# Implicit Arguments¶

It is possible to omit terms that the type checker can figure out for
itself, replacing them by `_`

.
If the type checker cannot infer the value of an `_`

it will report
an error.
For instance, for the polymorphic identity function

```
id : (A : Set) → A → A
```

the first argument can be inferred from the type of the second argument,
so we might write `id _ zero`

for the application of the identity function to `zero`

.

We can even write this function application without the first argument. In that case we declare an implicit function space:

```
id : {A : Set} → A → A
```

and then we can use the notation `id zero`

.

Another example:

```
_==_ : {A : Set} → A → A → Set
subst : {A : Set} (C : A → Set) {x y : A} → x == y → C x → C y
```

Note how the first argument to `_==_`

is left implicit.
Similarly, we may leave out the implicit arguments `A`

, `x`

, and `y`

in an
application of `subst`

.
To give an implicit argument explicitly, enclose in curly braces.
The following two expressions are equivalent:

```
x1 = subst C eq cx
x2 = subst {_} C {_} {_} eq cx
```

It is worth noting that implicit arguments are also inserted at the end of an application,
if it is required by the type.
For example, in the following, `y1`

and `y2`

are equivalent.

```
y1 : a == b → C a → C b
y1 = subst C
y2 : a == b → C a → C b
y2 = subst C {_} {_}
```

Implicit arguments are inserted eagerly in left-hand sides so `y3`

and `y4`

are equivalent. An exception is when no type signature is given, in which case
no implicit argument insertion takes place. Thus in the definition of `y5`

there only implicit is the `A`

argument of `subst`

.

```
y3 : {x y : A} → x == y → C x → C y
y3 = subst C
y4 : {x y : A} → x == y → C x → C y
y4 {x} {y} = subst C {_} {_}
y5 = subst C
```

It is also possible to write lambda abstractions with implicit arguments. For
example, given `id : (A : Set) → A → A`

, we can define the identity function with
implicit type argument as

```
id’ = λ {A} → id A
```

Implicit arguments can also be referred to by name,
so if we want to give the expression `e`

explicitly for `y`

without giving a value for `x`

we can write

```
subst C {y = e} eq cx
```

When constructing implicit function spaces the implicit argument can be omitted,
so both expressions below are valid expressions of type `{A : Set} → A → A`

:

```
z1 = λ {A} x → x
z2 = λ x → x
```

The `∀`

(or `forall`

) syntax for function types also has implicit variants:

```
① : (∀ {x : A} → B) is-the-same-as ({x : A} → B)
② : (∀ {x} → B) is-the-same-as ({x : _} → B)
③ : (∀ {x y} → B) is-the-same-as (∀ {x} → ∀ {y} → B)
```

There are no restrictions on when a function space can be implicit. Internally, explicit and implicit function spaces are treated in the same way. This means that there are no guarantees that implicit arguments will be solved. When there are unsolved implicit arguments the type checker will give an error message indicating which application contains the unsolved arguments. The reason for this liberal approach to implicit arguments is that limiting the use of implicit argument to the cases where we guarantee that they are solved rules out many useful cases in practice.