# Is there a single word that means “non-recursive datatype with two constructors”?

Is there a word that describes data types that

1. have exactly two constructors; and
2. are not recursive?

i.e. describes these types

``````data Bool = False | True
data Maybe a = Nothing | Just a
data Either l r = Left l | Right r
``````

but excludes these types

``````data Ordering = LT | EQ | GT  -- too many constructors
data () = ()                  -- too few constructors
data [a] = a | a : [a]        -- recursive definition
``````
-
Just out of curiosity, why do you ask? –  Antal S-Z Aug 31 '11 at 9:05
I'm curious :-) –  dave4420 Aug 31 '11 at 9:06
AFAIK there is no such word. Perhaps this is for a reason. –  Ingo Aug 31 '11 at 9:07
I was thinking about this these days, and I thought about "binary" or "dual" (this one may not be always applicable). –  Ionuț G. Stan Aug 31 '11 at 9:22
Would you call "data Foo a = One a | Many [a]" be a recursive type according to your standard? –  Chris Kuklewicz Aug 31 '11 at 13:23
show 1 more comment

I think the trait of having exactly two constructors is quite meaningless. Imagine the types:

``````data StrictOrdering = LT | GT
data Ordering' = EQ | NEQ !StrictOrdering
``````

The type `Ordering'` is equivalent to the `Ordering` you mentioned, differing only in '2-constructorness'.

On the other hand, `Maybe Bool`, `Either Bool Bool` and `Bool` are very different and don't seem to deserve the same name except for being called 'sum types'.

Now, one may find some similarities between `exists a. Maybe a` and `Bool`, but to point them out one needs more constraints than just '2-constructorness'.

-

"Having two constructors" is a property that carries little information about what can be represented by such a type. It means forcing to weak-head-normal-form (WHNF) allows a binary choice in a case statement. Perhaps you could call it a "Two Headed Type" to coin a phrase.

It is more useful to GHC as a way to create an optimized representation in RAM for the data, since GHC uses pointer tagging which helps for types up to 4 constructors (or 8 on 64-bit machines).

-