An almost working recipe (suboptimal, especially the last component) :amling wrote: ↑April 19th, 2024, 3:50 pmI was dreaming again of trying to make a (2, 1)c/6 wick stretcher for this wick:
Is it possible to synthesize something like that piecemeal? Specifically I mean (a) synthesize anchor points (like integral sign) sufficiently far away from each other at some high period multiple of (2, 1)c/6, (b) step-by-step extend them towards each other, and (c) somehow stitch them up when they meet.Code: Select all
x = 43, y = 84, rule = B3/S23 o$bo$2bo$3bo$4bo$5bo$6bo$3b3o$2bo$3bo$4bo$5bo$6bo$7bo$8bo$9bo$10bo$11b o$12bo$9b3o$8bo$9bo$10bo$11bo$12bo$13bo$14bo$15bo$16bo$17bo$18bo$15b3o $14bo$15bo$16bo$17bo$18bo$19bo$20bo$21bo$22bo$23bo$24bo$21b3o$20bo$21b o$22bo$23bo$24bo$25bo$26bo$27bo$28bo$29bo$30bo$27b3o$26bo$27bo$28bo$ 29bo$30bo$31bo$32bo$33bo$34bo$35bo$36bo$33b3o$32bo$33bo$34bo$35bo$36bo $37bo$38bo$39bo$40bo$41bo$42bo$39b3o$38bo$39bo$40bo$41bo!
I just have no idea what is or isn't in range to be synthesized and I assume/hope this i the right place to ask.
Code: Select all
x = 141, y = 260, rule = LifeHistory
.A$2.A$3A$26.A$26.A.A$4.A21.2A$5.A$3.3A5$25.A$15.2D7.A$16.D7.3A$13.3D
$12.D$12.2D2$14.E3.2D$12.E.E2.D2.D$13.2E2.D2.D5.E$18.2D5.E$25.3E$17.E
$7.A7.E.E3.2D$.2A4.2A7.2E4.D$2.2A2.A.A10.3D$.A16.D$18.2D2$14.E4.2E3.E
D$14.2E4.2E.DE.E$13.E.E3.E3.D2ED$24.2D3$27.2C$28.C$25.3C$24.C$24.2C2$
30.2C$29.C2.C$29.C2.C$30.2C3$33.2C$34.C$31.3C$30.C$30.2C2$36.2C22.E$
35.C2.C21.E.E$35.C2.C21.2E$36.2C3$39.2C4.E.E$40.C4.2E$37.3C6.E$36.C
15.E$36.2C14.E.E$52.2E$42.2A$41.CD.A$41.C2.A$42.CA$43.D6.2E$44.D4.2E$
45.CA4.E$46.C$43.3C$42.C$42.2C3$47.2C$47.C$48.C$49.C$50.C$51.C$52.C$
49.3C$48.C$48.2C3$53.2C$53.C$54.C$55.C$56.C$57.C$58.C$55.3C$54.C$54.
2C3$59.2C$59.C$60.C$61.C$62.C$63.C5.E$64.C3.E$61.3C4.3E$60.C5.2D$60.
2C4.2D3$65.2C4.3E$65.C5.E$66.C5.E$67.C$68.C$69.C$70.C$67.3C$66.C5.2C$
66.2C4.2C3$71.2C$71.C$72.C$73.C$74.C$75.C$76.C$73.3C$72.C5.2C$72.2C4.
2C2$61.E$58.E5.E8.2D2.2C$73.2D2.C$56.E9.E11.C$79.C$80.C$65.E15.C$82.C
$63.E15.3C$61.E16.C5.2C$78.2C4.2C$61.E2$83.2C$61.E21.C$84.C$85.C$86.C
$87.C$88.C$85.3C$84.C5.2C$84.2C4.2C3$85.2C2.2C$85.2C2.C$81.E8.C$82.E
8.C$80.3E3.2D4.C$76.3E6.D2.D4.C$78.E7.D.D5.C$77.E6.3ED3.3C$86.E3.C5.
2C$85.E4.2C4.2C3$91.2C2.2C$91.2C2.C$96.C$97.C$92.2C4.C$91.C2.C4.C$92.
C.C5.C$93.C3.3C$96.C5.2C$96.2C4.2C3$97.2C2.2C$97.2C2.C$102.C$103.C$
98.2C4.C$97.C2.C4.C$98.C.C5.C$99.C3.3C$102.C5.2C$102.2C4.2C3$103.2C2.
