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Here is a Haskell function that takes a number n and returns the nth fibonacci number. (I've used the index scheme such that the 0th number is 0, the 1st number is 1, 2nd number is 1, 3rd number is 2, and so on.)

fib :: (Integral a) => a -> a
fib 0 = 0
fib n = fibhelper n 0 1

fibhelper :: (Integral a) => a -> a -> a -> a
fibhelper 1 x y = y
fibhelper n x y = fibhelper (n-1) y (x+y)

Now, suppose that, for the sake of efficiency, I want to bypass Haskell's lazy evaluation and force the evaluation of the updated arguments (using the $! operator, for instance?) What would be the most elegant/idiomatic way to do this?

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You're probably looking for bang patterns. –  Vitus Aug 19 '12 at 16:04
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1 Answer

up vote 8 down vote accepted

You can use bang patterns to do this.

{-# LANGUAGE BangPatterns #-}

fib :: (Integral a) => a -> a
fib 0 = 0
fib n = fibhelper n 0 1

-- Everything with a ! before it will be evaluated before the function body
fibhelper :: (Integral a) => a -> a -> a -> a
fibhelper 1 _ (!y) = y
fibhelper (!n) (!x) (!y) = fibhelper (n-1) y (x+y)
-- The above line is equivalent to:
--fibhelper n x y = n `seq` x `seq` y `seq` fibhelper (n-1) y (x+y)

Note also that you're a bit overzealous with the use of the Integral type class. Do you really want the index of the fibonacci series to be the same type as the values? I would suggest that you instead use the signature:

fib :: (Integral a, Integral b) => a -> b

Also, if you are looking for performance, the use of Integral should be avoided entirely.

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very clear. Thank you! –  dxh Aug 19 '12 at 16:16
    
You don't even need Integral for the result, Num will do fine. I'm worried about your bang patterns, though - isn't it the case that fibhelper 1 undefined 0 is 0, and hence the function isn't strict? –  Ben Millwood Aug 19 '12 at 21:33
    
Well, yeah, I didn't put a bang pattern before the _, and the patterns still match top-down. So, if the runtime sees that the first argument is 1, the first definition of fibhelper will apply, where the _ argument isn't forced. –  dflemstr Aug 19 '12 at 22:04
    
it would seem you don't need to force x anyway since it receives the previously forced y. –  Will Ness Aug 20 '12 at 0:03
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