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|
module Total.Encoded.Util
import public Data.Fin
import public Data.List1
import public Data.List.Elem
import public Data.List.Quantifiers
import public Total.Syntax
%prefix_record_projections off
namespace Bool
export
B : Ty
B = N
export
True : Term ctx B
True = Zero
export
False : Term ctx B
False = Suc Zero
export
If : Term ctx B -> Term ctx ty -> Term ctx ty -> Term ctx ty
If t u v = Rec t u (Abs $ wkn v (Drop Id))
namespace Arb
export
arb : {ty : Ty} -> Term [<] ty
arb {ty = N} = Zero
arb {ty = ty ~> ty'} = Abs (lift arb)
namespace Union
export
(<+>) : Ty -> Ty -> Ty
N <+> N = N
N <+> (u ~> u') = u ~> u'
(t ~> t') <+> N = t ~> t'
(t ~> t') <+> (u ~> u') = (t <+> u) ~> (t' <+> u')
export
injL : {t, u : Ty} -> Term [<] (t ~> (t <+> u))
export
injR : {t, u : Ty} -> Term [<] (u ~> (t <+> u))
export
prjL : {t, u : Ty} -> Term [<] ((t <+> u) ~> t)
export
prjR : {t, u : Ty} -> Term [<] ((t <+> u) ~> u)
injL {t = N, u = N} = Abs' (S Z) id
injL {t = N, u = u ~> u'} = Abs' (S $ S Z) (\n, _ => App (lift (prjR . injL)) n)
injL {t = t ~> t', u = N} = Abs' (S Z) id
injL {t = t ~> t', u = u ~> u'} = Abs' (S Z) (\f => lift injL . f . lift prjL)
injR {t = N, u = N} = Abs' (S Z) id
injR {t = N, u = u ~> u'} = Abs' (S Z) id
injR {t = t ~> t', u = N} = Abs' (S $ S Z) (\n, _ => App (lift (prjL . injR)) n)
injR {t = t ~> t', u = u ~> u'} = Abs' (S Z) (\f => lift injR . f . lift prjR)
prjL {t = N, u = N} = Abs' (S Z) id
prjL {t = N, u = u ~> u'} = Abs' (S Z) (\f => App (lift (prjL . injR) . f) (lift $ arb))
prjL {t = t ~> t', u = N} = Abs' (S Z) id
prjL {t = t ~> t', u = u ~> u'} = Abs' (S Z) (\f => lift prjL . f . lift injL)
prjR {t = N, u = N} = Abs' (S Z) id
prjR {t = N, u = u ~> u'} = Abs' (S Z) id
prjR {t = t ~> t', u = N} = Abs' (S Z) (\f => App (lift (prjR . injL) . f) (lift $ arb))
prjR {t = t ~> t', u = u ~> u'} = Abs' (S Z) (\f => lift prjR . f . lift injR)
namespace Unit
export
Unit : Ty
Unit = N
namespace Pair
export
(*) : Ty -> Ty -> Ty
t * u = B ~> (t <+> u)
export
pair : {t, u : Ty} -> Term [<] (t ~> u ~> (t * u))
pair = Abs' (S $ S $ S Z)
(\fst, snd, b => If b (App (lift injL) fst) (App (lift injR) snd))
export
fst : {t, u : Ty} -> Term [<] ((t * u) ~> t)
fst = Abs' (S Z) (\p => App (lift prjL . p) True)
export
snd : {t, u : Ty} -> Term [<] ((t * u) ~> u)
snd = Abs' (S Z) (\p => App (lift prjR . p) False)
export
mapSnd : {t, u, v : Ty} -> Term [<] ((u ~> v) ~> (t * u) ~> (t * v))
mapSnd = Abs' (S $ S Z) (\f, p => App' (lift pair) [<App (lift fst) p , App (f . lift snd) p])
export
Product : SnocList Ty -> Ty
Product = foldl (*) Unit
export
pair' : {tys : SnocList Ty} -> Term [<] (tys ~>* Product tys)
