# Rewrite recursion function as a pipeline functions composition

I'm writing my homework (CIS194 Haskell course).

I must rewrite the following recursive function to pipeline functions (without obvious recursion).

``````fun2 :: Integer -> Integer
fun2 1 = 0
fun2 n
| even n = n + fun2 ( n ‘div‘ 2 )
| otherwise = fun2 (3 * n + 1)
``````

My first try is here:

``````fun2''' = sum
. (filter (even))
. unfoldr (\x -> if (even x)
then Just (x, x `div` 2)
else if (x==1) then Nothing
else Just (x, x * 3 + 1))
``````

Is this a normal solution or is it weird?

And how can I rewrite `fun2` better?

Now i try write version with `takeWhile` and `iterate`

my 2nd try:

``````fun2'' :: Integer -> Integer
fun2'' = sum
. (filter even)
. takeWhile (/=1)
. iterate (\x -> if even x
then x `div` 2
else x * 3 + 1 )
``````

i have little problems with `until` version now.

-
A few unnecessary parentheses, but it's rather good. I'm optimisitc that your `takeWhile` + `iterate` approach will turn out well too. – Daniel Fischer Apr 21 '13 at 16:49
Also instead of returning `x` for the case when it's odd, you could return `Just (0, x * 3 + 1)` and avoid `filter`ing later. – Petr Pudlák Apr 21 '13 at 16:58
What about applying Collatz conjecture and writing as fun2 _ = 0 – Luka Rahne Apr 23 '13 at 7:56
@LukaRahne it is not 0. The function sums up all evens in a Collatz sequence for a given number. The conjecture states it's finite, and to be so it must end with a sequence of powers of 2, i.e. evens (up to the finishing 1). – Will Ness Apr 23 '13 at 22:43

Nested `if`s can now be written with multi-way IF:

``````g :: Integer -> Integer
g = sum .
unfoldr (\x->
if | even x    -> Just (x, x `div` 2)
| x==1      -> Nothing
| otherwise -> Just (0, x * 3 + 1))
``````

Or you can define your own if operator,

``````(??) t (c,a) | t = c | otherwise = a

g = sum . unfoldr (\x-> even x ?? (Just (x, x `div` 2) ,
(x==1) ??  (Nothing, Just (0, x * 3 + 1))))
``````

Same function with `until`, with `sum` and `filter` fused into it:

``````g = fst . until ((==1).snd)
(\(s,n) -> if even n then (s+n,n`div`2) else (s,3*n+1))
. ((,)0)
``````

or

``````g = sum . filter even . f

f :: Integer -> [Integer]
f = (1:) . fst . until ((==1).snd)
(\(s,n) -> if even n then (n:s,n`div`2) else (n:s,3*n+1))
. ((,)[])
``````

The last function, `f`, shows the whole Collatz sequence for a given input number, reversed.

-
Please, describe (1:) , ((,)0) , ((,)[]) sentences. I never meet it before. – Сергей Кузминский Apr 22 '13 at 18:31
@СергейКузминский That's "operator sections", i.e. partially applied operators. `(1:) == (:) 1 == (\y -> 1:y)`. `(,)x == (x ,) == (\y -> (x, y))`. See also stackoverflow.com/a/13477198/849891 . – Will Ness Apr 22 '13 at 21:29
@СергейКузминский congrats on reaching the 15 rep! :) You have the power to up-vote now. ;) ;) (and you always had the power to accept an answer). – Will Ness Apr 23 '13 at 7:06

Looks not bad, the only thing here that's a bit of a red flag in Haskell is `else if`. In this case, it can be rewritten nicely in applicative style:

``````{-# LANGUAGE TupleSections     #-}

import Control.Applicative

fun2''' = sum
. filter even
. unfoldr ( \x -> fmap (x,) \$
x`div`2 <\$ guard(even x)
<|> x*3 + 1 <\$ guard( x/=1 )
)
``````
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what does `<\$` mean? – גלעד ברקן Apr 21 '13 at 17:11
You can read a chain of `a<\$guard α <|> b<\$guard β <|> ...` much like what you'd write in a procedural language as `if α then return a; if β then return b...`. — It works like this: `guard ψ` is `Just ()` if ψ is true, and `Nothing` if it's false. `<\$` replaces the `()` with the value to its left, or leaves the `Nothing` as it is. `<|>` finally picks the first `Just a` it finds, skipping any `Nothing`s. – leftaroundabout Apr 21 '13 at 17:16
Thanks for explaining, I think I get it now. – גלעד ברקן Apr 21 '13 at 17:22
@groovy: `a <\$ b` is just `const a <\$> b` or `fmap (const a) b`. Think about it as a special version of `<\$>` that ignores the values on the right--that's why the symbol is just like `<\$>` without the right `>`. – Tikhon Jelvis Apr 21 '13 at 18:07
this code fails with a type mismatch error on Ideone. Sticking some `runKleisli` and `Kleisli` in there did the trick. But that's hardly an intuitive or easy-to-read code (for me at least). :) Is there an easier way to mend this code? – Will Ness Apr 22 '13 at 15:52