Probvious: Difference between revisions

"Probvious" (a portmanteau of the words probabilistic and obvious) is an adjective used to express a high degree of confidence about a mathematical statement that is not known to be true. It was introduced by John Conway in an article discussing possibly unprovable statements.^[1] The term has been used by bbchallenge contributors to describe the solutions to halting problems for Cryptids such as Bigfoot and Hydra.

Usage

The word appears in Conway's article a few times as a way of forming conjectures about a known Collatz-like function.^[2][3] This function, denoted ${\displaystyle \mu (n)}$, is defined as:

$${\displaystyle {\begin{array}{lll}\mu (2n)&=&3n\\\mu (4n+1)&=&3n+1\\\mu (4n+3)&=&3n+2\end{array}}\Rightarrow {\begin{array}{lll}\mu ^{-1}(3n)&=&2n\\\mu ^{-1}(3n+1)&=&4n+1\\\mu ^{-1}(3n+2)&=&4n+3\end{array}}}$$

${\displaystyle (\cdots ,8,\mu (8),\mu ^{2}(8),\cdots )}$

${\displaystyle (\cdots ,14,\mu (14),\mu ^{2}(14),\cdots )}$

Likewise, there exist Turing machines for which determining whether they halt requires solving a mathematical problem believed to be difficult, oftentimes a Collatz-like problem, but arguments using probabilistic versions of their behaviour suggest a clear solution. For example, Bigfoot and Hydra are probviously non-halting because they simulate biased random walks that drift towards infinity yet must reach zero for these machines to halt. Alternatively, Lucy's Moonlight is probviously halting because it simulates a sequence of independent random trials for which it has a fixed probability of halting each time.

References