_696ki6zw641 999 3
16.889 xs16_696ki6zx65 999 3
16.1911 xs16_69q3213z32 18 3
16.1685 xs16_c48n98czx23 999 3
16.842 xs16_cila8oz065 34 3
16.1105 xs16_gie0dbz146 18 3
16.944 xs16_gjlka4z56 999 3
16.762 xs16_jhke1e8z1 16 3
16.1901 xs16_08obap3z32 25 2
16.2862 xs16_08u16413z65 16 2
16.2204 xs16_0gilla4z641 16 2
16.220 xs16_3123qajo 29 2
16.349 xs16_35s26z39c 35 2
16.380 xs16_4a40vh248c 17 2
16.1720 xs16_4a4o79ozx121 16 2
16.875 xs16_4a5pa4z2521 18 2
16.771 xs16_69qb8oz32 16 2
16.300 xs16_9fg4czbd 23 2
16.840 xs16_c8idiczw56 16 2
16.1094 xs16_cila8oz641 40 2
16.2096 xs16_wck5b8oz311 999 2
16.1675 xs16_xj96z0mdz32 16 2
16.2025 xs16_069q48cz2521 18 1
16.2699 xs16_08o6413zrm 16 1
16.2313 xs16_08u16853z32 23 1
16.2162 xs16_0at16426z32 19 1
16.2447 xs16_0g8it248cz23 18 1
16.104 xs16_0j5ozj4pz11 16 1
16.2460 xs16_0o861aczc452 16 1
16.593 xs16_3123c48gka4 16 1
16.1864 xs16_31ke1e8z032 16 1
16.185 xs16_32qk5b8o 30 1
16.1064 xs16_39m88cz6221 24 1
16.745 xs16_39qb8oz32 19 1
16.1085 xs16_3h4e12koz011 16 1
16.2480 xs16_3iaczw1139c 18 1
16.930 xs16_3iaj21e8zw1 25 1
16.1073 xs16_3lkaa4z641 20 1
16.218 xs16_3pajc48c 33 1
16.712 xs16_3pc0qmzw23 48 1
16.843 xs16_4a9liczx56 17 1
16.2694 xs16_4ai3gzx11mq 17 1
16.825 xs16_4alhe8zw65 25 1
16.1979 xs16_4ap30ga6zw121 999 1
16.1721 xs16_64kb2acz032 35 1
16.1715 xs16_64p784czw23 17 1
16.2050 xs16_6ik8a52z065 19 1
16.1682 xs16_8k9bkk8zw23 999 1
16.1912 xs16_at16426z32 19 1
16.1711 xs16_c8idik8z023 18 1
16.3134 xs16_c9jzw122c826 17 1
16.2317 xs16_cik8a52z641 16 1
16.1970 xs16_ckw3lozw1243 999 1
16.943 xs16_gilla4z56 999 1
16.821 xs16_o8blgozw56 999 1
16.2861 xs16_ol3zw343146 17 1
16.3164 xs16_wo443146zbd 17 1
16.2784 xs16_woe12koz6221 999 1
EDIT3: The above list looks like it could be useful. Here is 16.1854 in 6G:
Code: Select all
x = 58, y = 41, rule = B3/S23
34bo$34bobo$34b2o$56b2o$31bobo22b2o$32b2o$32bo4$30b2o$30bobo$30bo26$b
2o$obo$2bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 1st, 2017, 2:44 pm
by AbhpzTa
BobShemyakin wrote:Goldtiger997 wrote:16.1697 in 11 gliders:
Code: Select all
x = 144, y = 49, rule = B3/S23
48bobo$49b2o$49bo$71bobo$71b2o$72bo5$41bobo$42b2o$42bo$51b3o36b2o28b2o
18b2o$26b2o25bo2b2o32bo29bo19bo$25bo2bo23bo2bo2bo28b2obobo24b2obobo14b
2obobo$26b2o28b2o29bobobobo23bobobobo13bobobobo$91bobo27bobo17bobo$o3b
o85bobo27bobo17bobo$b2obobo5bo32b2o43b2o28b2o19bo$2o2b2o5b2o31b2o$11bo
bo32bo78b2o$125bobo$125bo$121b3o$40b2o81bo$39bobo80bo$28b2o11bo16b2o$
28b2o28b2o18$76b2o$76bobo$76bo!
Only 12 gliders: stroked objects interact before.
Code: Select all
x = 144, y = 49, rule = B3/S23
48bobo$49b2o$49bo$71bobo$71b2o$72bo5$41bobo$42b2o$42bo$51b3o36b2o28b2o
18b2o$26b2o25bo2b2o32bo29bo19bo$25bo2bo23bo2bo2bo28b2obobo24b2obobo14b
2obobo$26b2o15bo2bo9b2o29bobobobo23bobobobo13bobobobo$49bo41bobo27bobo
17bobo$o3bo36bo48bobo27bobo17bobo$b2obobo5bo32b2o5bo37b2o28b2o19bo$2o
2b2o5b2o31b2o$11bobo27bo4bo8bo69b2o$125bobo$43bo14bo66bo$121b3o$40b2o
4bo14bo61bo$39bobo80bo$28b2o11bo7bo8b2o$28b2o28b2o2bo$52bo$55bo$58bo2b
o15$76b2o$76bobo$76bo!