pair' {tys = [<]} = arb
pair' {tys = tys :< ty} = Abs' (S $ S Z) (\p, t => App' (lift pair) [<p, t]) .* pair' {tys}
export
project : {tys : SnocList Ty} -> Elem ty tys -> Term [<] (Product tys ~> ty)
project {tys = tys :< ty} Here = snd
project {tys = tys :< ty} (There i) = project i . fst
export
mapProd :
{ctx, tys, tys' : SnocList Ty} ->
{auto 0 prf : length tys = length tys'} ->
All (Term ctx) (zipWith (~>) tys tys') ->
Term ctx (Product tys ~> Product tys')
mapProd {tys = [<], tys' = [<]} [<] = Abs (Var Here)
mapProd {tys = tys :< ty, tys' = tys' :< ty', prf} (fs :< f) =
Abs' (S Z)
(\p =>
App' (lift pair)
[<App (wkn (mapProd fs {prf = injective prf}) (Drop Id) . lift fst) p
, App (wkn f (Drop Id) . lift snd) p
])
replicate : Nat -> a -> SnocList a
replicate 0 x = [<]
replicate (S n) x = replicate n x :< x
replicateLen : (n : Nat) -> SnocList.length (replicate n x) = n
replicateLen 0 = Refl
replicateLen (S k) = cong S (replicateLen k)
export
Vect : Nat -> Ty -> Ty
Vect n ty = Product (replicate n ty)
zipReplicate :
{0 f : a -> b -> c} ->
{0 p : c -> Type} ->
{n : Nat} ->
p (f x y) ->
SnocList.Quantifiers.All.All p (zipWith f (replicate n x) (replicate n y))
zipReplicate {n = 0} z = [<]
zipReplicate {n = S k} z = zipReplicate z :< z
export
mapVect :
{n : Nat} ->
{ty, ty' : Ty} ->
Term [<] ((ty ~> ty') ~> Vect n ty ~> Vect n ty')
mapVect =
Abs' (S Z)
(\f => mapProd {prf = trans (replicateLen n) (sym $ replicateLen n)} $ zipReplicate f)
export
Nil : {ty : Ty} -> Term [<] (Vect 0 ty)
Nil = arb
export
Cons : {n : Nat} -> {ty : Ty} -> Term [<] (ty ~> Vect n ty ~> Vect (S n) ty)
Cons = Abs' (S $ S Z) (\t, ts => App' (lift pair) [<ts, t])
export
head : {n : Nat} -> {ty : Ty} -> Term [<] (Vect (S n) ty ~> ty)
head = snd
export
tail : {n : Nat} -> {ty : Ty} -> Term [<] (Vect (S n) ty ~> Vect n ty)
tail = fst
export
index : {n : Nat} -> {ty : Ty} -> (i : Fin n) -> Term [<] (Vect n ty ~> ty)
index FZ = head
index (FS i) = index i . tail
export
enumerate : (n : Nat) -> Term [<] (Vect n N)
enumerate 0 = arb
enumerate (S k) = App' pair [<App' mapVect [<Abs' (S Z) Suc, enumerate k], Zero]
namespace Sum
export
(+) : Ty -> Ty -> Ty
t + u = B * (t <+> u)
export
left : {t, u : Ty} -> Term [<] (t ~> (t + u))
left = Abs' (S Z) (\e => App' (lift pair) [<True, App (lift injL) e])
export
right : {t, u : Ty} -> Term [<] (u ~> (t + u))
right = Abs' (S Z) (\e => App' (lift pair) [<False, App (lift injR) e])
export
case' : {t, u, ty : Ty} -> Term [<] ((t ~> ty) ~> (u ~> ty) ~> (t + u) ~> ty)
case' = Abs' (S $ S $ S Z)
(\f, g, s =>
If (App (lift fst) s)
(App (f . lift (prjL . snd)) s)
(App (g . lift (prjR . snd)) s))
Sum' : Ty -> List Ty -> Ty
Sum' ty [] = ty
