267 lines
11 KiB
Idris
267 lines
11 KiB
Idris
module Quox.Whnf.Main
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import Quox.Whnf.Interface
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import Quox.Whnf.ComputeElimType
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import Quox.Whnf.TypeCase
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import Quox.Whnf.Coercion
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import Quox.Displace
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import Data.SnocVect
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%default total
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export covering CanWhnf Term Interface.isRedexT
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export covering CanWhnf Elim Interface.isRedexE
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covering
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CanWhnf Elim Interface.isRedexE where
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whnf defs ctx sg (F x u loc) with (lookupElim0 x u defs) proof eq
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_ | Just y = whnf defs ctx sg $ setLoc loc $ injElim ctx y
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_ | Nothing = pure $ Element (F x u loc) $ rewrite eq in Ah
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whnf _ _ _ (B i loc) = pure $ nred $ B i loc
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-- ((λ x ⇒ t) ∷ (π.x : A) → B) s ⇝ t[s∷A/x] ∷ B[s∷A/x]
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whnf defs ctx sg (App f s appLoc) = do
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Element f fnf <- whnf defs ctx sg f
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case nchoose $ isLamHead f of
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Left _ => case f of
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Ann (Lam {body, _}) (Pi {arg, res, _}) floc =>
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let s = Ann s arg s.loc in
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whnf defs ctx sg $ Ann (sub1 body s) (sub1 res s) appLoc
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Coe ty p q val _ => piCoe defs ctx sg ty p q val s appLoc
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Right nlh => pure $ Element (App f s appLoc) $ fnf `orNo` nlh
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-- case (s, t) ∷ (x : A) × B return p ⇒ C of { (a, b) ⇒ u } ⇝
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-- u[s∷A/a, t∷B[s∷A/x]] ∷ C[(s, t)∷((x : A) × B)/p]
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--
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-- 0 · case e return p ⇒ C of { (a, b) ⇒ u } ⇝
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-- u[fst e/a, snd e/b] ∷ C[e/p]
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whnf defs ctx sg (CasePair pi pair ret body caseLoc) = do
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Element pair pairnf <- whnf defs ctx sg pair
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case nchoose $ isPairHead pair of
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Left _ => case pair of
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Ann (Pair {fst, snd, _}) (Sig {fst = tfst, snd = tsnd, _}) pairLoc =>
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let fst = Ann fst tfst fst.loc
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snd = Ann snd (sub1 tsnd fst) snd.loc
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in
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whnf defs ctx sg $ Ann (subN body [< fst, snd]) (sub1 ret pair) caseLoc
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Coe ty p q val _ => do
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sigCoe defs ctx sg pi ty p q val ret body caseLoc
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Right np =>
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case sg `decEq` SZero of
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Yes Refl =>
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whnf defs ctx SZero $
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Ann (subN body [< Fst pair caseLoc, Snd pair caseLoc])
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(sub1 ret pair)
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caseLoc
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No n0 =>
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pure $ Element (CasePair pi pair ret body caseLoc)
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(pairnf `orNo` np `orNo` notYesNo n0)
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-- fst ((s, t) ∷ (x : A) × B) ⇝ s ∷ A
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whnf defs ctx sg (Fst pair fstLoc) = do
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Element pair pairnf <- whnf defs ctx sg pair
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case nchoose $ isPairHead pair of
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Left _ => case pair of
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Ann (Pair {fst, snd, _}) (Sig {fst = tfst, snd = tsnd, _}) pairLoc =>
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whnf defs ctx sg $ Ann fst tfst pairLoc
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Coe ty p q val _ => do
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fstCoe defs ctx sg ty p q val fstLoc
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Right np =>
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pure $ Element (Fst pair fstLoc) (pairnf `orNo` np)
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-- snd ((s, t) ∷ (x : A) × B) ⇝ t ∷ B[(s ∷ A)/x]
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whnf defs ctx sg (Snd pair sndLoc) = do
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Element pair pairnf <- whnf defs ctx sg pair
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case nchoose $ isPairHead pair of
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Left _ => case pair of
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Ann (Pair {fst, snd, _}) (Sig {fst = tfst, snd = tsnd, _}) pairLoc =>
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whnf defs ctx sg $ Ann snd (sub1 tsnd (Ann fst tfst fst.loc)) sndLoc
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Coe ty p q val _ => do
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sndCoe defs ctx sg ty p q val sndLoc
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Right np =>
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pure $ Element (Snd pair sndLoc) (pairnf `orNo` np)
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-- case 'a ∷ {a,…} return p ⇒ C of { 'a ⇒ u } ⇝
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-- u ∷ C['a∷{a,…}/p]
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whnf defs ctx sg (CaseEnum pi tag ret arms caseLoc) = do
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Element tag tagnf <- whnf defs ctx sg tag
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case nchoose $ isTagHead tag of
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Left _ => case tag of
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Ann (Tag t _) (Enum ts _) _ =>
