1RB1LD 1RC1RB 1LC1LA 0RC0RD: Difference between revisions

1RB1LD_1RC1RB_1LC1LA_0RC0RD (bbch)

Blanking Beaver BLB(4,2) champion which creates a blank tape after 32,779,477 steps. It was discovered and reported by Nick Drozd in 2021.^[1]

Analysis by Shawn Ligocki

Let

$${\displaystyle D(a,b)=0^{\infty }\;1^{a}\;0^{b}\;{\textrm {D>}}\;0^{\infty }}$$

$${\displaystyle {\begin{array}{lc}D(a+3,&b)&\to &D(a,b+5)\\D(0,&b)&=&{\textrm {Blank}}\\D(1,&b)&\to &D(b+2,4)\\D(2,&b)&\to &D(b+3,4)\\\end{array}}}$$

${\displaystyle D(a)=D(a,4)}$

$${\displaystyle {\begin{array}{lc}D(3k)&\to &{\textrm {Blank}}\\D(3k+1)&\to &D(5k+6)\\D(3k+2)&\to &D(5k+7)\\\end{array}}}$$

${\displaystyle D(2)}$

$${\displaystyle {\begin{array}{l}D(2)&\to &D(7)&\to &D(16)&\to &D(31)&\to &D(56)&\to &D(97)\\&\to &D(166)&\to &D(281)&\to &D(472)&\to &D(791)&\to &D(1322)\\&\to &D(2207)&\to &D(3682)&\to &D(6141)&\to &{\textrm {Blank}}\\\end{array}}}$$

Relation to other machines

The map and trajectory are equivalent to that of the BB(5) champion. For all ${\displaystyle k}$, let ${\displaystyle f(k)}$ be the number such that ${\displaystyle D(k)\to D(f(k))}$, or ${\displaystyle {\text{HALT}}}$ if ${\displaystyle D(k)\to {\textrm {Blank}}}$, and let ${\displaystyle g}$ be the map simulated by the BB(5) champion. Then:

$${\displaystyle {\begin{array}{lc}g(2(3k)+2)&=&g(6k+2)&=&{\text{HALT}}&=&f(3k)\\g(2(3k+1)+2)&=&g(6k+4)&=&10k+14&=&2f(3k+1)+2\\g(2(3k+2)+2)&=&g(6k+6)&=&10k+16&=&2f(3k+2)+2\\\end{array}}}$$

So the size of this machine's BLB output is tied to the size of the BB(5) champion's output.

References