Your function signature permits any function `a->m b`

on input, yet inside you assume a specific range of values. `convert`

is not as polymorphic as the signature seems to declare.

What you have done is created a Map from a to b, then made a pure function that looks up a pure value in that map. Here's why:

What you are asking for is similar to implementing tensorial strength `strength :: (Monad m) => (a, m b) -> m (a, b)`

for a monoidal category (C, ⊗, I) - given a binary relation ⊗ in category C and a monad m, convert a ⊗ m b to m (a ⊗ b). When this is possible for a binary relationship that meets certain requirements, the monad is strong. In Haskell all monads are strong, if tensorial product a ⊗ b is chosen to be a pair `(a, b)`

: `strength (a, mb) = mb >>= return . (a,)`

. Yet, here you are attempting to do the same for a binary relationship `->`

. Unfortunately, `a -> b`

cannot be chosen to be a tensor product, because it is not a bi-functor - it is contravariant in `a`

. So what you want cannot be accomplished for arbitrary functions.

What is different in your case, is that essentially you built all pairs `(a,b)`

. The amount of code, therefore, can be reduced if you explicitly enumerate all possible pairs of `a`

and `b`

, for example by building a `m (Map a b)`

. The others here offered nice sugars exposing "function-like" interfaces, but they are merely lookups in the map.

possiblevalue of`A`

, even for those that do not occur. – Joachim Breitner Sep 19 '13 at 9:04`A`

to an icon`B`

have the type`A -> IO B`

and not just`A -> B`

? – Chris Taylor Sep 19 '13 at 10:44`A -> IO B`

is the loading of that file.`A -> B`

is a cache of results of`A -> IO B`

. – Karolis Juodelė Sep 19 '13 at 11:04