`Tree a`

isn't a monad, either generally or for any particular `a`

, `Tree`

**itself** is a monad. A monad isn't a type, it's a correspondence between *any* type and a "monadic version" that type. For example, `Integer`

is the type of integers, and `Maybe Integer`

is the type of integers in the `Maybe`

monad.

Consequently, `StringTree`

, which is a type, can't be a monad. It's just not the same kind of thing. You can try to imagine it as the type of strings in a monad, but your functions `stringTreeReturn`

, etc, don't match the types of their monadic correspondents. Look at the type of `>>=`

in the `Maybe`

monad:

```
Maybe a -> (a -> Maybe b) -> Maybe b
```

The second argument is a function from some `a`

to **any** type in the `Maybe`

monad (`Maybe b`

). `stringTreeBind`

has the type:

```
String -> (String -> StringTree) -> StringTree
```

The second argument can only be a function from `String`

to the monadic version of `String`

, rather than to the monadic version of any type.

Consequently, you can't do everything you can do to values in an arbitrary monadic type to `StringTree`

values, which is why it can't be made an instance. Even if you could somehow get it treated as a monad, things would start going wrong when generic monadic code expects to be able to use generic monadic operations in ways that don't make sense for `StringTree`

.

Ultimately, if you're thinking of it as "like" a monad because it's `String`

in a container that can behave similarly to monadic containers, the easiest thing to do is simply make it a generic container of any type (`Tree a`

). If you need have auxiliary functionality that depends specifically on it being a tree of strings, then you can write that code as operating only on `Tree String`

values, and it will happily co-exist along with code that works generically on `Tree a`

.

`fmap (const ())`

result in? – Chris Kuklewicz Aug 22 '12 at 13:47`stringTreeFMap :: (String -> String) -> (StringTree -> StringTree)`

, but to really be a monad in the sense of category theory you need`join :: m (m a) -> m a`

, which doesn't fit at all. – Sjoerd Visscher Aug 22 '12 at 14:49`type StringTree = Tree String`

? – Gabriel Gonzalez Aug 22 '12 at 16:48`Monad`

instance for`StringTree`

, but I do believe that you could still use`do`

sugar by using the`RebindableSyntax`

language extension. – Dan Burton Aug 22 '12 at 22:52