# Indicator function and semirings in COQ

I'm quite new with Coq, and I'm trying to define a "generic" indicator function, like this :

``````Function indicator (x : nat) : bool :=
match x with
| O => false
| _ => true
end.
``````

This one works well.

My problem is that I want an indicator function that returns `false` for the identity element of any semiring (for which I have a personal definition), not just for the natural number zero, like this :

``````Function indicator `(S : Semiring) (x : K) : bool :=
match x with
| ident => false
| _ => true
end.
``````

where `K` is defined in the semiring `S` as the set and `ident` is defined in the semiring `S`as the identity element.

This one doesn't work. I got the error:

``````This clause is redundant
``````

with the last line of the `match` underlined. However, I don't think the error really comes from here. I read that it may come from the line

``````    | ident => false
``````

because `ident` is a variable, but I don't have more clues.

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I thought `identity` was a function? don't you mean `unit`? – didierc Jun 3 '14 at 3:23
Yes, I meant `unit` instead of `ident`, if that's what you're wondering. – Jon Jun 3 '14 at 7:15
In classical logic, all semirings have the property `forall x, x = 0 \/ x <> 0`. In intuitionistic logic, only decidable semirings have that property. Equality on `nat` is decidable. – user3551663 Jun 5 '14 at 15:43
Another alternative besides using classical logic or adding an extra decidability hypothesis is to use double‐negation translation. – user3551663 Jun 5 '14 at 16:06

`nat` is an inductive type, created from two constructors:

``````Inductive nat: Set :=
| O : nat
| S : nat -> nat
.
``````

This means that any inhabitant of the `nat` type is always built by a combination of these 2 constructors.

You can "inspect" this construction by pattern matching, like you did in the first `indicator` definition. In the second case, your type `K` is a type variable (you don't want to have a fix type like `nat`), so you didn't explain how to build elements of `K`. Then, when you pattern match, the `ident` your wrote is just a binder, any name would have had the same effect (and `_` too). It has no link to the `indent` of your semiring. Coq said that the clause is redundant because `ident` already captured any element of type `K`, so the `_` case is never called.

If you want to write such a function for any type `K`, you will have to provide a way to compare elements of `K` (something of the type `K -> K -> bool`) and use it in your indicator function. I'm not sure about the syntax but you'll have something link:

``````Record SemiRing : Type := mkSemiRing {
K: Type;
ident : K;
compare : K -> K -> bool;
(* you might need the property that:
forall x y, compare x y = true -> x = y
*)
op1 : K -> K -> K;
op2 : K -> K -> K
(* and all the laws of semiring... *)
}.

Definition indicator (ring: SemiRing) (x: K ring) : bool :=
if compare ring x (ident ring) then true else false.
``````
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