Verify the type of a lambda expression

I need to verify the type for the lambda expression:

My method gives me:

Im trying to define it in Haskell (on Hugs) like this:

``````h= \f x -> f (f x)
``````

When i call the :type comamnd it gives me:

``````(a -> a) -> a -> a
``````

Is mi function correctly defined in Haskell?, or my method gives me a wrong result?

Note that `f` gets called with both `x` and `f x` as its argument—this immediately means that the type of `x` and the type of `f x` must be the same[1]. Carrying this argument onward, we see that since `x` is the input to `f` and `f x` is the output of `f`, the input and output of `f` must be the same[2].

Finally, we examine the lambda term

``````\f x -> f (f x)
``````

it has two inputs, `f` (a function) and `x`, and it returns whatever the return type of `f` is[3]. Putting all of this information together we have

``````(a -> b) -> c -> d

where:

b ~ c        by [1]
a ~ b        by [2]
d ~ b        by [3]
``````

thus the type which Haskell inferred is correct

``````h :: (a -> a) -> a -> a
h f x = f (f x)
``````
• It's important to note also that because of associativity of the `->` notation for types, this is the same as `(a -> a) -> (a -> a)` - this was probably part of OP's confusion. Mar 19, 2014 at 4:02

The type `(a -> b) -> (c -> d)` is equivalent to`(a -> b) -> c -> d` in haskells type system. You also need to consider, if x had type a, and `f x` has type b, then f has type `a -> b`. So let `y = f x`. So what is the type of `f y === f (f x)`?

Your type inference is incorrect though. The type of the `x` argument should unify with the type of the input to `f`, since you call `f x`, then the input type of `f` should unify with the output type of `f` since you call `f` on the result `(f x)`.