As Gabriel says in a comment, you are combining manual recursion (the pattern match `(x:xs)`

) with `foldr`

in quite an unusual way. Usually you want to use *either* manual recursion, or you use `foldr`

in cases where the recursion follows the pattern "repeatedly apply a function to the elements of a list until you've exhausted the list".

I assume your `add`

function looks something like this:

```
add :: String -> BST -> BST
add string Empty = MakeNode Empty string Empty
add string (MakeNode l s r) =
if string < s
then MakeNode (add string l) s r
else MakeNode l s (add string r)
```

With this out of the way, the function `listToTree`

would normally be written in one of two ways. The first is using pattern matching and recursion:

```
listToTree [] = Empty
listToTree (x:xs) = add x (listToTree xs)
```

That is, either you have an empty list, in which case you return the empty tree, or you have a head followed by a tail, in which case you add the head of the list to the tree returned by the tail of the list.

The other approach is to write `listToTree`

by folding over the list. This abstracts out the recursion for you, so that you can just write

```
listToTree = foldr add Empty
```

This works because `foldr`

has the type

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

and `add`

and `Empty`

have the types

```
add :: String -> BST -> BST
Empty :: BST
```

specialising the types `a`

and `b`

, you get

```
foldr :: (String -> BST -> BST) -> BST -> [String] -> BST
```

which means that

```
foldr add Empty :: [String] -> BST
```

Which of these should you prefer? Perhaps the first one is easier for a beginner to read and understand. However, as you gain more experience with Haskell you will find the second version becomes easier to understand. It's also more concise, and the fact that it's written in terms of a fold allows list fusion rules to be triggered more frequently, which may result in more efficient code.

## Understanding foldr

The key to understanding folds, in my opinion, is to realize that a fold replaces list constructors with whatever functions and constants you give it. In Haskell there are two possible constructors for a list:

```
[] :: [a]
(:) :: a -> [a] -> [a]
```

When you desugar all the syntax, lists actually look like this (this is valid Haskell - try it out!)

```
xs = 1 : 2 : 3 : []
```

When you call `foldr op x0 xs`

, the fold effectively replaces all of the `(:)`

constructors in `xs`

with `op`

, and all of the `[]`

constructors with `x0`

:

```
foldr op x0 xs = 1 `op` 2 `op` 3 `op` x0
```

Of course, there's an ambiguity here, because we don't know whether `op`

associates to the left or to the right. In order for the types to work out, you must provide a function that associates to the right (that's why it's called a *right* fold), like this:

```
foldr op x0 xs = 1 `op` (2 `op (3 `op` x0))
```

A left fold is the same, except that it associates to the left instead (and puts the initial value at the start of the list rather than the end) so you end up with

```
foldl op x0 xs = ((x0 `op` 1) `op` 2) `op` 3
```

`foldr`

at the same time. The usual usage of`foldr`

is to replace manual recursion, not supplement it. – Gabriel Gonzalez Feb 28 '13 at 22:50