There are a couple of concepts you need to understand to make sense of this type signature and I don't know which ones you already do, so I tried my best to explain every important concept:

# Currying

As you know, if you have the type `foo -> bar`

, this describes a function taking an argument of type `foo`

and returning a result of type `bar`

. Since `->`

is right associative, the type `foo -> bar -> baz`

is the same as `foo -> (bar -> baz)`

and thus describes a function taking an argument of type `foo`

and returning a value of type `bar -> baz`

, which means the return value is a function taking a value of type `bar`

and returning a value of type `baz`

.

Such a function can be called like `my_function my_foo my_bar`

, which because function application is left-associative, is the same as `(my_function my_foo) my_bar`

, i.e. it applies `my_function`

to the argument `my_foo`

and then applies the function that is returned as a result to the argument `my_bar`

.

Because it can be called like this, a function of type `foo -> bar -> baz`

is often called "a function taking two arguments" and I will do so in the rest of this answer.

# Type variables

If you define a function like `let f x = x`

, it will have the type `'a -> 'a`

. But `'a`

isn't actually a type defined anywhere in the OCaml standard library, so what is it?

Any type that starts with a `'`

is a so-called *type variable*. A type variable can stand for any possible type. So in the example above `f`

can be called with an `int`

or a `string`

or a `list`

or anything at all - it doesn't matter.

Furthermore if the same type variable appears in a type signature more than once, it will stand for the same type. So in the example above that means, that the return type of `f`

is the same as the argument type. So if `f`

is called with an `int`

, it returns an `int`

. If it is called with a `string`

, it returns a `string`

and so on.

So a function of type `'a -> 'b -> 'a`

could take two arguments of any types (which might not be the same type for the first and second argument) and returns a value of the same type as the first argument, while a function of type `'a -> 'a -> 'a`

would take two arguments of the same type.

One note about type inference: Unless you explicitly give a function a type signature, OCaml will always infer the most general type possible for you. So unless a function uses any operations that only work with a given type (like `+`

for example), the inferred type will contain type variables.

# Now to explain the type...

```
val something : ('a -> 'b -> 'c) -> ('a -> 'd -> 'b) -> 'a -> 'd -> 'c = <fun>
```

This type signature tells you that `something`

is a function taking four arguments.

The type of the first argument is `'a -> 'b -> 'c`

. I.e. a function taking two arguments of arbitrary and possibly different types and returning a value of an arbitrary type.

The type of the second argument is `'a -> 'd -> 'b`

. This is again a function with two arguments. The important thing to note here is that the first argument of the function must have the same type as the first argument of the first function and the return value of the function must have the same type as the second argument of the first function.

The type of the third argument is `'a`

, which is also the type of the first arguments of both functions.

Lastly, the type of the fourth argument is `'d`

, which is the type of the second argument of the second function.

The return value will be of type `'c`

, i.e. the return type of the first function.