Sum' ty (ty' :: tys) = ty + Sum' ty' tys
export
Sum : List1 Ty -> Ty
Sum (ty ::: tys) = Sum' ty tys
put' :
{ty, ty' : Ty} ->
{tys : List Ty} ->
(i : Elem ty (ty' :: tys)) ->
Term [<] (ty ~> Sum' ty' tys)
put' {tys = []} Here = Abs' (S Z) id
put' {tys = _ :: _} Here = left
put' {tys = _ :: _} (There i) = right . put' i
export
put : {tys : List1 Ty} -> {ty : Ty} -> (i : Elem ty (forget tys)) -> Term [<] (ty ~> Sum tys)
put {tys = _ ::: _} i = put' i
caseAll' :
{ctx : SnocList Ty} ->
{ty, ty' : Ty} ->
{tys : List Ty} ->
All (Term ctx . (~> ty)) (ty' :: tys) ->
Term ctx (Sum' ty' tys ~> ty)
caseAll' (t :: []) = t
caseAll' (t :: u :: ts) = App' (lift case') [<t, caseAll' (u :: ts)]
export
caseAll :
{ctx : SnocList Ty} ->
{tys : List1 Ty} ->
{ty : Ty} ->
All (Term ctx . (~> ty)) (forget tys) ->
Term ctx (Sum tys ~> ty)
caseAll {tys = _ ::: _} = caseAll'
namespace Nat
export
IsZero : Term [<] (N ~> B)
IsZero = Abs' (S Z) (\m => Rec m (lift True) (Abs (lift False)))
export
Add : Term [<] (N ~> N ~> N)
Add = Abs' (S $ S Z) (\m, n => Rec m n (Abs' (S Z) Suc))
export
sum : {n : Nat} -> Term [<] (Vect n N ~> N)
sum {n = 0} = Abs Zero
sum {n = S k} = Abs' (S Z)
(\ns => App' (lift Add) [<App (lift head) ns, App (lift (sum . tail)) ns])
export
Pred : Term [<] (N ~> N)
Pred = Abs' (S Z)
(\m =>
App' (lift case')
[<Abs Zero
, Abs' (S Z) id
, Rec m
(lift $ App left (arb {ty = Unit}))
(App' (lift case')
[<Abs (lift $ App right Zero)
, Abs' (S Z) (\n => App (lift right) (Suc n))
])
])
export
Sub : Term [<] (N ~> N ~> N)
Sub = Abs' (S $ S Z) (\m, n => Rec n m (lift Pred))
export
LE : Term [<] (N ~> N ~> B)
LE = Abs' (S Z) (\m => lift IsZero . App (lift Sub) m)
export
LT : Term [<] (N ~> N ~> B)
LT = Abs' (S Z) (\m => App (lift LE) (Suc m))
export
Cond :
{ctx : SnocList Ty} ->
{ty : Ty} ->
List (Term ctx N, Term ctx (N ~> ty)) ->
Term ctx (N ~> ty)
Cond [] = lift arb
Cond ((n, v) :: xs) =
Abs' (S Z)
(\t =>
If (App' (lift LE) [<t, wkn n (Drop Id)])
(App (wkn v (Drop Id)) t)
(App (wkn (Cond xs) (Drop Id)) (App' (lift Sub) [<t, wkn n (Drop Id)])))
namespace Data
public export
Shape : Type
Shape = (Ty, Nat)
public export
Container : Type
Container = List1 Shape
public export
fillShape : Shape -> Ty -> Ty
fillShape (shape, n) ty = shape * Vect n ty
public export
fill : Container -> Ty -> Ty
fill c ty = Sum (map (flip fillShape ty) c)
export
fix : Container -> Ty
fix c = Product [<N, N ~> N, N ~> fill c N]
-- ^ ^ ^- tags and next positions
-- | |- offset
-- |- pred (number of tags in structure)
mapShape :
{shape : Shape} ->
{ty, ty' : Ty} ->
Term [<] ((ty ~> ty') ~> fillShape shape ty ~> fillShape shape ty')
mapShape {shape = (shape, n)} = mapSnd . mapVect
gmap :
{0 f : a -> b} ->
