222 lines
6.1 KiB
Idris
222 lines
6.1 KiB
Idris
module Quox.Syntax.Shift
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import public Quox.Syntax.Var
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import Data.Nat
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import Data.So
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%default total
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||| represents the difference between a smaller scope and a larger one.
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public export
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data Shift : (from, to : Nat) -> Type where
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SZ : Shift from from
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SS : Shift from to -> Shift from (S to)
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%name Shift by, bz
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%builtin Natural Shift
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public export
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(.nat) : Shift from to -> Nat
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(SZ).nat = Z
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(SS by).nat = S by.nat
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%transform "Shift.(.nat)" Shift.(.nat) = believe_me
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public export Cast (Shift from to) Nat where cast = (.nat)
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public export Cast (Shift from to) Integer where cast = cast . cast {to = Nat}
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export Eq (Shift from to) where (==) = (==) `on` (.nat)
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export Ord (Shift from to) where compare = compare `on` (.nat)
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||| shift equivalence, ignoring indices
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public export
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data Eqv : Shift from1 to1 -> Shift from2 to2 -> Type where
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EqSZ : SZ `Eqv` SZ
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EqSS : by `Eqv` bz -> SS by `Eqv` SS bz
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%name Shift.Eqv e
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using (by : Shift from to, bz : Shift from to)
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||| two equivalent shifts are equal if they have the same indices.
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export
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0 fromEqv : by `Eqv` bz -> by = bz
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fromEqv EqSZ = Refl
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fromEqv (EqSS e) = cong SS $ fromEqv e
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||| two equal shifts are equivalent.
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export
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0 toEqv : by = bz -> by `Eqv` bz
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toEqv Refl {by = SZ} = EqSZ
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toEqv Refl {by = (SS by)} = EqSS $ toEqv Refl
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export
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cmpLen : Shift from1 to -> Shift from2 to -> Either Ordering (from1 = from2)
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cmpLen SZ SZ = Right Refl
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cmpLen SZ (SS by) = Left LT
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cmpLen (SS by) SZ = Left GT
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cmpLen (SS by) (SS bz) = cmpLen by bz
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export
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0 shiftDiff : (by : Shift from to) -> to = by.nat + from
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shiftDiff SZ = Refl
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shiftDiff (SS by) = cong S $ shiftDiff by
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export
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0 shiftVarLT : (by : Shift from to) -> (i : Var from) ->
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by.nat + i.nat `LT` to
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shiftVarLT by i =
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rewrite plusSuccRightSucc by.nat i.nat in
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transitive
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(plusLteMonotoneLeft by.nat (S i.nat) from (toNatLT i))
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(replace {p=(`LTE` to)} (shiftDiff by) reflexive)
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public export
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fromNat : (by : Nat) -> Shift from (by + from)
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fromNat Z = SZ
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fromNat (S by) = SS $ fromNat by
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%transform "Shift.fromNat" Shift.fromNat x = believe_me x
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public export
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fromNat0 : (by : Nat) -> Shift 0 by
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fromNat0 by = rewrite sym $ plusZeroRightNeutral by in fromNat by
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export
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0 fromToNat : (by : Shift from to) -> by `Eqv` fromNat by.nat {from}
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fromToNat SZ = EqSZ
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fromToNat (SS by) = EqSS $ fromToNat by
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export
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0 toFromNat : (from, by : Nat) -> by = (fromNat by {from}).nat
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toFromNat from 0 = Refl
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toFromNat from (S k) = cong S $ toFromNat from k
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export
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0 toNatInj' : (by : Shift from1 to1) -> (bz : Shift from2 to2) ->
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by.nat = bz.nat -> by `Eqv` bz
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toNatInj' SZ SZ prf = EqSZ
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toNatInj' (SS by) (SS bz) prf = EqSS $ toNatInj' by bz $ injective prf
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toNatInj' (SS by) SZ Refl impossible
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export
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0 toNatInj : {by, bz : Shift from to} -> by.nat = bz.nat -> by = bz
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toNatInj {by, bz} e = fromEqv $ toNatInj' by bz e
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export %inline
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Injective Shift.(.nat) where injective eq = irrelevantEq $ toNatInj eq
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public export
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ssDown : Shift (S from) to -> Shift from to
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ssDown SZ = SS SZ
