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Given the following example

foldr(\ x y -> ........

if the input is a list for example [1,2,3]

what is x and what is y?

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2 Answers 2

up vote 5 down vote accepted

Let's take a look at the type for foldr.

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

Since you're providing the function that uses x and y, you can see from the type that x will be a value from your list ([1,2,3]), and y must be the accumulator value, which you initialize with the second parameter to foldr.

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let result :: b ; result = foldr (\(x :: a) -> \(y::b) -> undefined :: b) (undefined :: b) ([1,2,3] :: [a]) –  Thomas M. DuBuisson Oct 11 '12 at 3:03

The definition of foldr is

foldr f z []     = z
foldr f z (x:xs) = f x (foldr f z xs)

You can just apply it directly in your example:

foldr (\x y -> foo x y) z [1,2,3]
(\x y -> foo x y) 1 (foldr (\x y -> foo x y) z [2,3])
foo 1 (foldr (\x y -> foo x y) z [2,3])

So x is 1 and y is foldr (\x y ...) z [2,3]).

In general you can think of foldr f z as replacing every (:) in a list with f, and the [] with z. So foldr f z [a,b,c,d] = f a (f b (f c (f d z))) (since [a,b,c,d] = (:) a ((:) b ((:) c ((:) d []))).

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It might be worth pointing out that this is the functional definition of foldr, and that it isn't necessarily implemented this way. –  Cubic Oct 11 '12 at 11:24
Yes, but this definition (from the Report) is sufficient for reasoning about foldr's semantics. –  shachaf Oct 11 '12 at 18:47
I know its bit odd to respond a question months later.. but isn't foldr starting folding from right? Isn't the first step is f 3 z? –  Nob Wong Dec 11 '13 at 3:11
@NobWong: There is no "first step" as such, but there's an outermost redex, which involves the leftmost element. The "right" in "right fold" means that it's associated from the right, so foldr (*) z [a,b,c] is a * (b * (c * z)) -- note that multiplication by the first (leftmost) element is outermost. I recommend looking at the definition and evaluating a few foldrs (and foldls) by hand. –  shachaf Dec 11 '13 at 6:47

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