Bob Shemyakin
At most 11 gliders:
Code: Select all
x = 33, y = 26, rule = B3/S23
bo3bo11b2o$2bobobo10b2o$3o2b2o5$19bo$18b2o$18bobo$10b3o$12bo$11bo4$10b
3o$12bo$11bo$18b3o$18bo12b2o$19bo10b2o$32bo$4b2o$3bobo$5bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 4th, 2017, 3:26 am
by Goldtiger997
chris_c wrote:
EDIT2: List of all still lifes without synthesis in 15 gliders sorted by Catagolue frequency:
Code: Select all
16.1854 xs16_39s0ca4z321 16 696398
16.656 xs16_8o6p96z1221 18 179699
16.1973 xs16_0ggm9icz1243 16 43214
16.776 xs16_2llm853z01 17 34628
16.1928 xs16_c88q552z311 17 33895
16.761 xs16_4aqb96z32 999 23266
16.157 xs16_330fhar 24 12900
16.143 xs16_4a9r2pm 999 12075
16.124 xs16_69ari96 27 10365
16.1113 xs16_0gs2arz3421 20 9193
16.2186 xs16_wml1e8z643 20 8663
16.643 xs16_o4o7picz01 999 8218
16.739 xs16_2l2s53z321 16 8029
16.150 xs16_5b8ra96 999 7223
16.128 xs16_65pajkc 999 6736
16.738 xs16_3lka96z121 24 5411
16.149 xs16_5b8ri96 17 4685
16.202 xs16_354cgn96 27 4612
16.657 xs16_695q4ozw321 16 4403
16.1752 xs16_695q84ozx121 999 4250
16.800 xs16_c8al96z311 19 4172
16.645 xs16_caikm96zw1 16 3993
16.131 xs16_660uhar 32 3702
16.1706 xs16_2ege9a4zw23 999 3655
16.121 xs16_3pq3pm 999 2747
16.663 xs16_69r4koz023 999 2661
16.1701 xs16_4a9jc4ozx121 999 2425
16.1856 xs16_39u06a4z32 16 2408
16.626 xs16_69n8jdzx1 999 2282
16.1739 xs16_g88r2qkz121 20 2219
16.1716 xs16_4a9mk46zx121 999 2174
16.1880 xs16_259q453z032 25 1975
16.665 xs16_699mkiczx1 18 1857
16.829 xs16_0md1e8z1226 23 1475
16.142 xs16_5b8raic 999 1465
16.641 xs16_c9baiczw32 999 1429
16.748 xs16_39ege2z321 17 1372
16.799 xs16_c8al56z311 17 1176
16.642 xs16_6s1raa4zw1 53 1101
16.228 xs16_178bp2sg 20 1047
16.2017 xs16_039s0ccz2521 18 975
16.159 xs16_2egmd1e8 21 960
16.765 xs16_4ap78cz321 999 926
16.686 xs16_mkkb2acz1 39 903
16.152 xs16_5b8r9ic 999 897
16.2309 xs16_8kk31e8z641 21 779
16.846 xs16_caab8oz0252 999 684
16.1696 xs16_4a9mk4ozx121 17 639
16.19 xs16_caarz39c 18 505
16.810 xs16_ca9la4z311 16 471
16.1992 xs16_25is0cczw65 16 470
16.1881 xs16_259q453zw32 19 433
16.813 xs16_c4lb8oz321 999 425
16.834 xs16_8u15a4z1226 25 422
16.774 xs16_69raa4z32 21 419
16.691 xs16_co2ticz23 999 419
16.1863 xs16_4aq32acz32 17 381
16.360 xs16_2egu16413 16 360
16.848 xs16_ca9b8oz0252 18 359
16.2014 xs16_25a8kk8z0253 17 340
16.717 xs16_31kmp3z032 33 337
16.827 xs16_ciaj2ak8zw1 999 329
16.1717 xs16_4aajk46zx121 999 328
16.995 xs16_0raik8z643 16 320
16.666 xs16_q6ge1daz01 17 308
16.1722 xs16_4aq32acz032 17 307
16.1940 xs16_c48q552z321 999 281
16.716 xs16_3pmk46zx23 32 272
16.265 xs16_259m861ac 17 270
16.1757 xs16_g8idik8z123 18 267
16.2060 xs16_69akg4czx56 16 260
16.1773 xs16_ciarzx3213 999 259
16.1703 xs16_4a9la8ozx121 999 250
16.647 xs16_8k4r2pmzw1 999 241
16.740 xs16_3l2s53z121 16 236
16.153 xs16_4a9r8jd 999 227
16.18 xs16_caarzbd 19 208
16.1684 xs16_4aab9k8zx32 19 163
16.2174 xs16_08u164koz32 27 160
16.1768 xs16_mk461acz121 17 157
16.353 xs16_321fgc453 23 155
16.1740 xs16_69acga6zx32 23 155
16.1143 xs16_ciligozw4a4 999 154
16.668 xs16_gbq1daz121 17 152
16.2503 xs16_ckl3zx32ac 999 147
16.1990 xs16_8e1tazx1252 18 143
16.1857 xs16_39u0652z32 16 141
16.144 xs16_4aar2pm 999 141
16.243 xs16_2egu16426 16 138
16.2018 xs16_25a8c826zw33 18 125
16.619 xs16_j9ajkcz11 999 120
16.819 xs16_ra178cz23 999 120
16.126 xs16_69ir9ic 999 117
16.1112 xs16_0gs2arz6421 26 114
16.822 xs16_8ehikozw56 16 112
16.2445 xs16_ciligzx254c 16 105
16.1787 xs16_069m4koz311 16 104
16.1699 xs16_8e13kkozx32 999 99
16.953 xs16_0cil56z6221 16 98
16.1991 xs16_8e1qbzx1252 17 97
16.1929 xs16_0g5r8b5z121 16 94
16.213 xs16_35861tic 23 89
16.15 xs16_178c1f84c 17 83
16.2295 xs16_0g8go8brz23 24 74
16.1755 xs16_696o8a6z032 999 73
16.921 xs16_ghn831e8z1 16 73
16.155 xs16_3pabp46 18 72
16.634 xs16_ca9diczw32 999 71
16.839 xs16_g8idicz1252 999 70
16.1694 xs16_4a5p6o8zx121 19 65
16.2347 xs16_g8861acz0db 28 64
16.1847 xs16_39c8a52z033 23 62
16.628 xs16_kc32qkz0113 28 62
16.1954 xs16_8kk31e8z065 21 61
16.731 xs16_3iajkcz23 28 57
16.836 xs16_4aajkczx56 20 57
16.833 xs16_0mp2sgz1243 20 56
16.616 xs16_i5pajoz11 17 53
16.640 xs16_c9bkkozw32 999 49
16.854 xs16_4aab9czw252 999 45
16.801 xs16_08eharz321 19 43
16.1904 xs16_8u164koz32 32 41
16.230 xs16_178jd2ko 19 39
16.1743 xs16_696o8a6zw32 999 39
16.795 xs16_c87p46z311 53 39
16.2132 xs16_0g8it2sgz23 17 38
16.927 xs16_4akgf9zw65 18 38
16.313 xs16_3pm44og4c 35 36
16.804 xs16_c871arzx32 999 36
16.1106 xs16_0iu0dbz641 25 35
16.1691 xs16_4a9l6o8zx121 999 35
16.1754 xs16_695m88czx23 999 35
16.442 xs16_0cai3z4aip 17 32
16.2201 xs16_0ggml96z641 18 32
16.1304 xs16_0okih3zc8421 16 32
