Reading through this question and this blog post got me thinking more about type algebra and specifically how to abuse it.
Basically,
1) We can think of the Either A B
type as addition: A+B
2) We can think of the ordered pair (A,B)
as multiplication: A*B
3) We can think of the function A -> B
as exponentiation: B^A
There's an obvious pattern going on here: Multiplication is repeated addition, and exponentiation is repeated multiplication. This led Knuth to define the up arrow ↑ as exponentiation, ↑↑ as repeated exponentiation, ↑↑↑ as repeated ↑↑, and so on. Thus, 10↑↑↑↑10 is a HUGE number.
My question is: how can the function ↑↑↑↑↑↑↑↑↑↑↑↑↑↑↑↑↑↑ be represented in algebraic data
types? It seems like ↑ should be a function with an infinitite number of arguments, but that doesn't make much sense. Would A↑B
simply be [A] -> B
and thus A↑↑↑↑B
be [[[[A]]]]->B
?
Bonus points if you can explain what the Ackerman function would look like, or any of the other hypergrowth functions.
aˣ
withx->a
is already a bit ad-hoc, only rather happens to have isomorphy betweenaˣ⁺ʸ
andaˣ+aʸ
as well asaˣʸ
and(aˣ)ʸ
. But these isomorphies aren't exactly canonical.