# Name of type pattern: R a b = Q (a -> (R a b,b))

I am looking for some vocabulary here. There are a number of shapes that have common names. For example `L a = Empty | Cons a L` Is generally called a "list," while `T a = Leaf a | Node (T a) (T a)` is a "binary tree" and `St s a :: St (s->(a,s))` is the form of the State Monad.

I would like to know if a shape like this has a name:

``````data  R a b = Q (a -> (R a b,b))
``````

I've seen this pattern in Arrow frameworks and State Machine implementations. The recursive function makes it feel a little like a State Monad or a Cont Monad. It is also the only structure besides `(->)` and `(>=>)` for which I have seen an instance of Arrow defined.

Is there a common name for this data structure?

-
You've got a bonsai tree there :). A better binary tree is `T a = Branch (T a) (T a) | Leaf a` –  amindfv Feb 28 '12 at 20:46
@amindfy: You are correct. I've fixed it. Thank you. –  John F. Miller Feb 28 '12 at 23:44
@JohnF.Miller wouldn't you want to store some `a` somewhere in that `T a`? :D (sorry... I had to...) (or maybe it's a phantom type!? :p) –  Ptival Feb 28 '12 at 23:54

This is an automaton arrow, also known as a Mealy machine. Your specific example just uses `(->)` as the underlying arrow; another common choice is `Kleisli m` for some monad m (which just turns `a -> b` into `a -> m b`; for example, `data R a b = Q (a -> MyMonad (b, R a b))`).

It's commonly used in functional reactive programming (specifically, arrowised FRP — see, e.g. netwire and these two blog posts: 1, 2), and has applications to general stream processing (like iteratees).

It's similar to a coroutine in many ways, but it's a more specific concept. The two blog posts I linked call them coroutines, so "coroutine" is certainly a common way to refer to it, but the precise name is an automaton arrow.

-
This is exactly what I was looking for and more. Thank you for the very complete answer. –  John F. Miller Feb 28 '12 at 23:47

I would call that data structure a Coroutine.

It expresses a computation that can be controlled in parallel to some other computation, and that can be evaluated step-wise. While the interface you present isn't the exact interface that is used for the class of Coroutines in Haskell (A more general Coroutine is also monad-agnostic, meaning that the wrapped function returns a `m (R a b, b)`, and coroutines do not have to consume input, while you here always have to feed the computation with an `a`), it is similar enough.

The data structure also represents a subset of what is called Comonads.

-