16.312 xs16_62s53zbd 29 31
16.1391 xs16_ca168ozc8421 16 31
16.1976 xs16_g8861acz1156 999 29
16.1994 xs16_0g9fgka4z121 16 28
16.929 xs16_3iaj2ak8zw1 999 28
16.1704 xs16_4a9fg4czx32 999 28
16.2541 xs16_g8861aczc93 28 28
16.1846 xs16_25a8c93zw33 23 27
16.227 xs16_5b8r5426 17 23
16.856 xs16_kc32acz1252 16 23
16.623 xs16_o5r8jdz01 27 23
16.914 xs16_8kkja952zx1 18 22
16.1791 xs16_03lkaa4z3201 20 19
16.1096 xs16_ckjaa4z641 18 19
16.1464 xs16_08o696z6ip 16 18
16.1702 xs16_4a5p68ozx121 23 18
16.706 xs16_39s0qmz023 24 17
16.1766 xs16_kc321e8z123 16 17
16.101 xs16_0c9jzi5dz11 21 15
16.2219 xs16_0oe12koz643 16 14
16.350 xs16_312461tic 16 14
16.621 xs16_g5r8jdz11 25 14
16.723 xs16_i5p64koz11 20 14
16.1034 xs16_3lkaa4z065 24 13
16.1962 xs16_4a9eg8ozw65 999 13
16.1723 xs16_4ap64koz032 999 13
16.2820 xs16_wmk4871z643 25 13
16.915 xs16_0gs2pmz1243 20 12
16.1790 xs16_178cia4z0321 18 12
16.803 xs16_c9bk46z311 17 12
16.1323 xs16_031e8gzc9311 29 11
16.177 xs16_25b8r54c 16 11
16.278 xs16_32qj43146 29 11
16.786 xs16_3pa3ia4zw11 28 11
16.724 xs16_j5o64koz11 16 11
16.1758 xs16_4a4o796zw121 17 10
16.996 xs16_2lm853z056 16 9
16.2542 xs16_g88c871zc93 16 9
16.2546 xs16_j9cz122c84c 16 9
16.1115 xs16_08kaarz6221 17 8
16.1018 xs16_3p6o8ge2zw1 27 8
16.2302 xs16_4ap6413z65 16 8
16.682 xs16_69j0j9czx11 999 8
16.838 xs16_ci9b8ozw56 16 8
16.3163 xs16_wo443123zbd 17 8
16.872 xs16_2lla8oz065 20 7
16.695 xs16_5b8bl8zx32 25 7
16.1995 xs16_cik8a52z065 18 7
16.2630 xs16_31e8gzxo9a6 16 6
16.1680 xs16_8e123ckzx311 17 6
16.1127 xs16_giligoz104a4 32 6
16.2322 xs16_raak8zx1252 16 6
16.3227 xs16_31e8gzy012ego 27 5
16.147 xs16_32qjap3 32 5
16.772 xs16_3h4e1daz011 16 5
16.1753 xs16_695q4gozw23 21 5
16.2547 xs16_j9cz122c826 16 5
16.2805 xs16_0gs2c871z641 16 4
16.591 xs16_1784cggc4go 27 4
16.2029 xs16_25ao4a4z2521 16 4
16.106 xs16_31246116853 17 4
16.926 xs16_3iajc4gozw1 21 4
16.3066 xs16_4a9jzx12ego 23 4
16.151 xs16_64kr2pm 999 4
16.2058 xs16_69akg4czx146 20 4
16.778 xs16_69la8oz321 36 4
16.1967 xs16_o86178cz056 16 4
16.713 xs16_o8bap3z23 24 4
16.1107 xs16_02egdbz2521 18 3
16.1867 xs16_069q453z311 17 3
16.2030 xs16_0i5q8a52z121 16 3
16.1882 xs16_259m453zx23 17 3
16.358 xs16_321fgc2ko 19 3
16.354 xs16_35s26zbd 29 3
16.1080 xs16_3lo0kcz3421 16 3
16.1710 xs16_4a9bk46zx32 16 3
16.828 xs16_4alhe8z0641 28 3
16.1861 xs16_4ap64koz32 999 3
16.2305 xs16_6413ia4z6421 16 3
16.890 xs16_696ki6zw641 999 3
16.889 xs16_696ki6zx65 999 3
16.1911 xs16_69q3213z32 18 3
16.1685 xs16_c48n98czx23 999 3
16.842 xs16_cila8oz065 34 3
16.1105 xs16_gie0dbz146 18 3
16.944 xs16_gjlka4z56 999 3
16.762 xs16_jhke1e8z1 16 3
16.1901 xs16_08obap3z32 25 2
16.2862 xs16_08u16413z65 16 2
16.2204 xs16_0gilla4z641 16 2
16.220 xs16_3123qajo 29 2
16.349 xs16_35s26z39c 35 2
16.380 xs16_4a40vh248c 17 2
16.1720 xs16_4a4o79ozx121 16 2
16.875 xs16_4a5pa4z2521 18 2
16.771 xs16_69qb8oz32 16 2
16.300 xs16_9fg4czbd 23 2
16.840 xs16_c8idiczw56 16 2
16.1094 xs16_cila8oz641 40 2
16.2096 xs16_wck5b8oz311 999 2
16.1675 xs16_xj96z0mdz32 16 2
16.2025 xs16_069q48cz2521 18 1
16.2699 xs16_08o6413zrm 16 1
16.2313 xs16_08u16853z32 23 1
16.2162 xs16_0at16426z32 19 1
16.2447 xs16_0g8it248cz23 18 1
16.104 xs16_0j5ozj4pz11 16 1
16.2460 xs16_0o861aczc452 16 1
16.593 xs16_3123c48gka4 16 1
16.1864 xs16_31ke1e8z032 16 1
16.185 xs16_32qk5b8o 30 1
16.1064 xs16_39m88cz6221 24 1
16.745 xs16_39qb8oz32 19 1
16.1085 xs16_3h4e12koz011 16 1
16.2480 xs16_3iaczw1139c 18 1
16.930 xs16_3iaj21e8zw1 25 1
16.1073 xs16_3lkaa4z641 20 1
16.218 xs16_3pajc48c 33 1
16.712 xs16_3pc0qmzw23 48 1
16.843 xs16_4a9liczx56 17 1
16.2694 xs16_4ai3gzx11mq 17 1
16.825 xs16_4alhe8zw65 25 1
16.1979 xs16_4ap30ga6zw121 999 1
16.1721 xs16_64kb2acz032 35 1
16.1715 xs16_64p784czw23 17 1
16.2050 xs16_6ik8a52z065 19 1
16.1682 xs16_8k9bkk8zw23 999 1
16.1912 xs16_at16426z32 19 1
16.1711 xs16_c8idik8z023 18 1
16.3134 xs16_c9jzw122c826 17 1
16.2317 xs16_cik8a52z641 16 1
16.1970 xs16_ckw3lozw1243 999 1
16.943 xs16_gilla4z56 999 1
16.821 xs16_o8blgozw56 999 1
16.2861 xs16_ol3zw343146 17 1
16.3164 xs16_wo443146zbd 17 1
16.2784 xs16_woe12koz6221 999 1
EDIT3: The above list looks like it could be useful...
Thanks, this list is very useful. I've done the first two not yet synthesised at all.
16.761 in 10 gliders:
Code: Select all
x = 105, y = 34, rule = B3/S23
65bo$63bobo$64b2o9$13bo$11bobo$12b2o$42b2o28b2o26b2o$13b3o25bo2bo26bo
2bo24bob3o$13bo7bo5bo14bobo27bobo24bo4bo$14bo4b2o4b2o16bo29bo26b4o$20b
2o4b2o74bo$46bo29bo27bo$45bobo27bobo25b2o$4bo39bo2bo26bo2bo$5bo29bo9b
2o18bo9b2o$3b3o28bobo27bobo$34bobo27bobo$3o32bo10b2o17bo10b2o$2bo9bo
33b2o28b2o$bo10b2o50bo$11bobo49b2o$63bobo2$23b2o$22b2o$24bo!