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ssDown (SS by) = SS (ssDown by)
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export
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0 ssDownEqv : (by : Shift (S from) to) -> ssDown by `Eqv` SS by
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ssDownEqv SZ = EqSS EqSZ
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ssDownEqv (SS by) = EqSS $ ssDownEqv by
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private %inline
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ssDownViaNat : Shift (S from) to -> Shift from to
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ssDownViaNat by =
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rewrite shiftDiff by in
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rewrite sym $ plusSuccRightSucc by.nat from in
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fromNat $ S by.nat
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%transform "Shift.ssDown" ssDown = ssDownViaNat
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public export
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weak : (s : Nat) -> Shift from to -> Shift (s + from) (s + to)
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weak s SZ = SZ
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weak s (SS by) {to = S to} =
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rewrite sym $ plusSuccRightSucc s to in
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SS $ weak s by
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private
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weakViaNat : (s : Nat) -> Shift from to -> Shift (s + from) (s + to)
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weakViaNat s by =
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rewrite shiftDiff by in
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rewrite plusAssociative s by.nat from in
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rewrite plusCommutative s by.nat in
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rewrite sym $ plusAssociative by.nat s from in
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fromNat by.nat
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%transform "Shift.weak" Shift.weak = weakViaNat
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public export
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shift : Shift from to -> Var from -> Var to
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shift SZ i = i
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shift (SS by) i = VS $ shift by i
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private %inline
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shiftViaNat' : (by : Shift from to) -> (i : Var from) ->
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(0 p : by.nat + i.nat `LT` to) -> Var to
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shiftViaNat' by i p = V $ by.nat + i.nat
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private %inline
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shiftViaNat : Shift from to -> Var from -> Var to
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shiftViaNat by i = shiftViaNat' by i $ shiftVarLT by i
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private
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0 shiftViaNatCorrect : (by : Shift from to) -> (i : Var from) ->
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(0 p : by.nat + i.nat `LT` to) ->
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shiftViaNat' by i p = shift by i
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shiftViaNatCorrect SZ i (LTESucc p) = fromToNat i _
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shiftViaNatCorrect (SS by) i (LTESucc p) = cong VS $ shiftViaNatCorrect by i p
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%transform "Shift.shift" shift = shiftViaNat
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public export
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(.) : Shift from mid -> Shift mid to -> Shift from to
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by . SZ = by
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by . SS bz = SS $ by . bz
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private
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0 compNatProof : (by : Shift from mid) -> (bz : Shift mid to) ->
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to = by.nat + bz.nat + from
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compNatProof by bz =
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trans (shiftDiff bz) $
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trans (cong (bz.nat +) (shiftDiff by)) $
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trans (plusAssociative bz.nat by.nat from) $
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cong (+ from) (plusCommutative bz.nat by.nat)
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private %inline
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compViaNat' : (by : Shift from mid) -> (bz : Shift mid to) ->
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Shift from (by.nat + bz.nat + from)
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compViaNat' by bz = fromNat $ by.nat + bz.nat
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private %inline
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compViaNat : (by : Shift from mid) -> (bz : Shift mid to) -> Shift from to
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compViaNat by bz = rewrite compNatProof by bz in compViaNat' by bz
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private
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0 compViaNatCorrect : (by : Shift from mid) -> (bz : Shift mid to) ->
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by . bz `Eqv` compViaNat' by bz
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compViaNatCorrect by SZ =
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rewrite plusZeroRightNeutral by.nat in fromToNat by
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compViaNatCorrect by (SS bz) =
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rewrite sym $ plusSuccRightSucc by.nat bz.nat in
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EqSS $ compViaNatCorrect by bz
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%transform "Shift.(.)" Shift.(.) = compViaNat
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infixl 8 //
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public export
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interface CanShift f where
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(//) : f from -> Shift from to -> f to
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export %inline
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CanShift Var where i // by = shift by i
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namespace CanShift
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public export %inline
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[Map] (Functor f, CanShift tm) => CanShift (f . tm) where
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x // by = map (// by) x
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public export %inline
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[Const] CanShift (\_ => a) where x // _ = x
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