User:Polygon/Page for testing: Difference between revisions
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(Added level 2) |
(→Analysis by Shawn Ligocki: Added level 3) |
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0^∞ <A 212 22^n 55^k → 0^∞ 212 22^n+2k | 0^∞ <A 212 22^n 55^k → 0^∞ 212 22^n+2k | ||
which let's | which let's us prove Rule 2: | ||
0^∞ <A 212 22^n 2 55 → 0^∞ <A 212 55^n+2 2 | 0^∞ <A 212 22^n 2 55 → 0^∞ <A 212 55^n+2 2 | ||
→ 0^∞ <A 212 22^2n+4 2 | → 0^∞ <A 212 22^2n+4 2 | ||
Level 3 | |||
Repeating Rule 2 we get: | |||
0^∞ <A 212 22^n 2 55^k → 0^∞ <A 212 22^(n+4)*((2^k)-4) 2 | |||
which let's us prove Rule 3: | |||
0^∞ <A 212 22^n 52 5^5 → 0^∞ <A 212 55 2 55^n+3 52 5 | |||
→ 0^∞ <A 212 22^2 2 55^n+3 52 5 | |||
→ 0^∞ <A 212 22^(6*2^(n+3)-2) 52 5 | |||
→ 0^∞ <A 212 55^(6*2^(n+3)-2) 52 | |||
→ 0^∞ <A 212 22^(6*2^(n+4)-4) 52 | |||
</pre> | </pre> | ||
∞∞∞∞ | |||
→→→→ | |||
Revision as of 16:59, 23 September 2025
1RB3RB5RA1LB5LA2LB_2LA2RA4RB1RZ3LB2LA (bbch) is the current BB(2,6) champion. It was discovered on the 19th of May 2023 by Pavel Kropitz. It halts with a score > .
Analysis by Shawn Ligocki
https://www.sligocki.com/2023/05/20/bb-2-6-p3.html
Analysis
Level 1
These rules can all be verified by direct simulation:
00 <A 212 22^n 55 → <A 212 22^n+2
00 <A 212 22^n 2 55 → <A 212 55^n+2 2
0^5 <A 212 22^n 52 5555 → <A 212 55 2 55^n+3 52
00 <A 212 22^n 2 52 5 → <A 212 55^n+2 52
Level 2
Repeating the first rule above we get:
0^∞ <A 212 22^n 55^k → 0^∞ 212 22^n+2k
which let's us prove Rule 2:
0^∞ <A 212 22^n 2 55 → 0^∞ <A 212 55^n+2 2
→ 0^∞ <A 212 22^2n+4 2
Level 3
Repeating Rule 2 we get:
0^∞ <A 212 22^n 2 55^k → 0^∞ <A 212 22^(n+4)*((2^k)-4) 2
which let's us prove Rule 3:
0^∞ <A 212 22^n 52 5^5 → 0^∞ <A 212 55 2 55^n+3 52 5
→ 0^∞ <A 212 22^2 2 55^n+3 52 5
→ 0^∞ <A 212 22^(6*2^(n+3)-2) 52 5
→ 0^∞ <A 212 55^(6*2^(n+3)-2) 52
→ 0^∞ <A 212 22^(6*2^(n+4)-4) 52
∞∞∞∞ →→→→