16.157 in 9 gliders:
Code: Select all
x = 35, y = 41, rule = B3/S23
33bo$32bo$32b3o13$19bo$17b2o$18b2o4$19bo$18b2o$18bobo$14b2o$14bobo$6bo
7bo$6bobo$6b2o3b3o$13bo$12bo4b2o$2o15bobo$b2o14bo$o5$7b2o$8b2o$7bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 4th, 2017, 7:36 pm
by AbhpzTa
Goldtiger997 wrote:16.761 in 10 gliders:
Code: Select all
x = 105, y = 34, rule = B3/S23
65bo$63bobo$64b2o9$13bo$11bobo$12b2o$42b2o28b2o26b2o$13b3o25bo2bo26bo
2bo24bob3o$13bo7bo5bo14bobo27bobo24bo4bo$14bo4b2o4b2o16bo29bo26b4o$20b
2o4b2o74bo$46bo29bo27bo$45bobo27bobo25b2o$4bo39bo2bo26bo2bo$5bo29bo9b
2o18bo9b2o$3b3o28bobo27bobo$34bobo27bobo$3o32bo10b2o17bo10b2o$2bo9bo
33b2o28b2o$bo10b2o50bo$11bobo49b2o$63bobo2$23b2o$22b2o$24bo!
16.157 in 9 gliders:
Code: Select all
x = 35, y = 41, rule = B3/S23
33bo$32bo$32b3o13$19bo$17b2o$18b2o4$19bo$18b2o$18bobo$14b2o$14bobo$6bo
7bo$6bobo$6b2o3b3o$13bo$12bo4b2o$2o15bobo$b2o14bo$o5$7b2o$8b2o$7bo!
16.761 reduced to 9G:
Code: Select all
x = 105, y = 30, rule = B3/S23
64bo$65b2o$64b2o11$12bo$13bo29bo29bo26b2o$11b3o28bobo27bobo24bob3o$42b
obo27bobo24bo4bo$8b3o32bo29bo26b4o$10bo7bobo81bo$9bo8b2o26bo29bo27bo$
15bo3bo25bobo27bobo25b2o$4bo8bobo28bo2bo26bo2bo$5bo8b2o19bo9b2o18bo9b
2o$3b3o11bo16bobo27bobo$16bo17bobo27bobo$3o13b3o16bo10b2o17bo10b2o$2bo
43b2o28b2o$bo61b2o$63bobo$63bo!
The second one makes 16.143 , not 16.157 .
16.143 reduced to 7G:
Code: Select all
x = 92, y = 17, rule = B3/S23
20bobo$20b2o$21bo4$14b2o$14bobo56bo$6bo7bo57bo$6bobo63b3o$6b2o3b3o14b
2obo26b2obo26b2obo$13bo13bo2b2o8b2o15bo2b2o8b2o15bo2b2o$12bo4b2o9bo11b
2o16bo11b2o16bo$2o15bobo7b2ob2o25b2ob2o25b2ob2o$b2o14bo9bo2bo26bo2bo
26bo2bo$o27bobo27bobo27bobo$29bo29bo29bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 10th, 2017, 9:46 am
by dvgrn
There are four 16-bitters from
Calcyman's recent experiment with slow-salvo "symmetry" in Catagolue, that show up on the Useful List:
xs16_3pq3pm (?-shillelagh_siamese_snake_and_block)
xs16_4aqb96z32 (?-racetrack_siamese_carrier)
xs16_65pajkc (?-shillelagh_at_shillelagh)
xs16_o4o7picz01 (?-bookend_siamese_mango_on_beehive)
I checked the first one, and the slow salvo seems to imply at most a 10-glider synthesis plus cleanup:
Code: Select all
#C xs16_3pq3pm
#C https://catagolue.appspot.com/hashsoup/SS/h_eshr3YTELKCN_oo$oo!GSUbTbH3bFbNbQETMcG/b3s23
#C https://catagolue.appspot.com/object/xs16_3pq3pm/b3s23
#C 9E 15E -15E 31O 25O -1O -23O -27O -29E -7E 15O -11E 41E
x = 399, y = 379, rule = B3/S23
2o$2o9$14b3o$14bo$15bo26$45b3o$45bo$46bo26$58b3o$58bo$59bo26$110b2o$
109b2o$111bo26$135b2o$134b2o$136bo26$150b2o$149b2o$151bo26$167b2o$166b
2o$168bo26$193b2o$192b2o$194bo26$219b3o$219bo$220bo26$258b3o$258bo$
259bo26$298b2o$297b2o$299bo26$312b3o$312bo$313bo56$396b3o$396bo$397bo!
#C [[ AUTOFIT STEP 5 ]]
EDIT: Yes, 12 gliders is easy, and can almost certainly be improved:
Code: Select all
x = 69, y = 68, rule = B3/S23
59bo$59bobo$59b2o12$68bo$66b2o$67b2o8$35b2o$34bo2bo$34bo2bo4bo$35b2o4b
o$41b3o2$31b2o$31b2o3$45b3o$45bo$46bo2$30b2o$30b2o20$64b3o$64bo$65bo4$
3o$2bo$bo!
Probably there's something similar for the other three, given that a slow salvo "soup" guarantees an easy synthesis. And of course there are a lot more out there that might equally well produce a synthesis in the 10- to 13-glider range, that would improve on an existing higher-cost recipe...!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 10th, 2017, 12:19 pm
by BlinkerSpawn
Second in 15, but I'm certain there's a 2G cleanup that works and better ways to make the input constellation:
Code: Select all
x = 242, y = 81, rule = B3/S23
19$233bo$233bobo$88bo144b2o$87bo66b2o$87b3o63bo2bo$148b3o3bobo43b2o$
155bo43bob3o$152bo46bo4bo$82bo69bo47b4o$80bobo69bo49bo$77b2o2b2o30bobo
88bo$33bo42bobo35b2o87b2o$31bobo44bo35bo3b2o$32b2o74b3o6b2o32b3o54b2o$
119bo36bo50bo2bo$112bo36bo5bobo49bo2bo$112bo36bo5bo2bo37b2o10b2o$82bo
29bo36bo6b2o38b2o$37b3o42bo$12bo26bo6bo35bo3bo122b2o$13b2o23bo6bobo37b
obo120b2o$12b2o3bo27bo2bo29b3o4bo2bo22b3o96bo$16b2o21b3o4b2o38b2o28bo$
16bobo20bo69bo5bobo$40bo68bo5bo2bo$109bo6b2o28b2o$147b2o6b2o45bo$146bo
8bobo43bobo$155bo45bobo$202bo!
I've seen at least 15 other ways to leave one object remaining with two gliders (two leave just the SL and a bipond!) but no luck.
