mirror of
https://github.com/idris-lang/Idris2.git
synced 2024-12-18 00:31:57 +03:00
b355b12cdb
A lot of useless matches of implicit arguments were removed.
276 lines
11 KiB
Idris
276 lines
11 KiB
Idris
||| A segment is a compositional fragment of a telescope.
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||| A key difference is that segments are right-nested, whereas
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||| telescopes are left nested.
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||| So telescopes are convenient for well-bracketing dependencies,
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||| but segments are convenient for processing telescopes from left
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||| to right.
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||| As with telescopes, indexing segments by their length (hopefully)
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||| helps the type-checker infer stuff.
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module Data.Telescope.Segment
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import Data.Telescope.Telescope
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import Syntax.PreorderReasoning
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import Data.Fin
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import Data.Nat
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import Data.DPair
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%default total
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||| A segment is a compositional fragment of a telescope, indexed by
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||| the segment's length.
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public export
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data Segment : (n : Nat) -> Left.Telescope k -> Type where
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Nil : Segment 0 gamma
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(::) : (ty : TypeIn gamma) -> (delta : Segment n (gamma -. ty)) -> Segment (S n) gamma
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||| A segment of size `n` indexed by `gamma` can be seen as the tabulation of a
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||| function that turns environments for `gamma` into telescopes of size `n`.
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public export
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tabulate : (n : Nat) -> (Left.Environment gamma -> Left.Telescope n) -> Segment n gamma
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tabulate Z tel = []
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tabulate (S n) tel = (sigma :: tabulate n (uncurry delta)) where
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sigma : TypeIn gamma
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sigma env = fst (uncons (tel env))
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delta : (env : Environment gamma) -> sigma env -> Left.Telescope n
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delta env v with (uncons (tel env))
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delta env v | (sig ** delt ** _) = delt v
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||| Any telescope is a segment in the empty telescope. It amounts to looking
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||| at it left-to-right instead of right-to-left.
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public export
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fromTelescope : {k : Nat} -> Left.Telescope k -> Segment k []
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fromTelescope gamma = tabulate _ (const gamma)
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||| Conversely, a segment of size `n` in telescope `gamma` can be seen as a function
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||| from environments for `gamma` to telescopes of size `n`.
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public export
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untabulate : {n : Nat} -> Segment n gamma -> (Left.Environment gamma -> Left.Telescope n)
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untabulate [] _ = []
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untabulate (ty :: delta) env = cons (ty env) (untabulate delta . (\ v => (env ** v)))
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||| Any segment in the empty telescope correspond to a telescope.
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public export
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toTelescope : {k : Nat} -> Segment k [] -> Left.Telescope k
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toTelescope seg = untabulate seg ()
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%name Segment delta,delta',delta1,delta2
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infixl 3 |++, :++
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||| This lemma comes up all the time when mixing induction on Nat with
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||| indexing modulo addition. An alternative is to use something like
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||| frex.
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succLemma : (lft, rgt : Nat) -> lft + (S rgt) = S (lft + rgt)
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succLemma x y = Calc $
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|~ x + (1 + y)
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~~ (x + 1)+ y ...(plusAssociative x 1 y)
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~~ (1 + x)+ y ...(cong (+y) $ plusCommutative x 1)
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~~ 1 + (x + y) ...(sym $ plusAssociative 1 x y)
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-- Should go somehwere in stdlib
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public export
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keep : (0 prf : a ~=~ b) -> a ~=~ b
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keep Refl = Refl
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-- Keeping the `Nat` argument relevant, should (hopefully) only
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-- case-split on it and not the environment unnecessarily, allowing us
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-- to calculate, so long as we know the 'shape' of the Segment.
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--
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-- This should work in theory, I don't think it actually works for
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-- Idris at the moment. Might work in Agda?
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||| Segments act on telescope from the right.
