I read in an algorithmic book that the Ackermann function cannot be made tail-recursive (what they say is "it can't be transformed into an iteration"). I'm pretty perplex about this, so I tried and come up with this:
let Ackb m n = let rec rAck cont m n = match (m, n) with | 0, n -> cont (n+1) | m, 0 -> rAck cont (m-1) 1 | m, n -> rAck (fun x -> rAck cont (m-1) x) m (n-1) in rAck (fun x -> x) m n ;;
(it's OCaml / F# code).
My problem is, I'm not sure that this is actually tail recursive. Could you confirm that it is? If not, why? And eventually, what does it mean when people say that the Ackermann function is not primitive recursive?