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 10th, 2017, 2:20 pm
by chris_c
dvgrn wrote:There are four 16-bitters from
Calcyman's recent experiment with slow-salvo "symmetry" in Catagolue, that show up on the Useful List:
xs16_3pq3pm (?-shillelagh_siamese_snake_and_block)
xs16_4aqb96z32 (?-racetrack_siamese_carrier)
xs16_65pajkc (?-shillelagh_at_shillelagh)
xs16_o4o7picz01 (?-bookend_siamese_mango_on_beehive)
I found a nice predecessor for the 17 bitter involved in the first one. It gives 16.121 in 9 gliders:
Code: Select all
#C 16.121
x = 113, y = 127, rule = B3/S23
bo$2bo$3o2$19bobo$19b2o$20bo2$23bobo$23b2o$24bo6$o105b2obo$b2o103bob2o
$2o108b2o$107b2obobo$107b2obobo$5bo105bo$6b2o$5b2o2$bo$b2o$obo$21bo$
20b2o$20bobo79$23bobo$23b2o$24bo5$6b2obo96b2ob2o$6bob2o96bob2obo$10b2o
99bo$7b2obobo94b2obo$7b2obobo94b2ob2o$11bo3$20b3o$20bo$21bo!
For the third one this happens quite often in C2_1 for 12G:
Code: Select all
#C 16.128
x = 187, y = 200, rule = B3/S23
96bo$96bobo$96b2o11$183b2o$183b2o9$67bo$65bobo$66b2o2$99b2o$99bobo$99b
o9$182b2o$182b2o11$69b2o$68bobo$70bo$23bo$21bobo$22b2o4$165bo$164bo$
164b3o47$69bo44bo$70b2o41bo$69b2o42b3o3$83b2o$83b2o10$181b2obo$180bo2b
2o$180b2o3b2o$182b2o2bo$182bob2o10$82b2o$82b2o3$51b3o42b2o$53bo41b2o$
52bo44bo47$3o$2bo$bo4$143b2o$143bobo$143bo!
For the fourth I got an 8 glider synth but maybe the junk from Century + Glider can be obtained directly from 3G for 7G in total...
Code: Select all
#C 16.643
x = 133, y = 212, rule = B3/S23
127b2o$126bo2bo$25b3o99b2o$27bo$26bo$29b3o$29bo$30bo93$27b2o$26bo2bo$
27b2o4$129b2o$122bo6bobo$121bobo3bobo2bo$121b2o3bobobobo$126bobob2o$
127bo7$12b2o$13b2o$12bo6$6b2o$5bobo$7bo$b2o$obo29b2o6b3o$2bo29bobo5bo$
32bo8bo69$14bo$15bo$13b3o3$29b2o98b2o$22bo6bobo97bobo$21bobo3bobo2bo
94bobo2bo$21b2o3bobobobo93bobobobo$26bobob2o94bobob2o$27bo99bo!
BlinkerSpawn wrote:Second in 15, but I'm certain there's a 2G cleanup that works and better ways to make the input constellation
This one was already done by Goldtiger/AbhpzTa a few posts back.
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 10th, 2017, 11:23 pm
by Goldtiger997
16.150 in 7 gliders from a D2_+2 soup:
Code: Select all
x = 26, y = 28, rule = B3/S23
25bo$23b2o$24b2o8$14bo$bo11bo$2bo10b3o$3o3$13bo$11b2o$12b2o2b3o$16bo$
17bo4$12bo$7b3obo$9bob3o$8bo!
16.1752 in 10 gliders using a bakery and bad cleanup:
Code: Select all
x = 58, y = 75, rule = B3/S23
55bo$55bobo$55b2o25$16bo$17bo$15b3o$19bo$18bo$18b3o6$22bo$21bo$21b3o$
25b3o$25bo$7bo18bo$5b2o$6b2o4$5b2o$bo2b2o$2bo3bo$3o6$53b2o$53bobo$53bo
12$34b3o$34bo$35bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 11th, 2017, 1:54 am
by yootaa
16.1704 in 10 griders:
Code: Select all
x = 49, y = 36, rule = B3/S23
11bobo$12b2o$12bo2$bo24bobo$2bo23b2o$3o24bo2$10bo$11b2o$10b2o10$44b2o$
17bo25bobo$17bobo22bo2bob2o$17b2o24b3o2bo$20b2o24bo$10b2o8bobo22bo$9bo
bo8bo24b2o$11bo2$4b2o6b3o$3bobo6bo$5bo7bo2$33b2o$33bobo$33bo!
And 16.821... Is it useful?
Code: Select all
x = 16, y = 26, rule = B3/S23
bo$bo$bo5$3b3o2$13bobo$12bo2bo$12bo2bo$13b2o$b2o$o2bo$o2bo$obo2$10b3o
5$14bo$14bo$14bo!
EDIT: 16.839 and 16.854 have already be synthesized by mniemiec:
Code: Select all
#N 16-839.rle
#O Mark D. Niemiec's life synthesis database, Thu Feb 19 02:00:57 2015
x = 73, y = 22, rule = B3/S23
51bo$51bobo$51boo$44bo$43bo$obo40b3o$boo$bo38bobo26bx$28bx12boo5bo6boo
11bxbx$8bo18bxbx11bo5bobo4boo6bo4bxbx$6boo20bxx6b3o9boo6bo4bo5bxbxbx$
7boo21bxx6bo4bo6boo9b3o4bxbxbx$30bxbx4bo6boo4bobo5bo11bxbx$31bx11boo6b
o5boo10bxbx$4bo3boo47bobo10bx$4booboo$3bobo3bo44b3o$56bo$55bo$47boo$
46bobo$48bo!
http://codercontest.com/mniemiec/16/16-839.rle
Code: Select all
#N 16-854.rle
#O Mark D. Niemiec's life synthesis database, Thu Feb 19 02:00:57 2015
x = 148, y = 49, rule = B3/S23
78bo$79bo$77b3o$12bo18bobo3bobo21byy18boo$10boo20boo4boo20bybby16bobbo
$11boo19bo5bo22byy18boo$35boo$34bobo$obo3bo14bxx3bx9bo4boo3bo15bxx18b
oo18bxx18boo18bxx$booboo14bxbbxbxbx12bobbobobo12bxbbxbbx13bobbobbo13bx
bbxbbx13bobbobbo13bxbbxbbx$bo3boo13bxxbxbxx13booboboo13bxxbxbxbx12boob
obobo12bxxbxbxbx12boobobobo3bo8bxxbxbxbx$21bxbx17bobo8boo7bxbxbbxx13bo
bobboo13bxbxbbxx13bobobbooboo10bxbxbbx$bbo13boo3bxbx17bobo7boo8bxbx17b
obo17bxbx17bobo6boo9bxbx$boo12boo5bx19bo4b3o3bo8bx19bo19bx19bo19bx$bob
o13bo31bo82b3o$48bo83bo$133bo14$118bo$119bo$117b3o12bo$71bobo3bobo11bo
9byy18boo8bo$48bobo21boo4boo11bobo6bybby16bobbo7b3o$49boo21bo5bo12boo
8byy5byy11boo5boo$49bo25boo30bybby16bobbo$51bo15bx6bobo10bo20byy18boo$
41boo3bo3bo10bxx3bxbx7bo4boo3bobo13bxx18boo18bxx$40bobbobobobb3o7bxbbx
bxbx12bobbobobo12bxbbxbbx13bobbobbo13bxbbxbbx$40booboboo13bxxbxbxx13b
ooboboo3bobo7bxxbxbxbxbyy9booboboboboo9bxxbxbxbx$41bobo17bxbx17bobo6b
oo9bxbxbbxxbyy10bobobbooboo10bxbxbbxx$41bobo17bxbx17bobo7bo9bxbx17bobo
8boo7bxbx$42bo19bx19bo19bx19bo9bobo7bx$132bo$$90boo$89boo$91bo!
http://codercontest.com/mniemiec/16/16-854.rle
There may be other examples like this.
