BB(2): Difference between revisions
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== Champions == | == Champions == | ||
S(2) = 6 and there are 5 shift champions in [[TNF]]: | S(2)<ref>Same as BB(2).</ref> = 6 and there are 5 shift champions in [[TNF]]: | ||
* {{TM|1RB1LB_1LA1RZ|halt}} leaves 4 ones (the ones champion) | * {{TM|1RB1LB_1LA1RZ|halt}} leaves 4 ones (the ones champion) | ||
Revision as of 04:30, 24 May 2025
The 2-state 2-symbol Busy Beaver problem BB(2) was solved by Tibor Radó using pencil and paper and announced in his seminal Busy Beaver paper, On Non-Computable Functions.[1]
Deciders
The only deciders needed to prove BB(2) are cycler and translated cycler deciders. All 26 infinite TMs listed below are either Translated Cyclers or Cyclers.
Champions
S(2)[2] = 6 and there are 5 shift champions in TNF:
1RB1LB_1LA1RZ(bbch) leaves 4 ones (the ones champion)1RB0LB_1LA1RZ(bbch) leaves 3 ones1RB1RZ_1LB1LA(bbch) leaves 3 ones1RB1RZ_0LB1LA(bbch) leaves 2 ones0RB1RZ_1LA1RB(bbch) leaves 2 ones
Σ(2) = 4 and there is one unique ones champion in TNF:
1RB1LB_1LA1RZ(bbch) runs for 6 steps (a shift champion)
Enumeration
In TNF-1RB there are exactly 41 2-state, 2-symbol TMs, of which 15 halt and 26 never halt. The last group can be divided to 3 cyclers and 23 translated cyclers.
Halting TMs
The following TMs are ordered by the number of steps before halting and by the number of ones left in the tape (represented by the left and right numbers, respectively):
1RB1LB_1LA1RZ Halt 6 4 1RB1RZ_1LB1LA Halt 6 3 1RB0LB_1LA1RZ Halt 6 3 1RB1RZ_0LB1LA Halt 6 2 1RB1LA_1LA1RZ Halt 5 3 1RB1LA_0LA1RZ Halt 5 2 1RB1RZ_1LB1RA Halt 4 2 1RB1RB_1LA1RZ Halt 4 2 1RB1RZ_1LB0RA Halt 4 1 1RB0RB_1LA1RZ Halt 4 1 1RB1RZ_1LA--- Halt 3 2 1RB---_1LB1RZ Halt 3 2 1RB1RZ_0LA--- Halt 3 1 1RB---_0LB1RZ Halt 3 1 1RB---_1RZ--- Halt 2 2
Cyclers
The following TMs are ordered by the period and preperiod (represented by the left and right numbers, respectively):
1RB0RB_0LA--- Cycler 4 0 1RB1RB_0LA--- Cycler 2 1 1RB---_0LB1RB Cycler 2 1
Translated Cyclers
The following TMs are classified (in order of appereance) by their period, the preperiod and by the offset (in absolute value):
1RB1RA_1LA--- Translated Cycler 4 4 2 1RB1LB_0LA--- Translated Cycler 4 3 2 1RB0RA_1LA--- Translated Cycler 4 0 2 1RB0LB_0LA--- Translated Cycler 4 0 2 1RB1RA_0LA--- Translated Cycler 3 1 1 1RB---_1LB1RB Translated Cycler 3 1 1 1RB---_0LB1RA Translated Cycler 3 1 1 1RB---_0LB0LA Translated Cycler 3 0 1 1RB0RA_0LA--- Translated Cycler 3 0 1 1RB0LA_1LA--- Translated Cycler 3 0 1 1RB0LA_0LA--- Translated Cycler 3 0 1 1RB---_1LB0LA Translated Cycler 3 0 1 1RB---_0LB0RA Translated Cycler 3 0 1 1RB---_1RA--- Translated Cycler 2 2 2 1RB---_0RA--- Translated Cycler 2 1 2 1RB---_1LB0RB Translated Cycler 1 5 1 1RB---_1LB0LB Translated Cycler 1 4 1 1RB---_0LB1LB Translated Cycler 1 4 1 1RB---_1LB1LB Translated Cycler 1 3 1 1RB---_0LB0RB Translated Cycler 1 3 1 1RB---_0LB0LB Translated Cycler 1 3 1 1RB---_0RB--- Translated Cycler 1 2 1 1RB---_1RB--- Translated Cycler 1 1 1