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let ty = sub1 ret tag in
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case lookup t arms of
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Just arm => whnf defs ctx sg $ Ann arm ty arm.loc
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Nothing => throw $ MissingEnumArm caseLoc t (keys arms)
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Coe ty p q val _ =>
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-- there is nowhere an equality can be hiding inside an enum type
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whnf defs ctx sg $
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CaseEnum pi (Ann val (dsub1 ty q) val.loc) ret arms caseLoc
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Right nt =>
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pure $ Element (CaseEnum pi tag ret arms caseLoc) $ tagnf `orNo` nt
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-- case zero ∷ ℕ return p ⇒ C of { zero ⇒ u; … } ⇝
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-- u ∷ C[zero∷ℕ/p]
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--
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-- case succ n ∷ ℕ return p ⇒ C of { succ n', π.ih ⇒ u; … } ⇝
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-- u[n∷ℕ/n', (case n ∷ ℕ ⋯)/ih] ∷ C[succ n ∷ ℕ/p]
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whnf defs ctx sg (CaseNat pi piIH nat ret zer suc caseLoc) = do
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Element nat natnf <- whnf defs ctx sg nat
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case nchoose $ isNatHead nat of
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Left _ =>
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let ty = sub1 ret nat in
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case nat of
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Ann (Nat 0 _) (NAT _) _ =>
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whnf defs ctx sg $ Ann zer ty zer.loc
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Ann (Nat (S n) succLoc) (NAT natLoc) _ =>
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let nn = Ann (Nat n succLoc) (NAT natLoc) succLoc
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tm = subN suc [< nn, CaseNat pi piIH nn ret zer suc caseLoc]
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in
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whnf defs ctx sg $ Ann tm ty caseLoc
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Ann (Succ n succLoc) (NAT natLoc) _ =>
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let nn = Ann n (NAT natLoc) succLoc
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tm = subN suc [< nn, CaseNat pi piIH nn ret zer suc caseLoc]
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in
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whnf defs ctx sg $ Ann tm ty caseLoc
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Coe ty p q val _ =>
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-- same deal as Enum
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whnf defs ctx sg $
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CaseNat pi piIH (Ann val (dsub1 ty q) val.loc) ret zer suc caseLoc
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Right nn => pure $
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Element (CaseNat pi piIH nat ret zer suc caseLoc) (natnf `orNo` nn)
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-- case [t] ∷ [π.A] return p ⇒ C of { [x] ⇒ u } ⇝
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-- u[t∷A/x] ∷ C[[t] ∷ [π.A]/p]
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whnf defs ctx sg (CaseBox pi box ret body caseLoc) = do
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Element box boxnf <- whnf defs ctx sg box
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case nchoose $ isBoxHead box of
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Left _ => case box of
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Ann (Box val boxLoc) (BOX q bty tyLoc) _ =>
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let ty = sub1 ret box in
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whnf defs ctx sg $ Ann (sub1 body (Ann val bty val.loc)) ty caseLoc
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Coe ty p q val _ =>
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boxCoe defs ctx sg pi ty p q val ret body caseLoc
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Right nb =>
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pure $ Element (CaseBox pi box ret body caseLoc) (boxnf `orNo` nb)
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-- e : Eq (𝑗 ⇒ A) t u ⊢ e @0 ⇝ t ∷ A‹0/𝑗›
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-- e : Eq (𝑗 ⇒ A) t u ⊢ e @1 ⇝ u ∷ A‹1/𝑗›
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--
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-- ((δ 𝑖 ⇒ s) ∷ Eq (𝑗 ⇒ A) t u) @𝑘 ⇝ s‹𝑘/𝑖› ∷ A‹𝑘/𝑗›
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whnf defs ctx sg (DApp f p appLoc) = do
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Element f fnf <- whnf defs ctx sg f
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case nchoose $ isDLamHead f of
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Left _ => case f of
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Ann (DLam {body, _}) (Eq {ty, l, r, _}) _ =>
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whnf defs ctx sg $
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Ann (endsOr (setLoc appLoc l) (setLoc appLoc r) (dsub1 body p) p)
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(dsub1 ty p) appLoc
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Coe ty p' q' val _ =>
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eqCoe defs ctx sg ty p' q' val p appLoc
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Right ndlh => case p of
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K e _ => do
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Eq {l, r, ty, _} <- computeWhnfElimType0 defs ctx sg f
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| ty => throw $ ExpectedEq ty.loc ctx.names ty
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whnf defs ctx sg $
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ends (Ann (setLoc appLoc l) ty.zero appLoc)
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(Ann (setLoc appLoc r) ty.one appLoc) e
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B {} => pure $ Element (DApp f p appLoc) (fnf `orNo` ndlh `orNo` Ah)
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-- e ∷ A ⇝ e
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whnf defs ctx sg (Ann s a annLoc) = do
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Element s snf <- whnf defs ctx sg s
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case nchoose $ isE s of
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Left _ => let E e = s in pure $ Element e $ noOr2 snf
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Right ne => do
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Element a anf <- whnf defs ctx SZero a
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pure $ Element (Ann s a annLoc) (ne `orNo` snf `orNo` anf)