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 11th, 2017, 2:33 am
by Goldtiger997
yootaa wrote:...
And 16.821... Is it useful?
Code: Select all
x = 16, y = 26, rule = B3/S23
bo$bo$bo5$3b3o2$13bobo$12bo2bo$12bo2bo$13b2o$b2o$o2bo$o2bo$obo2$10b3o
5$14bo$14bo$14bo!
Yes it is. 16.821 in 14 gliders:
Code: Select all
x = 46, y = 68, rule = B3/S23
o$b2o$2o19$15bo$15bobo$15b2o$8bo$9b2o3bo$8b2o5bo$13b3o2$30bo$31bo3b3o$
29b3o3bo$13bo22bo$11bobo18b2o$12b2o18bobo$9bo22bo$10bo3b3o$8b3o3bo$15b
o2$30b3o$30bo5b2o$31bo3b2o$37bo$29b2o$28bobo$30bo19$44b2o$43b2o$45bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 11th, 2017, 10:25 am
by BlinkerSpawn
yootaa wrote:16.1704 in 10 griders:
Code: Select all
x = 49, y = 36, rule = B3/S23
11bobo$12b2o$12bo2$bo24bobo$2bo23b2o$3o24bo2$10bo$11b2o$10b2o10$44b2o$
17bo25bobo$17bobo22bo2bob2o$17b2o24b3o2bo$20b2o24bo$10b2o8bobo22bo$9bo
bo8bo24b2o$11bo2$4b2o6b3o$3bobo6bo$5bo7bo2$33b2o$33bobo$33bo!
That's a quite nice B inserter but you didn't need it.
In 9:
Code: Select all
x = 49, y = 41, rule = B3/S23
11bobo$12b2o$12bo2$bo24bobo$2bo23b2o$3o24bo2$10bo$11b2o$10b2o10$44b2o$
17bo25bobo$17bobo22bo2bob2o$17b2o24b3o2bo$20b2o24bo$20bobo22bo$20bo24b
2o7$33b2o$33bobo$33bo3$8b3o20b2o$10bo19b2o$9bo22bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 11th, 2017, 11:34 am
by AbhpzTa
BlinkerSpawn wrote:yootaa wrote:16.1704 in 10 griders:
Code: Select all
x = 49, y = 36, rule = B3/S23
11bobo$12b2o$12bo2$bo24bobo$2bo23b2o$3o24bo2$10bo$11b2o$10b2o10$44b2o$
17bo25bobo$17bobo22bo2bob2o$17b2o24b3o2bo$20b2o24bo$10b2o8bobo22bo$9bo
bo8bo24b2o$11bo2$4b2o6b3o$3bobo6bo$5bo7bo2$33b2o$33bobo$33bo!
That's a quite nice B inserter but you didn't need it.
In 9:
Code: Select all
x = 49, y = 41, rule = B3/S23
11bobo$12b2o$12bo2$bo24bobo$2bo23b2o$3o24bo2$10bo$11b2o$10b2o10$44b2o$
17bo25bobo$17bobo22bo2bob2o$17b2o24b3o2bo$20b2o24bo$20bobo22bo$20bo24b
2o7$33b2o$33bobo$33bo3$8b3o20b2o$10bo19b2o$9bo22bo!
6 gliders:
Code: Select all
x = 13, y = 19, rule = B3/S23
obo$b2o$bo4$o$b2o$2o4bo$5b2o$5bobo$10b2o$10bobo$10bo3$3b3o2b2o$5bob2o$
4bo4bo!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 11th, 2017, 12:05 pm
by gmc_nxtman
AbhpzTa wrote:
6 gliders:
Code: Select all
x = 13, y = 19, rule = B3/S23
obo$b2o$bo4$o$b2o$2o4bo$5b2o$5bobo$10b2o$10bobo$10bo3$3b3o2b2o$5bob2o$
4bo4bo!
...how?
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 11th, 2017, 6:07 pm
by BlinkerSpawn
gmc_nxtman wrote:AbhpzTa wrote:
6 gliders:
Code: Select all
x = 13, y = 19, rule = B3/S23
obo$b2o$bo4$o$b2o$2o4bo$5b2o$5bobo$10b2o$10bobo$10bo3$3b3o2b2o$5bob2o$
4bo4bo!
...how?
He simply noticed that that 3G collision was similar enough to the original reaction to work.
Good job!
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 12th, 2017, 12:47 pm
by chris_c
Goldtiger997 wrote:
16.1752 in 10 gliders using a bakery and bad cleanup:
I found an alternative method taking 8G:
Code: Select all
x = 40, y = 28, rule = B3/S23
38bo$37bo$37b3o5$28bobo$28b2o$29bo$4bo$5bo$3b3o3$34b3o$34bo$35bo2$26b
2o$26bobo$9b3o14bo$11bo10b2o$10bo10b2o$23bo$3o$2bo$bo!
yoota wrote:16.839 and 16.854 have already be synthesized by mniemiec
Thanks for pointing this out. I assumed that all of relevant syntheses is mniemeic's collection made their way into Bob's collection and then any that don't involve *WSS should be in my collection. I need to work out where this logic broke down. Anyway, here is a reduction of 16.854 by 1 glider:
Code: Select all
x = 119, y = 224, rule = B3/S23
19bo$18bo$18b3o95b2o$114b3obo$113bo4bo$10b3o101b4o$12bo$11bo104b2o$18b
2o96bobo$18bobo96bo$18bo4$23b2o$23bobo$23bo3$11b2o$10bobo$12bo63$34bo$
34bobo$34b2o3$36bo$36bobo$36b2o6$bo$2bo$3o3$16b2o98b2o$14b3obo95b3o$
13bo4bo94bo4bo$14b4o96b5o2$16b2o98bo$16bobo96bobo$17bo97b2o7$36b2o$35b
2o$37bo7$2b2o$3b2o$2bo75$16b2o98b2o$14b3o97b3o$13bo4bo94bo4bo$14b5o95b
5o2$16bo99bo$15bobo97bobo$15b2o99bo9$21b2o$21bobo$21bo$4b2o$5b2o$4bo!
