Importance for strict evaluation in a tail-recursive definition of the power function

I understand this function and the tail-recursion but I can't figure out why the strict evaluation is important. Without the strict evaluation it would still be tail-recursive, right? So when will this function fail without strict evaluation?

``````turboPower a b = turboPower' 1 a b
where
turboPower' x a 0 = x
turboPower' x a b
| x `seq` a `seq` b `seq` False = undefined
| even b = turboPower' x (a*a) (b `div` 2)
| otherwise = turboPower' (x*a) a (b-1)
``````
-
Btw, a better way to achieve the extra strictness these days is to use `BangPatterns`. –  kosmikus Oct 5 '12 at 11:56

It will not fail (unless the exponent is huge, so the thunks may become large enough to overflow the stack), it will (may) just be less efficient, since without the strict evaluation, the arguments become thunks, leading to

``````turboPower' (let xN = let x(N-1) = ...; a(N-1) = ... in x(N-1)*a(N-1)) (let aN = let a(N-1) = ... in a(N-1)*a(n-1)) (let bN = ...)
``````

It shouldn't be too dramatic here, since the level of nesting is logarithmic in the exponent, and thus remains small for all practical computations, but it would make a huge difference for example in

``````foo :: Integer -> Integer
foo n = go 0 n
where
go acc m
| m < 1     = acc
| otherwise = go (acc + m^3 + m `mod` 7) (m-1)
``````

where the level of nesting is linear in `n`.

-
Thanks! Now it's clear. :) –  user1305497 Oct 5 '12 at 11:05