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public export
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(|++) : (gamma : Left.Telescope k) -> {n : Nat} -> (delta : Segment n gamma) -> Left.Telescope (n + k)
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(|++) gamma {n = 0} delta = gamma
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(|++) gamma {n=S n} (ty :: delta) = rewrite sym $ succLemma n k in
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gamma -. ty |++ delta
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||| Segments form a kind of an indexed monoid w.r.t. the action `(|++)`
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public export
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(++) : {gamma : Left.Telescope k}
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-> {n : Nat}
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-> (lft : Segment n gamma )
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-> (rgt : Segment m (gamma |++ lft))
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-> Segment (n + m) gamma
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(++) {n = 0 } delta rgt = rgt
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(++) {n = S n} (ty :: lft) rgt = ty :: lft ++ rewrite succLemma n k in
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rgt
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-- This monoid does act on telescopes:
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export
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actSegmentAssociative : (gamma : Left.Telescope k)
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-> (lft : Segment n gamma)
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-> (rgt : Segment m (gamma |++ lft))
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-> (gamma |++ (lft ++ rgt)) ~=~ ((gamma |++ lft) |++ rgt)
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actSegmentAssociative gamma {n = 0} [] rgt = Refl
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actSegmentAssociative gamma {n = S n} (ty :: lft) rgt =
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let rgt' : Segment {k = n + (S k)} m (gamma -. ty |++ lft)
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rgt' = rewrite succLemma n k in
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rgt
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rgt_eq_rgt' : rgt ~=~ rgt'
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rgt_eq_rgt' = rewrite succLemma n k in
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Refl
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in
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rewrite sym $ succLemma (n + m) k in
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rewrite sym $ succLemma n k in keep $ Calc $
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|~ ((gamma -. ty) |++ (lft ++ rgt'))
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~~ ((gamma -. ty |++ lft) |++ rgt')
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...(actSegmentAssociative (gamma -. ty) lft rgt')
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public export
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weaken : {0 gamma : Left.Telescope k}
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-> {delta : Segment n gamma} -> (sy : TypeIn gamma)
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-> TypeIn (gamma |++ delta)
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weaken {delta = [] } sy = sy
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weaken {n = S n} {delta = ty :: delta} sy = rewrite sym $ succLemma n k in
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weaken (weakenTypeIn sy)
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public export
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projection : {0 gamma : Left.Telescope k}
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-> {n : Nat}
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-> {0 delta : Segment n gamma}
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-> Environment (gamma |++ delta)
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-> Environment gamma
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projection {n = 0 } {delta = [] } env = env
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projection {n = S n} {delta = ty :: delta} env = let (env' ** _) = projection {n} {delta}
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rewrite succLemma n k in env
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in env'
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infixl 4 .=
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public export
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data Environment : (env : Left.Environment gamma)
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-> (delta : Segment n gamma) -> Type where
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Empty : Environment env []
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(.=) : {0 gamma : Left.Telescope k} -> {0 ty : TypeIn gamma}
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-> {0 env : Left.Environment gamma}
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-> {0 delta : Segment n (gamma -. ty)}
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-> (x : ty env) -> (xs : Segment.Environment (env ** x) delta)
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-> Environment env (ty :: delta)
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public export
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(:++) : {0 gamma : Left.Telescope k} -> {0 delta : Segment n gamma}
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-> (env : Left.Environment gamma)
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-> (ext : Segment.Environment env delta)
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-> Left.Environment (gamma |++ delta)
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(:++) env Empty = env
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(:++) {n = S n} env (x .= xs) = rewrite sym $ succLemma n k in
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(env ** x) :++ xs
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-- This is too nasty for now, leave to later
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{-
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public export
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break : {0 k : Nat} -> (gamma : Telescope k') -> (pos : Position gamma)
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-> {auto 0 ford : k' = cast pos + k } -> Telescope k
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break gamma FZ {ford = Refl} = gamma
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break [] (FS pos) {ford = _ } impossible
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break {k' = S k'} (gamma -. ty) (FS pos) {ford} = break gamma pos
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{ford = Calc $
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|~ k'
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~~ cast pos + k ...(succInjective _ _ ford)}
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-- Should go into Data.Fin
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export
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lastIsLast : {n : Nat} -> cast (last {n}) = n
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lastIsLast {n = 0 } = Refl