Altogether there are 9 extras syntheses since last time:
Code: Select all
+16.821 xs16_o8blgozw56 14
+16.839 xs16_g8idicz1252 14
+16.128 xs16_65pajkc 12
+16.854 xs16_4aab9czw252 12
+16.121 xs16_3pq3pm 9
+16.643 xs16_o4o7picz01 8
+16.1752 xs16_695q84ozx121 8
+16.150 xs16_5b8ra96 7
+16.1704 xs16_4a9fg4czx32 6
Here is the updated list of expensive still lifes ordered by Catagolue frequency:
Code: Select all
16.1973 xs16_0ggm9icz1243 16 43214
16.776 xs16_2llm853z01 17 34628
16.1928 xs16_c88q552z311 17 33895
16.157 xs16_330fhar 24 12900
16.124 xs16_69ari96 27 10365
16.1113 xs16_0gs2arz3421 20 9193
16.2186 xs16_wml1e8z643 20 8663
16.739 xs16_2l2s53z321 16 8029
16.738 xs16_3lka96z121 24 5411
16.149 xs16_5b8ri96 17 4685
16.202 xs16_354cgn96 27 4612
16.657 xs16_695q4ozw321 16 4403
16.800 xs16_c8al96z311 19 4172
16.645 xs16_caikm96zw1 16 3993
16.131 xs16_660uhar 32 3702
16.1706 xs16_2ege9a4zw23 999 3655
16.663 xs16_69r4koz023 999 2661
16.1701 xs16_4a9jc4ozx121 999 2425
16.1856 xs16_39u06a4z32 16 2408
16.626 xs16_69n8jdzx1 999 2282
16.1739 xs16_g88r2qkz121 20 2219
16.1716 xs16_4a9mk46zx121 999 2174
16.1880 xs16_259q453z032 25 1975
16.665 xs16_699mkiczx1 18 1857
16.829 xs16_0md1e8z1226 23 1475
16.142 xs16_5b8raic 999 1465
16.641 xs16_c9baiczw32 999 1429
16.748 xs16_39ege2z321 17 1372
16.799 xs16_c8al56z311 17 1176
16.642 xs16_6s1raa4zw1 53 1101
16.228 xs16_178bp2sg 20 1047
16.159 xs16_2egmd1e8 21 960
16.765 xs16_4ap78cz321 999 926
16.686 xs16_mkkb2acz1 39 903
16.152 xs16_5b8r9ic 999 897
16.2309 xs16_8kk31e8z641 21 779
16.846 xs16_caab8oz0252 999 684
16.1696 xs16_4a9mk4ozx121 17 639
16.19 xs16_caarz39c 18 505
16.810 xs16_ca9la4z311 16 471
16.1992 xs16_25is0cczw65 16 470
16.1881 xs16_259q453zw32 19 433
16.813 xs16_c4lb8oz321 999 425
16.834 xs16_8u15a4z1226 25 422
16.691 xs16_co2ticz23 999 419
16.774 xs16_69raa4z32 21 419
16.1863 xs16_4aq32acz32 17 381
16.360 xs16_2egu16413 16 360
16.848 xs16_ca9b8oz0252 18 359
16.2014 xs16_25a8kk8z0253 17 340
16.717 xs16_31kmp3z032 33 337
16.827 xs16_ciaj2ak8zw1 999 329
16.1717 xs16_4aajk46zx121 999 328
16.995 xs16_0raik8z643 16 320
16.1722 xs16_4aq32acz032 17 307
16.1940 xs16_c48q552z321 999 281
16.716 xs16_3pmk46zx23 32 272
16.265 xs16_259m861ac 17 270
16.1757 xs16_g8idik8z123 18 267
16.2060 xs16_69akg4czx56 16 260
16.1773 xs16_ciarzx3213 999 259
16.1703 xs16_4a9la8ozx121 999 250
16.647 xs16_8k4r2pmzw1 999 241
16.740 xs16_3l2s53z121 16 236
16.153 xs16_4a9r8jd 999 227
16.18 xs16_caarzbd 19 208
16.1684 xs16_4aab9k8zx32 19 163
16.2174 xs16_08u164koz32 27 160
16.1768 xs16_mk461acz121 17 157
16.353 xs16_321fgc453 23 155
16.1740 xs16_69acga6zx32 23 155
16.1143 xs16_ciligozw4a4 999 154
16.668 xs16_gbq1daz121 17 152
16.2503 xs16_ckl3zx32ac 999 147
16.1990 xs16_8e1tazx1252 18 143
16.144 xs16_4aar2pm 999 141
16.1857 xs16_39u0652z32 16 141
16.243 xs16_2egu16426 16 138
16.2018 xs16_25a8c826zw33 18 125
16.819 xs16_ra178cz23 999 120
16.619 xs16_j9ajkcz11 999 120
16.126 xs16_69ir9ic 999 117
16.1112 xs16_0gs2arz6421 26 114
16.822 xs16_8ehikozw56 16 112
16.2445 xs16_ciligzx254c 16 105
16.1787 xs16_069m4koz311 16 104
16.1699 xs16_8e13kkozx32 999 99
16.953 xs16_0cil56z6221 16 98
16.1991 xs16_8e1qbzx1252 17 97
16.1929 xs16_0g5r8b5z121 16 94
16.213 xs16_35861tic 23 89
16.15 xs16_178c1f84c 17 83
16.2295 xs16_0g8go8brz23 24 74
16.1755 xs16_696o8a6z032 999 73
16.921 xs16_ghn831e8z1 16 73
16.155 xs16_3pabp46 18 72
16.634 xs16_ca9diczw32 999 71
16.1694 xs16_4a5p6o8zx121 19 65
16.2347 xs16_g8861acz0db 28 64
16.628 xs16_kc32qkz0113 28 62
16.1847 xs16_39c8a52z033 17 62
16.1954 xs16_8kk31e8z065 21 61
16.731 xs16_3iajkcz23 28 57
16.836 xs16_4aajkczx56 20 57
16.833 xs16_0mp2sgz1243 20 56
16.616 xs16_i5pajoz11 17 53
16.640 xs16_c9bkkozw32 999 49
16.801 xs16_08eharz321 19 43
16.1904 xs16_8u164koz32 32 41
16.1743 xs16_696o8a6zw32 999 39
16.795 xs16_c87p46z311 53 39
16.230 xs16_178jd2ko 19 39
16.927 xs16_4akgf9zw65 18 38
16.2132 xs16_0g8it2sgz23 17 38
16.804 xs16_c871arzx32 999 36
16.313 xs16_3pm44og4c 35 36
16.1754 xs16_695m88czx23 999 35
16.1691 xs16_4a9l6o8zx121 999 35
16.1106 xs16_0iu0dbz641 25 35
16.2201 xs16_0ggml96z641 18 32
16.442 xs16_0cai3z4aip 17 32
16.1304 xs16_0okih3zc8421 16 32
16.312 xs16_62s53zbd 29 31
