# How do you define an ordered pair in Coq?

I am a programmer, but an ultra-newbie to Coq, and have tried to figure out the tutorials without much success. My question is very simple: How does one define an ordered pair (of natural numbers) in Coq?

Here was my attempt:

``````Variable node1 : nat.
Variable node2 : nat.
Inductive edge : type := node1 -> node2.
``````

(Note that "edge" is the name I am using for ordered pair.) The third line gives a syntax error, suggesting that I need a '.' in the sentence somewhere.

I don't know what to do. Any help would be great! (Also, is there a tutorial that helps teach very basic Coq concepts better than the ones that are easily seen given a Google search for "Coq Tutorial" ?)

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The natural solution would be to simply use a tuple: `nat * nat`. In reality, you probably want a sigma type that says something about well formed-ness to a certain graph. –  Kristopher Micinski Oct 2 '13 at 21:59
So an inductive? "Inductive edge : type : nat * nat." doesn't work either. –  Philip White Oct 2 '13 at 22:10
It's just a `Definition` in the case, you're applying the `*` constructor. You should find a better intro Coq tutorial, as it would explain this :-). The book CoqArt would be a good place to start –  Kristopher Micinski Oct 2 '13 at 22:12
I don't think that works, I think * is for nats. –  Philip White Oct 2 '13 at 22:14
It needs to be `type` scope for `*` to be interpreted properly. `Definition t := (nat * nat) % type.` –  Kristopher Micinski Oct 2 '13 at 22:17

You can do this simply enough by just using a Coq definition:

``````Definition ordered_pair := (nat * nat) % type.
``````

This introduces `ordered_pair` as a synonym for `(nat * nat) % type` (note that the `% type` is required to get Coq to interpret `*` in the scope of types, rather than naturals). The real power is in the use of `*`:

``````Inductive prod (A B:Type) : Type :=
pair : A -> B -> prod A B.
``````

You get all the necessary elimination principles, etc... from there.

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