_{(page down for manual derivation)} *Find the type of *`head . filter fst`

== `((.) head) (filter fst)`

, given

```
head :: [a] -> a
(.) :: (b -> c) -> ((a -> b) -> (a -> c))
filter :: (a -> Bool) -> ([a] -> [a])
fst :: (a, b) -> a
```

This is achieved *in a purely mechanical manner* by a small Prolog program:

```
type(head, arrow(list(A) , A)). %% -- known facts
type(compose, arrow(arrow(B, C) , arrow(arrow(A, B), arrow(A, C)))).
type(filter, arrow(arrow(A, bool), arrow(list(A) , list(A)))).
type(fst, arrow(pair(A, B) , A)).
type([F, X], T):- type(F, arrow(A, T)), type(X, A). %% -- application rule
```

which automagically produces, when run in a Prolog interpreter,

```
3 ?- type([[compose, head], [filter, fst]], T).
T = arrow(list(pair(bool, A)), pair(bool, A)) %% -- [(Bool,a)] -> (Bool,a)
```

where types are represented as compound data terms, in a purely syntactical manner. E.g. the type `[a] -> a`

is represented by `arrow(list(A), A)`

, with possible Haskell equivalent `Arrow (List (Logvar "a")) (Logvar "a")`

, given the appropriate `data`

definitions.

Only one inference rule, that of an *application*, was used, as well as Prolog's structural unification where *compound terms match* if they have the same shape and their constituents match: *f(a*_{1}, a_{2}, ... a_{n}) and *g(b*_{1}, b_{2}, ... b_{m}) match iff *f* is the same as *g*, *n == m* and *a*_{i} matches *b*_{i}, with logical variables being able to take on any value as needed, but only *once* (can't be changed).

```
4 ?- type([compose, head], T1). %% -- (.) head :: (a -> [b]) -> (a -> b)
T1 = arrow(arrow(A, list(B)), arrow(A, B))
5 ?- type([filter, fst], T2). %% -- filter fst :: [(Bool,a)] -> [(Bool,a)]
T2 = arrow(list(pair(bool, A)), list(pair(bool, A)))
```

To perform type inference *manually* in a mechanical fashion, involves writing things one under another, noting equivalences on the side and performing the substitutions thus mimicking the operations of Prolog. We can treat any `->, (_,_), []`

etc. purely as syntactical markers, without understanding their meaning at all, and perform the process mechanically using structural unification and, here, only one rule of type inference, viz. rule of *application*: `(a -> b) c ⊢ b {a ~ c}`

(replace a juxtaposition of `(a -> b)`

and `c`

, with `b`

, under the equivalence of `a`

and `c`

). It is important to rename logical variables, consistently, to avoid name clashes:

```
(.) :: (b -> c ) -> ((a -> b ) -> (a -> c )) b ~ [a1],
head :: [a1] -> a1 c ~ a1
(.) head :: (a ->[a1]) -> (a -> c )
(a ->[c] ) -> (a -> c )
---------------------------------------------------------
filter :: ( a -> Bool) -> ([a] -> [a]) a ~ (a1,b),
fst :: (a1, b) -> a1 Bool ~ a1
filter fst :: [(a1,b)] -> [(a1,b)]
[(Bool,b)] -> [(Bool,b)]
---------------------------------------------------------
(.) head :: ( a -> [ c ]) -> (a -> c) a ~ [(Bool,b)]
filter fst :: [(Bool,b)] -> [(Bool,b)] c ~ (Bool,b)
((.) head) (filter fst) :: a -> c
[(Bool,b)] -> (Bool,b)
```