# Haskell: How to sum a list of functions?

I want to use recursion in Haskell. I define:

pf:: Int -> Int
pf 1 = 1
pf n = pf 1 + sum[pf 1..pf n-1]

But the sum is not correct! What is the proper way to sum a list of functions?

-
The list you're summing consists of Ints, not functions. It's also not clear what you want to achieve, i.e. what you want "correct" to be. –  gspr Feb 3 '13 at 19:28
Also note that pf n-1 means (pf n)-1, not pf (n-1). –  dave4420 Feb 3 '13 at 19:41

[pf 1..pf (n-1)] is not the same as [pf 1, pf 2, pf 3, ..., pf (n-1)].

> let f x = 2^x
> [f 1 .. f 4]
[2,3,4,5,6,7,8,9,10,11,12,13,14,15,16]
> [f 1, f 2, f 3, f 4]
[2,4,8,16]

You probably want map:

pf n = pf 1 + sum (map pf [1..n-1])

And, just as a remark, pf x = 2^(x-1).

-
Got it, thank you so much dude! –  Charlie Victor Feb 3 '13 at 19:53
@CharlieVictor Then mark the answer as “accepted”, and we will all live happily ever after :) –  Artyom Feb 3 '13 at 19:57
I wonder how I do that?1 –  Charlie Victor Feb 3 '13 at 20:13
@CharlieVictor Just click on the check box outline to the left of the answer. –  Artyom Feb 3 '13 at 20:17

Starting with the accepted answer, we can do the following refinement

pf n = pf 1 + sum (map pf [1..n-1])

We sum pf 1 with a sum, then its just a sum
The usual sum can be express using fold as follow

sum = fold (+) 0

Here 0 can be view as the seed of the sum, to convince you enter the two following expression in ghci

foldl (+) 10 [1..10] -- return 65
10 + sum [1..10]    -- return 65 too

In our example the seed is equal to pf 1, which lead us to

pf n = foldl (+) (pf 1) (map pf [1..n-1])

Again we can rewrite a term, this time I will focus on list range [1..n-1]

enumFromTo 1 (n-1) = [1..n-1]

Or n-1 could be rewrite (again) as pred n, then we have

enumFromTo 1 (pred n) = [1..n-1]

Substituting in the main expression, we obtain

pf n = foldl (+) (pf 1) (map pf (enumFromTo 1 (pred n)))

Now we can express the main expression in point free style

pf = foldl (+) (pf 1) . map pf . enumFromTo 1 . pred

We can do more considering than map could be express in term of fold, but for sure we will lost in readability, just note that

map f = foldl (\x xs -> f x : xs) []
-
map f = foldr ..., not foldl. –  Will Ness Oct 31 '13 at 6:30