16.1391 xs16_ca168ozc8421 16 31
16.1976 xs16_g8861acz1156 999 29
16.929 xs16_3iaj2ak8zw1 999 28
16.2541 xs16_g8861aczc93 28 28
16.1994 xs16_0g9fgka4z121 16 28
16.1846 xs16_25a8c93zw33 23 27
16.623 xs16_o5r8jdz01 27 23
16.227 xs16_5b8r5426 17 23
16.856 xs16_kc32acz1252 16 23
16.914 xs16_8kkja952zx1 18 22
16.1791 xs16_03lkaa4z3201 20 19
16.1096 xs16_ckjaa4z641 18 19
16.1702 xs16_4a5p68ozx121 23 18
16.1464 xs16_08o696z6ip 16 18
16.706 xs16_39s0qmz023 24 17
16.1766 xs16_kc321e8z123 16 17
16.101 xs16_0c9jzi5dz11 21 15
16.621 xs16_g5r8jdz11 25 14
16.723 xs16_i5p64koz11 20 14
16.350 xs16_312461tic 16 14
16.2219 xs16_0oe12koz643 16 14
16.1962 xs16_4a9eg8ozw65 999 13
16.1723 xs16_4ap64koz032 999 13
16.2820 xs16_wmk4871z643 25 13
16.1034 xs16_3lkaa4z065 24 13
16.915 xs16_0gs2pmz1243 20 12
16.1790 xs16_178cia4z0321 18 12
16.803 xs16_c9bk46z311 17 12
16.278 xs16_32qj43146 29 11
16.1323 xs16_031e8gzc9311 29 11
16.786 xs16_3pa3ia4zw11 28 11
16.724 xs16_j5o64koz11 16 11
16.177 xs16_25b8r54c 16 11
16.1758 xs16_4a4o796zw121 17 10
16.996 xs16_2lm853z056 16 9
16.2546 xs16_j9cz122c84c 16 9
16.2542 xs16_g88c871zc93 16 9
16.682 xs16_69j0j9czx11 999 8
16.1018 xs16_3p6o8ge2zw1 27 8
16.3163 xs16_wo443123zbd 17 8
16.1115 xs16_08kaarz6221 17 8
16.838 xs16_ci9b8ozw56 16 8
16.2302 xs16_4ap6413z65 16 8
16.695 xs16_5b8bl8zx32 25 7
16.872 xs16_2lla8oz065 20 7
16.1995 xs16_cik8a52z065 18 7
16.1127 xs16_giligoz104a4 32 6
16.1680 xs16_8e123ckzx311 17 6
16.2630 xs16_31e8gzxo9a6 16 6
16.2322 xs16_raak8zx1252 16 6
16.147 xs16_32qjap3 32 5
16.3227 xs16_31e8gzy012ego 27 5
16.1753 xs16_695q4gozw23 21 5
16.772 xs16_3h4e1daz011 16 5
16.2547 xs16_j9cz122c826 16 5
16.151 xs16_64kr2pm 999 4
16.778 xs16_69la8oz321 36 4
16.591 xs16_1784cggc4go 27 4
16.713 xs16_o8bap3z23 24 4
16.3066 xs16_4a9jzx12ego 23 4
16.926 xs16_3iajc4gozw1 21 4
16.2058 xs16_69akg4czx146 20 4
16.106 xs16_31246116853 17 4
16.2805 xs16_0gs2c871z641 16 4
16.2029 xs16_25ao4a4z2521 16 4
16.1967 xs16_o86178cz056 16 4
16.944 xs16_gjlka4z56 999 3
16.890 xs16_696ki6zw641 999 3
16.889 xs16_696ki6zx65 999 3
16.1861 xs16_4ap64koz32 999 3
16.1685 xs16_c48n98czx23 999 3
16.842 xs16_cila8oz065 34 3
16.354 xs16_35s26zbd 29 3
16.828 xs16_4alhe8z0641 28 3
16.358 xs16_321fgc2ko 19 3
16.1911 xs16_69q3213z32 18 3
16.1107 xs16_02egdbz2521 18 3
16.1105 xs16_gie0dbz146 18 3
16.1882 xs16_259m453zx23 17 3
16.1867 xs16_069q453z311 17 3
16.762 xs16_jhke1e8z1 16 3
16.2305 xs16_6413ia4z6421 16 3
16.2030 xs16_0i5q8a52z121 16 3
16.1710 xs16_4a9bk46zx32 16 3
16.1080 xs16_3lo0kcz3421 16 3
16.2096 xs16_wck5b8oz311 999 2
16.1094 xs16_cila8oz641 40 2
16.349 xs16_35s26z39c 35 2
16.220 xs16_3123qajo 29 2
16.1901 xs16_08obap3z32 25 2
16.300 xs16_9fg4czbd 23 2
16.875 xs16_4a5pa4z2521 18 2
16.380 xs16_4a40vh248c 17 2
16.840 xs16_c8idiczw56 16 2
16.771 xs16_69qb8oz32 16 2
16.2862 xs16_08u16413z65 16 2
16.2204 xs16_0gilla4z641 16 2
16.1720 xs16_4a4o79ozx121 16 2
16.1675 xs16_xj96z0mdz32 16 2
16.943 xs16_gilla4z56 999 1
16.2784 xs16_woe12koz6221 999 1
16.1979 xs16_4ap30ga6zw121 999 1
16.1970 xs16_ckw3lozw1243 999 1
16.1682 xs16_8k9bkk8zw23 999 1
16.712 xs16_3pc0qmzw23 48 1
16.1721 xs16_64kb2acz032 35 1
16.218 xs16_3pajc48c 33 1
16.185 xs16_32qk5b8o 30 1
16.930 xs16_3iaj21e8zw1 25 1
16.825 xs16_4alhe8zw65 25 1
16.1064 xs16_39m88cz6221 24 1
16.2313 xs16_08u16853z32 23 1
16.1073 xs16_3lkaa4z641 20 1
16.745 xs16_39qb8oz32 19 1
16.2162 xs16_0at16426z32 19 1
16.2050 xs16_6ik8a52z065 19 1
16.1912 xs16_at16426z32 19 1
16.2480 xs16_3iaczw1139c 18 1
16.2447 xs16_0g8it248cz23 18 1
16.2025 xs16_069q48cz2521 18 1
16.1711 xs16_c8idik8z023 18 1
16.843 xs16_4a9liczx56 17 1
16.3164 xs16_wo443146zbd 17 1
16.3134 xs16_c9jzw122c826 17 1
16.2861 xs16_ol3zw343146 17 1
16.2694 xs16_4ai3gzx11mq 17 1
16.1715 xs16_64p784czw23 17 1
16.593 xs16_3123c48gka4 16 1
16.2699 xs16_08o6413zrm 16 1
16.2460 xs16_0o861aczc452 16 1
16.2317 xs16_cik8a52z641 16 1
16.1864 xs16_31ke1e8z032 16 1
16.1085 xs16_3h4e12koz011 16 1
16.104 xs16_0j5ozj4pz11 16 1
Re: 16 in 16: Efficient 16-bit Synthesis Project
Posted: February 12th, 2017, 1:11 pm
by BlinkerSpawn
16.157:
Code: Select all
x = 13, y = 27, rule = B3/S23
9bo2bo$10bobo$10b3o3$7bobo$6bo2bo$6bo3bo$6bo2bo$7b3o6$b2o$o2bo$b2o7$2b
2o6bo$2b2o5bobo$10bo!