I take a little issue with the upvoted answer for isomorphism, as the category theory definition of isomorphism says nothing about objects. To see why, let's review the definition.
An isomorphism is a pair of morphisms (i.e. functions),
g, such that:
f . g = id
g . f = id
These morphisms are then called "iso"morphisms. A lot of people don't catch that the "morphism" in isomorphism refers to the function and not the object. However, you would say that the objects they connect are "isomorphic", which is what the other answer is describing.
Notice that the definition of isomorphism does not say what (
= must be. The only requirement is that, whatever they are, they also satisfy the category laws:
f . id = f
id . f = f
(f . g) . h = f . (g . h)
Composition (i.e. (
.)) joins two morphisms into one morphism and
id denotes some sort of "identity" transition. This means that if our isomorphisms cancel out to the identity morphism
id, then you can think of them as inverses of each other.
For the specific case where the morphisms are functions, then
id is defined as the identity function:
id x = x
... and composition is defined as:
(f . g) x = f (g x)
... and two functions are isomorphisms if they cancel out to the identity function
id when you compose them.
Morphisms versus objects
However, there are multiple ways two objects could be isomorphic. For example, given the following two types:
data T1 = A | B
data T2 = C | D
There are two isomorphisms between them:
f1 t1 = case t1 of
A -> C
B -> D
g1 t2 = case t2 of
C -> A
D -> B
(f1 . g1) t2 = case t2 of
C -> C
D -> D
(f1 . g1) t2 = t2
f1 . g1 = id :: T2 -> T2
(g1 . f1) t1 = case t1 of
A -> A
B -> B
(g1 . f1) t1 = t1
g1 . f1 = id :: T1 -> T1
f2 t1 = case t1 of
A -> D
B -> C
g2 t2 = case t2 of
C -> B
D -> A
f2 . g2 = id :: T2 -> T2
g2 . f2 = id :: T1 -> T1
So that's why it's better to describe the isomorphism in terms of the specific functions relating the two objects rather than the two objects, since there may not necessarily be a unique pair of functions between two objects that satisfy the isomorphism laws.
Also, note that it is not sufficient for the functions to be invertible. For example, the following function pairs are not isomorphisms:
f1 . g2 :: T2 -> T2
f2 . g1 :: T2 -> T2
Even though no information is lost when you compose
f1 . g2, you don't return back to your original state, even if the final state has the same type.
Also, isomorphisms don't have to be between concrete data types. Here's an example of two canonical isomorphisms are not between concrete algebraic data types and instead simply relate functions:
curry . uncurry = id :: (a -> b -> c) -> (a -> b -> c)
uncurry . curry = id :: ((a, b) -> c) -> ((a, b) -> c)
Uses for Isomorphisms
One use of isomorphisms is to Church-encode data types as functions. For example,
Bool is isomorphic to
forall a . a -> a -> a:
f :: Bool -> (forall a . a -> a -> a)
f True = \a b -> a
f False = \a b -> b
g :: (forall a . a -> a -> a) -> Bool
g b = b True False
f . g = id and
g . f = id.
The benefit of Church encoding data types is that they sometimes run faster (because Church-encoding is continuation-passing style) and they can be implemented in languages that don't even have language support for algebraic data types at all.
Sometimes one tries to compare one library's implementation of some feature to another library's implementation, and if you can prove that they are isomorphic, then you can prove that they are equally powerful. Also, the isomorphisms describe how to translate one library into the other.
For example, there are two approaches that provide the ability to define a monad from a functor's signature. One is the free monad, provided by the
free package and the other is operational semantics, provided by the
If you look at the two core data types, they look different, especially their second constructors:
-- modified from the original to not be a monad transformer
data Program instr a where
Lift :: a -> Program instr a
Bind :: Program instr b -> (b -> Program instr a) -> Program instr a
Instr :: instr a -> Program instr a
data Free f r = Pure r | Free (f (Free f r))
... but they are actually isomorphic! That means that both approaches are equally powerful and any code written in one approach can be translated mechanically into the other approach using the isomorphisms.
Isomorphisms that are not functions
Also, isomorphisms are not limited to functions. They are actually defined for any
Category and Haskell has lots of categories. This is why it's more useful to think in terms of morphisms rather than data types.
For example, the
Lens type (from
data-lens) forms a category where you can compose lenses and have an identity lens. So using our above data type, we can define two lenses that are isomorphisms:
lens1 = iso f1 g1 :: Lens T1 T2
lens2 = iso g1 f1 :: Lens T2 T1
lens1 . lens2 = id :: Lens T1 T1
lens2 . lens1 = id :: Lens T2 T2
Note that there are two isomorphisms in play. One is the isomorphism that is used to build each lens (i.e.
g1) (and that's also why that construction function is called
iso), and then the lenses themselves are also isomorphisms. Note that in the above formulation, the composition (
.) used is not function composition but rather lens composition, and the
id is not the identity function, but instead is the identity lens:
id = iso id id
Which means that if we compose our two lenses, the result should be indistinguishable from that identity lens.