My issue with using Fix
to type zipp
(as I pointed out in the comments to Carsten's answer to the prior question) is that no total language contains the Fix
type:
newtype Fix a = Fix { unFix :: Fix a -> [a] }
fixList :: ([a] -> [a]) -> [a]
fixList f = (g -> f (unFix g g)) $ Fix (g -> f (unFix g g))
diverges :: [a]
diverges = fixList id
This may seem to be an obscure issue, but it really is nice to have an implementation in a total language, because that also constitutes a formal proof of termination. So let's find a type for zipp
in Agda.
First, let's stick for a while with Haskell. If we manually unfold the definitions of zip1
and zip2
for some fixed lists, we find that all of the unfoldings have proper types, and we can apply any unfolding of zip1
to any unfolding of zip2
, and the types line up (and we get the correct results).
-- unfold zip1 for [1, 0]
f0 k = [] -- zip1 []
f1 k = k 0 f0 -- zip1 [0]
f2 k = k 1 f1 -- zip1 [1, 0]
-- unfold zip2 for [5, 3]
g0 x r = [] -- zip2 []
g1 x r = (x, 3) : r g0 -- zip2 [3]
g2 x r = (x, 5) : r g1 -- zip2 [3, 5]
-- testing
f2 g2 -- [(1, 5), (0, 3)]
f2 g0 -- []
-- looking at some of the types in GHCI
f0 :: t -> [t1]
f1 :: Num a => (a -> (t1 -> [t2]) -> t) -> t
g0 :: t -> t1 -> [t2]
g1 :: Num t1 => t -> ((t2 -> t3 -> [t4]) -> [(t, t1)]) -> [(t, t1)]
We conjecture that the types can be unified for any particular combination of zip1
-s and zip2
-s, but we can't express this with the usual foldr
, because there is an infinite number of different types for all the unfoldings. So we switch to Agda now.
Some preliminaries and the usual definition for dependent foldr
:
open import Data.Nat
open import Data.List hiding (foldr)
open import Function
open import Data.Empty
open import Relation.Binary.PropositionalEquality
open import Data.Product
foldr :
{A : Set}
(B : List A → Set)
→ (? {xs} x → B xs → B (x ∷ xs))
→ B []
→ (xs : List A)
→ B xs
foldr B f z [] = z
foldr B f z (x ∷ xs) = f x (foldr B f z xs)
We notice that the types of the unfoldings depend on the length of the to-be-zipped list, so we concoct two functions to generate these types. A
is the type of the elements of the first list, B
is the type of the elements of the second list and C
is a parameter for the argument that we ignore when we get to the end of the list. n
is the length of the list, of course.
Zip1 : Set → Set → Set → ? → Set
Zip1 A B C zero = C → List (A × B)
Zip1 A B C (suc n) = (A → Zip1 A B C n → List (A × B)) → List (A × B)
Zip2 : Set → Set → Set → ? → Set
Zip2 A B C zero = A → C → List (A × B)
Zip2 A B C (suc n) = A → (Zip2 A B C n → List (A × B)) → List (A × B)
We need to prove now that we can indeed apply any Zip1
to any Zip2
, and get back a List (A × B)
as result.
unifyZip : ? A B n m → ?? λ C? C? → Zip1 A B C? n ≡ (Zip2 A B C? m → List (A × B))
unifyZip A B zero m = Zip2 A B ⊥ m , ⊥ , refl
unifyZip A B (suc n) zero = ⊥ , Zip1 A B ⊥ n , refl
unifyZip A B (suc n) (suc m) with unifyZip A B n m
... | C? , C? , p = C? , C? , cong (λ t → (A → t → List (A × B)) → List (A × B)) p
The type of unifyZip
in English: "for all A
and B
types and n
and m
natural numbers, there exist some C?
and C?
types such that Zip1 A B C? n
is a function from Zip2 A B C? m
to List (A × B)
".
The proof itself is straightforward; if we hit the end of either zippers, we instantiate the input type of the empty zipper to the type of the other zipper. The use of the empty type (⊥) communicates that the choice of type for that parameter is arbitrary. In the recursive case we just bump the equality proof by one step of iteration.
Now we can write zipp
:
zip1 : ? A B C (as : List A) → Zip1 A B C (length as)
zip1 A B C = foldr (Zip1 A B C ° length) (λ x r k → k x r) (λ _ → [])
zip2 : ? A B C (bs : List B) → Zip2 A B C (length bs)
zip2 A B C = foldr (Zip2 A B C ° length) (λ y k x r → (x , y) ∷ r k) (λ _ _ → [])
zipp : ? {A B : Set} → List A → List B → List (A × B)
zipp {A}{B} xs ys with unifyZip A B (length xs) (length ys)
... | C? , C? , p with zip1 A B C? xs | zip2 A B C? ys
... | zxs | zys rewrite p = zxs zys
If we squint a bit and try to ignore ignore the proofs in the code, we find that zipp
is indeed operationally the same as the Haskell definition. In fact, the code becomes exactly the same after all the erasable proofs have been erased. Agda probably doesn't do this erasure, but the Idris compiler certainly does.
(As a side note, I wonder if we could make use of clever functions like zipp
in fusion optimizations. zipp
seems to be more efficient than Oleg Kiselyov's fold zipping. But zipp
doesn't seem to have a System F type; maybe we could try encoding data as dependent eliminators (induction principles) instead of the usual eliminators, and try to fuse those representations?)