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lastIsLast {n = S n} = rewrite lastIsLast {n} in
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Refl
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public export
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finComplement : {n : Nat} -> (i : Fin n) -> Fin n
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finComplement FZ = last
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finComplement (FS i) = weaken (finComplement i)
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export
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castNaturality : (i : Fin n) -> finToNat (weaken i) ~=~ finToNat i
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castNaturality FZ = Refl
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castNaturality (FS i) = rewrite castNaturality i in
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Refl
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export
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finComplementSpec : (i : Fin (S n)) -> cast i + cast (finComplement i) = n
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finComplementSpec FZ = keep lastIsLast
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finComplementSpec {n = .(S n)} (FS i@ FZ ) = rewrite castNaturality (finComplement i) in
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rewrite finComplementSpec i in
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Refl
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finComplementSpec {n = .(S n)} (FS i@(FS _)) = rewrite castNaturality (finComplement i) in
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rewrite finComplementSpec i in
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Refl
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complementLastZero : (n : Nat) -> finComplement (last {n}) = FZ
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complementLastZero n = finToNatInjective _ _ $ plusLeftCancel n _ _ $ Calc $
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let n' : Nat
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n' = cast $ finComplement $ last {n} in
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|~ n + n'
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~~ (finToNat $ last {n}) + n'
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...(cong (+n') $ sym $ lastIsLast {n})
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~~ n ...(finComplementSpec $ last {n})
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~~ n + 0 ...(sym $ plusZeroRightNeutral n)
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public export
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breakOnto : {0 k,k' : Nat} -> (gamma : Telescope k) -> (pos : Position gamma)
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-> (delta : Segment n gamma)
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-> {auto 0 ford1 : k' === (finToNat $ finComplement pos) }
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-> {default
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-- disgusting, sorry
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(replace {p = \u => k = finToNat pos + u}
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(sym ford1)
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(sym $ finComplementSpec pos))
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0 ford2 : (k === ((finToNat pos) + k')) }
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-> Segment (cast pos + n)
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(break {k = k'}
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gamma pos
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{ford = ford2})
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breakOnto gamma FZ delta {ford1 = Refl} {ford2} =
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rewrite sym ford2 in
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delta
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breakOnto (gamma -. ty) (FS pos) delta {ford1 = Refl} {ford2} =
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rewrite sym $ succLemma (cast pos) n in
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rewrite castNaturality (finComplement pos) in
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breakOnto gamma pos (ty :: delta)
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uip : (prf1, prf2 : x ~=~ y) -> prf1 ~=~ prf2
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uip Refl Refl = Refl
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export
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breakStartEmpty : (gamma : Telescope k')
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-> {auto 0 ford1 : k = 0}
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-> {auto 0 ford2 : k' = finToNat (start gamma) + k}
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-> break {k} {k'} gamma (start gamma) {ford = ford2}
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~=~ Telescope.Nil
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breakStartEmpty [] {ford1 = Refl} {ford2 = Refl} = Refl
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breakStartEmpty {k} {k' = S k'} {ford1} {ford2} (gamma -. ty) =
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-- Yuck!
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let 0 u : (k' = finToNat (start gamma) + k)
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u = succInjective _ _ ford2
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v : break {k} {k'} gamma (start gamma) {ford = u}
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~=~ Telescope.Nil
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v = breakStartEmpty {k} {k'} gamma {ford2 = u}
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in replace {p = \z =>
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Equal {a = Telescope k} {b = Telescope 0}
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(break {k'} {k} gamma (start gamma)
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{ford = z})
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[]
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}
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(uip u _)
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(keep v)
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public export
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projection : {0 gamma : Telescope k} -> (pos : Position gamma) -> (env : Environment gamma)
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-> Environment (break {k = cast (finComplement pos)} gamma pos
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{ford = sym $ finComplementSpec pos})
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projection FZ env = rewrite finComplementSpec $ FZ {k} in
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env
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projection {gamma = []} (FS pos) Empty impossible
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projection {k = S k} {gamma = gamma -. ty} (FS pos) (env ** x) =
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rewrite castNaturality (finComplement pos) in
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projection {k} pos env
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-}
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