# A definition for finite sets in Agda

I am new to Agda. I'm reading the paper "Dependent Types at Work" by Ana Bove and Peter Dybjer. I don't understand the discussion of Finite Sets (on page 15 in my copy).

The paper defines a `Fin` type:

``````data Fin : Nat -> Set where
fzero : {n : Nat} -> Fin (succ n)
fsucc : {n : Nat} -> Fin n -> Fin (succ n)
``````

I must be missing something obvious. I don't understand how this definition works. Could someone simply translate the definition of `Fin` into everyday English? That might be all I need to understand this part of the paper.

Thanks for taking the time to read my question. I appreciate it.

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``````data Fin : Nat -> Set where
``````

Fin is a data type parametrized by a natural number (or: `Fin` is a type-level function which takes a `Nat` and returns a `Set` (basic type), i.e. for any natural number `n` `Fin n` is a `Set`).

``````    fzero : {n : Nat} -> Fin (succ n)
``````

For all natural numbers `n` `fzero` is a member of the type/set `Fin (succ n)` (from which follows that for all positive numbers (i.e. all naturals except zero) `n` `fzero` is a member of `Fin n`).

``````    fsucc : {n : Nat} -> Fin n -> Fin (succ n)
``````

For all natural numbers `n` and all values `m` of type `Fin n`, `fsucc m` is a member of type `Fin (succ n)`.

So `fzero` is a member of `Fin n` for all `n` except zero and `fsucc m` is a member of `Fin n` for all `n` which represent a number greater than `fsucc m`.

Basically `Fin n` represents the Set of all natural numbers smaller than `n`, i.e. of all valid indices for lists of size `n`.

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Thank you for taking the time to answer my question. Your explanation is clear and easy to understand. This is exactly what I needed. Thanks again. –  John V. Aug 26 '11 at 22:29