Beeping Busy Beaver: Difference between revisions

The Beeping Busy Beaver (BBB) function is a variant of the Busy Beaver function proposed by Scott Aaronson in his 2020 Busy Beaver Frontier survey.^[1] It is notable because it is uncomputable even if you have access to a halting oracle for Turing Machines.

Definition

Consider a beeping Turing machine, which is a Turing machine that has a special state named "beep state". Every time the TM enters the "beep state" it beeps. There are two possibilities, either this TM beeps a finite number of times (and thus there is a final beep) or it never stops beeping. Nick Drozd coined the term quasihalting to describe the event when a TM last beeps. A TM quasihalts if it beeps only a finite number of times.^[2] The Beeping Busy Beaver problem is analogous to the Busy Beaver problem, replacing halting with quasihalting. In other words, let ${\displaystyle b(M)}$ be the number of steps the machine M takes until it quasihalts (beeps for the last time) if it quasihalts (we will say ${\displaystyle b(M)=\infty }$ if the TM never stops beeping). Then

$${\displaystyle \operatorname {BBB} (n):=\max _{M\in T(n)\ :\ b(M)<\infty }b(M)}$$

where ${\displaystyle T(n)}$ is the set of Turing machines with ${\displaystyle n}$ states and two symbols.

Note that these Turing machines need not ever halt, so the Tree Normal Form algorithm needs to be modified (to allow TMs with no halt transitions) when searching for BBB champions.

Significance

It is easy to see that ${\displaystyle \operatorname {BBB} (n)\geq \operatorname {BB} (n)}$, by letting the beep state be the state that is reached immediately before the halt state.

In fact, BBB grows much faster than BB. BBB eventually dominates any computable function augmented with an oracle for computing BB. So, for example, there exists some N such that for all n > N:

• ${\displaystyle BBB(n)>BB(BB(n))}$
• ${\displaystyle BBB(n)>BB^{n}(n)}$, where ${\displaystyle BB^{k}}$ represents k iterations of BB
• ${\displaystyle BBB(n)>BB^{BB(n)}(n)}$

etc.

Results

• BBB(1) = 1^[1]
• BBB(2) = 6^[1] by 1RB1LB_1LB1LA (bbch)
• BBB(3) = 55 by 1LB0RB_1RA0LC_1RC1RA (bbch)
• BBB(4) ≥ 32,779,478 by 1RB1LD_1RC1RB_1LC1LA_0RC0RD (bbch)
• BBB(5) ≥ 10^14,006[3] by 1RB1LE_0LC0LB_0LD1LC_1RD1RA_0RC0LA (bbch) and probably ${\displaystyle BBB(5)\geq 10^{10^{10^{5}}}}$ due to a "probviously" quasihalting Cryptid.^[4]

• BBB(2,3) = 59^[5]
• BBB(3,3) ≥ 10↑↑6^[6] by 1RB0LB2LA_1LA0RC0LB_2RC2RB0LC (bbch)
• BBB(2,4) > ${\displaystyle 2\times 10^{23}}$^[7] by 1RB2LA1RA1LB_0LB2RB3RB1LA (bbch)

All known champions quasihalt by becoming Translated Cyclers, a property which is known to be weaker than the general quasihalting condition.

Beeping Booping Busy Beavers

An extension devised by Bram Cohen goes as follows: a Turing machine has two special transitions, a beep transition and a boop transition, both of which repeat infinitely often. The machine outputs an integer sequence corresponding to the number of beeps between successive boops. The machine's number is the number of transitions it takes to finish the first output value that is repeated infinitely many times. These machines are considered equivalent to Turing machines with second-order oracles.^[8]

References