2C$103.2C2.C$108.C$109.C$104.2C4.C$103.C2.C4.C$104.C.C5.C$105.C3.3C$
100.2C6.C5.2C$100.C.C5.2C4.2C$102.C$102.2C$109.2C2.2C$109.2C2.C$114.C
$115.C$110.2C4.C$109.C2.C4.C$110.C.C5.C$111.C3.3C$106.2C6.C5.2C$106.C
.C5.2C4.2C$108.C$108.2C28.E.E$115.2C2.2C17.2E$115.2C2.C19.E$120.C$
121.C$116.2C4.C$115.C2.C4.C$116.C.C5.C$117.C3.3C$111.E2D6.C5.2A$106.E
5.2ED5.AC4.2A$107.2E2.2E.D7.D$106.2E6.2D7.D$121.2A.D2A8.2E$121.2A2.C
9.E.E$126.C8.E$127.C$109.2E11.2A4.C$110.2E9.A2.A4.C$109.E12.A.A5.C$
123.A3.3C$118.2A6.C$118.A.A6.C$120.A7.C$120.2A7.C$112.E17.C$112.2E17.
C$111.E.E18.C$133.C$134.C$135.C$136.C$133.3C$132.C$133.C$134.C.C$135.
2C!
In order to direct further researches, can you summarize the current state of the art of (2,1)c/6 technology, please ? The most important to know for synthesis optimisation would be:
- known types of rakes (available directions, edge-shooting ones ...)
- garbage deletion for small objects
- glider synchronisation limits
- known p36 puffers
With the strict aim of synthesising, this way would be far more efficient. Here is a quick solution in 20G per segment with repeat time 111:dvgrn wrote: ↑April 19th, 2024, 5:23 pmHmm. Syntheses of objects like xs20_31248g0s248gzy21y11246 make me wonder if it might end up being workable to grow that wick from one end, rather than building separate pieces and then stitching them together later.
Code: Select all
x = 212, y = 158, rule = LifeHistory
156.A$154.2A$96.A.A56.2A$97.2A109.A$97.A63.A.A35.A.A5.A$67.A93.2A36.
2A6.3A$A.A54.A.A7.A.A92.A37.A$.2A54.2A8.2A125.3A7.2A$.A56.A91.2A11.2A
31.A6.2A$64.A84.A2.A10.A.A29.A3.2A4.A$64.A.A82.A2.A10.A35.A$64.2A31.
3A50.2A48.A$54.2A43.A61.A39.A$53.A2.A41.A4.2A48.2A5.2A40.A$53.A2.A46.
A49.A6.A.A40.A$.3A50.2A48.A49.A49.A$3.A58.2A41.A49.A49.A$2.A58.2A43.A
49.A49.A$7.2A48.2A4.A43.A49.A49.A$8.A49.A49.A49.A49.A$5.3A47.3A47.3A
47.3A47.3A$4.A49.A49.A49.A49.A$5.A49.A49.A49.A49.A$6.A49.A49.A49.A49.
A$7.A49.A49.A49.A49.A$8.A49.A49.A49.A49.A$9.A.A47.A.A47.A.A47.A.A47.A
.A$10.2A48.2A48.2A48.2A48.2A23$126.A7.A.A$126.A.A5.2A$126.2A7.A6$120.
A$120.A.A$120.2A$127.A$126.A$126.3A4$46.A.A$47.2A$47.A$125.A$116.A7.A
$114.2A8.3A$115.2A$55.A66.A$53.A.A65.A$54.2A65.3A13$113.E$104.E.E5.E$
104.2E6.3E$105.E6$98.E.E$98.2E$99.E$106.E$104.2E$105.2E3$81.E$82.E$
80.3E2$104.E$93.E8.2E$93.E.E7.2E$93.2E$87.E.E11.E$88.2E9.2E$88.E11.2E
2$81.2E$82.2E4.3E$81.E8.E$89.E2$97.3E6.3E$92.2A3.E8.E$93.A4.E8.E$90.
3A$89.A14.2E$90.A12.2E$91.A13.E$92.A$93.A$94.A$59.3E33.A13.2E$47.3A5.
A5.E34.A11.2E$49.A5.2A3.E36.A12.E$48.A5.A.A41.A$99.A$96.3A21.A8.A$95.
A23.2A7.2A$96.A22.A.A6.A.A$97.A$98.A$99.A25.3A$100.A24.A$101.A24.A$
102.A$103.A$26.A77.A$26.2A77.A24.3A$25.A.A74.3A25.A$101.A29.A$102.A$
103.A$104.A$105.A$106.A.A$107.2A!
Edit:
A 5G solution for the block :
Code: Select all
x = 40, y = 36, rule = B3/S23
25b2o$10bo14bo$11bo14bo$9b3o15bo$28bo$29bo$30bo$27b3o$26bo5b2o$26b2o4b
2o3$18bo12b2o$19b2o10bo$18b2o12bo$33bo$34bo$35bo$36bo$33b3o$20b3o9bo5b
2o$11b3o8bo9b2o4b2o$13bo7bo$12bo10$3o$2bo$bo!