{0 P : a -> Type} ->
{0 Q : b -> Type} ->
({x : a} -> P x -> Q (f x)) ->
{xs : List a} ->
All P xs ->
All Q (map f xs)
gmap f [] = []
gmap f (px :: pxs) = f px :: gmap f pxs
forgetMap :
(0 f : a -> b) ->
(0 xs : List1 a) ->
forget (map f xs) = map f (forget xs)
forgetMap f (head ::: tail) = Refl
calcOffsets :
{ctx : SnocList Ty} ->
{c : Container} ->
{n : Nat} ->
(ts : Term ctx (Vect n (fix c))) ->
(acc : Term ctx N) ->
List (Term ctx N, Term ctx (N ~> N))
calcOffsets {n = 0} ts acc = []
calcOffsets {n = S k} ts acc =
let hd = App (lift head) ts in
let n = App (lift $ project $ There $ There Here) hd in
let offset = App (lift $ project $ There Here) hd in
(n, App (lift Add) acc . offset) ::
calcOffsets
(App (lift tail) ts)
(App' (lift Add) [<Suc n, acc])
calcData :
{ctx : SnocList Ty} ->
{c : Container} ->
{n : Nat} ->
(ts : Term ctx (Vect n (fix c))) ->
(acc : Term ctx N) ->
List (Term ctx N, Term ctx (N ~> fill c N))
calcData {n = 0} ts acc = []
calcData {n = S k} ts acc =
let hd = App (lift head) ts in
let n = App (lift $ project $ There $ There Here) hd in
(n, App (lift $ project Here) hd) ::
calcData
(App (lift tail) ts)
(App' (lift Add) [<Suc n, acc])
export
intro :
{c : Container} ->
{shape : Shape} ->
Elem shape (forget c) ->
Term [<] (fillShape shape (fix c) ~> fix c)
intro {shape = (shape, n)} i = Abs' (S Z)
(\t =>
App' (lift $ pair' {tys = [<N, N ~> N, N ~> fill c N]})
[<App (lift (sum . App mapVect (Abs' (S Z) Suc . project (There $ There Here)) . snd)) t
, Cond ((Zero, Abs' (S Z) Suc) :: calcOffsets (App (lift snd) t) (Suc Zero))
, Cond
( (Zero,
Abs
(App
(lift $ put {tys = map (flip fillShape N) c} $
rewrite forgetMap (flip fillShape N) c in
elemMap (flip fillShape N) i)
(App' (lift mapSnd) [<Abs (lift $ enumerate n), wkn t (Drop Id)])))
:: calcData (App (lift snd) t) (Suc Zero)
)
])
export
elim :
{c : Container} ->
{ctx : SnocList Ty} ->
{ty : Ty} ->
All (Term ctx . (~> ty) . flip Data.fillShape ty) (forget c) ->
Term ctx (fix c ~> ty)
elim cases = Abs' (S Z)
(\t =>
let tags = Suc (App (lift $ project $ There $ There Here) t) in
let offset = App (lift $ project $ There Here) (wkn t (Drop $ Drop Id)) in
let vals = App (lift $ project $ Here) (wkn t (Drop $ Drop Id)) in
App'
(Rec tags
(lift arb)
(Abs' (S $ S Z) (\rec, n =>
App
(caseAll {tys = map (flip fillShape N) c}
(rewrite forgetMap (flip fillShape N) c in
gmap
(\f =>
wkn f (Drop $ Drop $ Drop Id) .
App (lift mapShape) (rec . App (lift Add) (App offset n)))
cases) .
vals)
n)))
[<Zero])
-- elim cases (#tags-1,offset,data) =
-- let
-- step : (N -> ty) -> (N -> ty)
-- step rec n =
-- case rec n of
-- i => cases(i) . mapShape (rec . (+ offset n))
-- in
-- rec #tags arb step 0
|