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whnf defs ctx sg (Coe sty p q val coeLoc) =
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-- 𝑖 ∉ fv(A)
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-- -------------------------------
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-- coe (𝑖 ⇒ A) @p @q s ⇝ s ∷ A
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--
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-- [fixme] needs a real equality check between A‹0/𝑖› and A‹1/𝑖›
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case dsqueeze sty {f = Term} of
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([< i], Left ty) =>
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case p `decEqv` q of
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-- coe (𝑖 ⇒ A) @p @p s ⇝ (s ∷ A‹p/𝑖›)
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Yes _ => whnf defs ctx sg $ Ann val (dsub1 sty p) coeLoc
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No npq => do
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Element ty tynf <- whnf defs (extendDim i ctx) SZero ty
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case nchoose $ canPushCoe sg ty val of
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Left pc => pushCoe defs ctx sg i ty p q val coeLoc
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Right npc => pure $ Element (Coe (SY [< i] ty) p q val coeLoc)
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(tynf `orNo` npc `orNo` notYesNo npq)
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(_, Right ty) =>
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whnf defs ctx sg $ Ann val ty coeLoc
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whnf defs ctx sg (Comp ty p q val r zero one compLoc) =
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case p `decEqv` q of
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-- comp [A] @p @p s @r { ⋯ } ⇝ s ∷ A
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Yes y => whnf defs ctx sg $ Ann val ty compLoc
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No npq => case r of
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-- comp [A] @p @q s @0 { 0 𝑗 ⇒ t₀; ⋯ } ⇝ t₀‹q/𝑗› ∷ A
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K Zero _ => whnf defs ctx sg $ Ann (dsub1 zero q) ty compLoc
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-- comp [A] @p @q s @1 { 1 𝑗 ⇒ t₁; ⋯ } ⇝ t₁‹q/𝑗› ∷ A
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K One _ => whnf defs ctx sg $ Ann (dsub1 one q) ty compLoc
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B {} => pure $ Element (Comp ty p q val r zero one compLoc)
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(notYesNo npq `orNo` Ah)
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whnf defs ctx sg (TypeCase ty ret arms def tcLoc) =
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case sg `decEq` SZero of
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Yes Refl => do
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Element ty tynf <- whnf defs ctx SZero ty
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Element ret retnf <- whnf defs ctx SZero ret
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case nchoose $ isAnnTyCon ty of
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Left y => let Ann ty (TYPE u _) _ = ty in
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reduceTypeCase defs ctx ty u ret arms def tcLoc
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Right nt => pure $ Element (TypeCase ty ret arms def tcLoc)
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(tynf `orNo` retnf `orNo` nt)
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No _ =>
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throw $ ClashQ tcLoc sg.qty Zero
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whnf defs ctx sg (CloE (Sub el th)) =
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whnf defs ctx sg $ pushSubstsWith' id th el
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whnf defs ctx sg (DCloE (Sub el th)) =
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whnf defs ctx sg $ pushSubstsWith' th id el
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covering
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CanWhnf Term Interface.isRedexT where
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whnf _ _ _ t@(TYPE {}) = pure $ nred t
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whnf _ _ _ t@(IOState {}) = pure $ nred t
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whnf _ _ _ t@(Pi {}) = pure $ nred t
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whnf _ _ _ t@(Lam {}) = pure $ nred t
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whnf _ _ _ t@(Sig {}) = pure $ nred t
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whnf _ _ _ t@(Pair {}) = pure $ nred t
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whnf _ _ _ t@(Enum {}) = pure $ nred t
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whnf _ _ _ t@(Tag {}) = pure $ nred t
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whnf _ _ _ t@(Eq {}) = pure $ nred t
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whnf _ _ _ t@(DLam {}) = pure $ nred t
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whnf _ _ _ t@(NAT {}) = pure $ nred t
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whnf _ _ _ t@(Nat {}) = pure $ nred t
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whnf _ _ _ t@(STRING {}) = pure $ nred t
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whnf _ _ _ t@(Str {}) = pure $ nred t
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whnf _ _ _ t@(BOX {}) = pure $ nred t
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whnf _ _ _ t@(Box {}) = pure $ nred t
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whnf _ _ _ (Succ p loc) =
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case nchoose $ isNatConst p of
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Left _ => case p of
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Nat p _ => pure $ nred $ Nat (S p) loc
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E (Ann (Nat p _) _ _) => pure $ nred $ Nat (S p) loc
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Right nc => pure $ Element (Succ p loc) $ ?cc
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-- s ∷ A ⇝ s (in term context)
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whnf defs ctx sg (E e) = do
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Element e enf <- whnf defs ctx sg e
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case nchoose $ isAnn e of
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Left _ => let Ann {tm, _} = e in pure $ Element tm $ noOr1 $ noOr2 enf
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Right na => pure $ Element (E e) $ na `orNo` enf
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whnf defs ctx sg (CloT (Sub tm th)) =
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whnf defs ctx sg $ pushSubstsWith' id th tm
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whnf defs ctx sg (DCloT (Sub tm th)) =
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whnf defs ctx sg $ pushSubstsWith' th id tm
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