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https://github.com/idris-lang/Idris2.git
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97 lines
3.6 KiB
Idris
97 lines
3.6 KiB
Idris
||| This module is inspired by the open union used in the paper
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||| Freer Monads, More Extensible Effects
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||| by Oleg Kiselyov and Hiromi Ishii
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||| By using an AtIndex proof, we are able to get rid of all of the unsafe
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||| coercions in the original module.
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module Data.OpenUnion
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import Data.DPair
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import Data.List.AtIndex
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import Data.List.HasLength
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import Data.Nat
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import Data.Nat.Order.Properties
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import Decidable.Equality
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import Syntax.WithProof
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%default total
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||| An open union of families is an index picking a family out together with
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||| a value in the family thus picked.
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public export
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data Union : (elt : a -> Type) -> (ts : List a) -> Type where
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Element : (k : Nat) -> (0 _ : AtIndex t ts k) -> elt t -> Union elt ts
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||| An empty open union of families is empty
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public export
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Uninhabited (Union elt []) where
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uninhabited (Element _ p _) = void (uninhabited p)
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||| Injecting a value into an open union, provided we know the index of
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||| the appropriate type family.
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inj' : (k : Nat) -> (0 _ : AtIndex t ts k) -> elt t -> Union elt ts
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inj' = Element
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||| Projecting out of an open union, provided we know the index of the
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||| appropriate type family. This may obviously fail if the value stored
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||| actually corresponds to another family.
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prj' : (k : Nat) -> (0 _ : AtIndex t ts k) -> Union elt ts -> Maybe (elt t)
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prj' k p (Element k' q t) with (decEq k k')
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prj' k p (Element k q t) | Yes Refl = rewrite atIndexUnique p q in Just t
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prj' k p (Element k' q t) | No neq = Nothing
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||| Given that equality of type families is not decidable, we have to
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||| rely on the interface `Member` to automatically find the index of a
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||| given family.
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public export
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inj : Member t ts => elt t -> Union elt ts
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inj = let (Element n p) = isMember t ts in inj' n p
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||| Given that equality of type families is not decidable, we have to
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||| rely on the interface `Member` to automatically find the index of a
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||| given family.
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public export
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prj : Member t ts => Union elt ts -> Maybe (elt t)
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prj = let (Element n p) = isMember t ts in prj' n p
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||| By doing a bit of arithmetic we can figure out whether the union's value
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||| came from the left or the right list used in the index.
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public export
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split : Subset Nat (flip HasLength ss) ->
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Union elt (ss ++ ts) -> Either (Union elt ss) (Union elt ts)
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split m (Element n p t) with (@@ lt n (fst m))
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split m (Element n p t) | (True ** lt)
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= Left (Element n (strengthenL m lt p) t)
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split m (Element n p t) | (False ** notlt)
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= let 0 lte : lte (fst m) n === True
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= LteIslte (fst m) n (notltIsGTE n (fst m) notlt)
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in Right (Element (minus n (fst m)) (strengthenR m lte p) t)
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||| We can inspect an open union over a non-empty list of families to check
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||| whether the value it contains belongs either to the first family or any
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||| other in the tail.
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public export
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decomp : Union elt (t :: ts) -> Either (Union elt ts) (elt t)
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decomp (Element 0 (Z) t) = Right t
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decomp (Element (S n) (S p) t) = Left (Element n p t)
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||| An open union over a singleton list is just a wrapper
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public export
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decomp0 : Union elt [t] -> elt t
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decomp0 elt = case decomp elt of
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Left t => absurd t
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Right t => t
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||| Inserting new union members on the right leaves the index unchanged.
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public export
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weakenR : Union elt ts -> Union elt (ts ++ us)
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weakenR (Element n p t) = Element n (weakenR p) t
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||| Inserting new union members on the left, requires shifting the index by
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||| the number of members introduced. Note that this number is the only
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||| thing we need to keep around at runtime.
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public export
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weakenL : Subset Nat (flip HasLength ss) -> Union elt ts -> Union elt (ss ++ ts)
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weakenL m (Element n p t) = Element (fst m + n) (weakenL m p) t
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