# How is the syntax of type systems read?

I have the following types for functions:

``````Quad = square · square
Square :: Integer -> Integer (So this function takes an integer as an input and outputs an integer)

The operator · is used in the definition of quad with type:

(·) :: (Integer -> Integer) -> (Integer -> Integer) -> Integer -> Integer
``````

I am unsure how the above is read as and the meaning behind it.

-

The double `::` suggests this is Haskell, but the general principles are the same across all ML inspired languages (most, and type theoretic convention, is to use a single `:`).

The `::` symbol says that its left hand side has the type of its right hand side. So

``````1 :: Integer
``````

The `->` constructs a function type.

``````timesTwo :: Integer -> Integer
``````

Further, `->` is right associative.

``````plus :: Integer -> Integer -> Integer
``````

says the function `plus` takes an integer and gives back a function which takes an integer and gives back an integer. This is equivalent to taking two integers, but is technically different (and in a sense, simpler). It is known as currying.

``````square :: Integer -> Integer
``````

says that square takes an integer and returns an integer.

Often, in type theory and functional programming languages we make use of type variables, so

``````id :: forall a. a -> a
id x = x
``````

says that for any type `a` id is a function from a value of that type to another value of the same type. Your `.` operator makes more sense when it is given a more general type using variables

``````(·) :: (b -> c) -> (a -> b) -> a -> c
f . g x = f (g (x))
``````

is the function composition function. It is a higher order function that takes two functions as arguments. More formally, for any types `a`, `b`, and `c`, `(.)` is a function from a function from `b` to `c` to a function from `a` to `b` to a function from `a` to `c`. The final function is just the composition of the two argument functions.

You have specialized `.` to only work on Integers. But, the idea is the same. You take two functions from `Integer -> Integer` and an `Integer`, you apply the first function, and then apply the second function the the result.

`(.)` or `(+)` is just Haskell for "this is an infix operator but I want to talk about it right now in prefix form."

So, `Quad` is just a function from `Integer -> Integer` that calls square on its argument, and then calls square again on the result. It would be the same as

``````quad x = square (square x)
``````