An unfold on lists would build a (potentially infinite) list from a seed value. Typically, the unfold takes a seed value x, a one-place operation unspool that yields a pairs of such items, and a predicate finished which determines when to finish the list (if ever). In the action of unfold, the first application of unspool, to the seed x, would yield unspool x = (y,z). The list defined by the unfold would then begin with y and be followed with the (potentially infinite) list that unfolds from the second term, z, with the same operations. So if unspool z = (u,v), then the list will begin y:u:..., where ... is the result of unfolding v with r, and so on.

A Haskell definition of an unfold, or anamorphism for lists, called ana, is as follows:

-- The type signature of 'ana':
ana :: (b->(a,b)) -> (b->Bool)-> b -> [a]   
-- Its definition:
ana unspool finished x = if finished x
                        then []
                        else a : ana unspool finished y
                            where (a,y) = unspool x 

(Here finished and unspool are parameters of the function, like x.) We can now implement quite general functions using ana.

An anamorphism can be defined for any recursive type, according to a generic pattern. For example, the unfold for the tree data structure

data Tree a = Leaf a | Branch Tree a Tree

is as follows

ana :: (b->Either a (b,a,b)) -> b -> Tree a
ana unspool x = case unspool x of
                  Left a -> Leaf a
                  Right (l,x,r) -> Branch (ana unspool l) x (ana unspool r)

One of the first publications to introduce the notion of an anamorphism in the context of programming was the paper Functional Programming with Bananas, Lenses, Envelopes and Barbed Wire,^[1] by Erik Meijer et al., which was in the context of the Squiggol programming language.

Functions like zip and iterate are examples of anamorphisms. zip takes a pair of lists, say ['a','b','c'] and [1,2,3] and returns a list of pairs [('a',1),('b',2),('c',3)]. Iterate takes a thing, x, and a function, f, from such things to such things, and returns the infinite list that comes from repeated application of f, i.e. the list [x, (f x), (f (f x)), (f (f (f x))), ...].

zip (a:as) (b:bs) = if (as==[]) || (bs ==[])   -- || means 'or'
                     then [(a,b)]
                     else (a,b):(zip as bs) 

iterate f x = x:(iterate f (fx)) 

To prove this, we can implement both using our generic unfold, ana, using a simple recursive routine:

zip2 = ana g p
   where
   p (as,bs) = (as==[]) || (bs ==[]) 
   g ((a:as), (b:bs)) = ((a,b),(as,bs))

iterate2 f = ana (\a->(a,f a)) (\x->False) 

Ruby comes with an explicit unfold operation; so, for example:

10.unfold { |n| n-1 unless n == 1 }.inspect 
       => [10, 9, 8, 7, 6, 5, 4, 3, 2, 1]

10.class.unfold(&:superclass).inspect 
       => [Fixnum, Integer, Numeric, Object] 

In a language like Haskell, by contrast, even the abstract functions fold, unfold and ana are merely defined terms, as we have seen from the definitions given above.

In category theory, anamorphisms are the categorical dual of catamorphisms.

A notation for ana f found in the literature is ${\displaystyle [\!(f)\!]}$ . The brackets used are known as lens brackets, after which anamorphisms are sometimes referred to as lenses.

• Catamorphism
• Hylomorphism
• Paramorphism
• Apomorphism

• Anamorphisms in Haskell