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i am trying to compute the harmonic series with the function below. But there's a type error and not quite sure what it mean? another question, why [5..1] would gives an empty list?

sumHR = foldr (+) 0 (\x -> map (1/) [1..x])

error message:

*** Expression     : foldr (+) 0 (\x -> map (1 /) (enumFromTo x 1))
*** Term           : \x -> map (1 /) (enumFromTo x 1)    
*** Type           : b -> [b]    
*** Does not match : [a]    
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For your other question, see: Decrementing ranges in Haskell –  hammar May 14 '13 at 1:48

3 Answers 3

up vote 6 down vote accepted

The error is telling you that your code is not well-typed and thus doesn't make sense.

Your function:

sumHR = foldr (+) 0 (\x -> map (1/) [1..x])

Consider:

Prelude> :t foldr
foldr :: (a -> b -> b) -> b -> [a] -> b

So for this to be true, (+) is the first argument and the types must unify (a -> b -> b and Num a => a -> a -> a unify to Num a => a -> a -> a).

The second argument is given type variable b, which we already know must be Num a => a. This is fine, you have provided 0 as the second argument.

The third argument must agree with the type Num a => [a]. However, you have provided a second argument that is a function:

Prelude> :t (\x -> map (1/) [1..x])
(\x -> map (1/) [1..x]) :: (Enum b, Fractional b) => b -> [b]

Unless you can show the compiler how a type of (Enum b, Fractional b) => b -> [b] can be made the same as Num a => [a] then you are stuck.

You might have ment a function such as:

sumHR x = foldr (+) 0 (map (1/) [1..x])
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thank, this explain everything! –  wildplace May 14 '13 at 12:55

Were you trying to write it point-free? If so, you need to use the composition operator . to compose foldr (+) 0 with (\x -> map (1/) [1..x]).

sumHR = foldr (+) 0 . (\x -> map (1/) [1..x])

or, point-fully:

sumHR x = foldr (+) 0 (map (1/) [1..x])

(By the way, for efficiency you'll want to use foldl' instead of foldr)

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5  
instead of fold' (+) 0 why not sum? –  Philip JF May 14 '13 at 4:10
    
i like your answer as well for raising the dot operator! –  wildplace May 14 '13 at 12:56

The previous answers have explained how to fix the function with the signature you apparently want; however this isn't really a good way to compute a sequence since for each element you request it will have to start from the beginning. A far more efficient, an in Haskell actually easier, approach is to calculate one lazy list that represents the entire sequence. So, you start with

map (1/) [1..]

(or, perhaps more readable, [ 1/i | i<-[1..] ]), then perform "each element of the result is the sum of all preceding elements in the given list". This is called a scan. Since that is always strict in one entire side of the list (rather than just two elements, like a fold) it needs to be done from the left. You can write

sumHR' :: Fractional x => [x]
sumHR' = scanl (+) 0 [ 1/i | i<-[1..] ]

or, equivalently since the infinite list is never empty,

sumHR' = scanl1 (+) [ 1/i | i<-[1..] ]
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