How is it possible to define abstract types in Agda. We use **typedecl** in Isabelle to do so.

More precisely, I would like the agda counterpart of the below code in Isabelle:

```
typedecl A
```

Thanks

You could use parametrized modules. Let's have a look at an example: we start by introducing a record `Nats`

packing a `Set`

together with operations on it.

```
record Nats : Set₁ where
field
Nat : Set
zero : Nat
succ : Nat → Nat
primrec : {B : Set} (z : B) (s : Nat → B → B) → Nat → B
```

We can then define a module parametrized by such a structure. Addition and multiplication can be defined in terms of primitive recursion, zero and successor.

```
open import Function
module AbstractType (nats : Nats) where
open Nats nats
add : Nat → Nat → Nat
add m n = primrec n (const succ) m
mult : Nat → Nat → Nat
mult m n = primrec zero (const (add n)) m
```

Finally we can provide instances of `Nats`

. Here I reuse the natural numbers as defined in the standard library but one could use binary numbers for instance.

```
open Nats
Natsℕ : Nats
Natsℕ = record { Nat = ℕ
; zero = 0
; succ = suc
; primrec = primrecℕ }
where
open import Data.Nat
primrecℕ : {B : Set} (z : B) (s : ℕ → B → B) → ℕ → B
primrecℕ z s zero = z
primrecℕ z s (suc n) = s n $ primrecℕ z s n
```

Passing this instance to the module, gives us the corresponding add / mult operations:

```
open import Relation.Binary.PropositionalEquality
example :
let open AbstractType Natsℕ
in mult (add 0 3) 3 ≡ 9
example = refl
```

`typedecl`

used in production code in Isabelle. I'd rather suggest to use type classes or locales for staying abstract. – chris Nov 12 '14 at 17:22