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6 changed files with 168 additions and 131 deletions
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@ -17,7 +17,7 @@ open import Categories.Category.Core
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```agda
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```agda
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module Category.Construction.PreElgotMonads {o ℓ e} (ambient : Ambient o ℓ e) where
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module Category.Construction.PreElgotMonads {o ℓ e} (ambient : Ambient o ℓ e) where
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open Ambient ambient
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open Ambient ambient
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open import Monad.ElgotMonad ambient
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open import Monad.PreElgot ambient
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open import Algebra.ElgotAlgebra ambient
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open import Algebra.ElgotAlgebra ambient
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open HomReasoning
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open HomReasoning
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open Equiv
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open Equiv
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@ -1,7 +1,5 @@
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<!--
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<!--
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```agda
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```agda
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{-# OPTIONS --allow-unsolved-metas #-}
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open import Level
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open import Level
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open import Category.Instance.AmbientCategory using (Ambient)
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open import Category.Instance.AmbientCategory using (Ambient)
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open import Categories.Monad.Construction.Kleisli
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open import Categories.Monad.Construction.Kleisli
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@ -11,54 +9,16 @@ open import Categories.Functor
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```
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```
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-->
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-->
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## Summary
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This file introduces Elgot Monads.
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TODO: Probably only Pre-Elgot is needed
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- [X] *Definition 13* Pre-Elgot Monads
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- [ ] *Definition 13* strong pre-Elgot
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- [X] *Definition 14* Elgot Monads
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- [ ] *Definition 14* strong Elgot
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- [ ] *Proposition 15* (Strong) Elgot monads are (strong) pre-Elgot
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## Code
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```agda
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```agda
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module Monad.ElgotMonad {o ℓ e} (ambient : Ambient o ℓ e) where
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module Misc.Monad.Elgot {o ℓ e} (ambient : Ambient o ℓ e) where
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open Ambient ambient
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open Ambient ambient
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open HomReasoning
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open HomReasoning
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open MR C
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open MR C
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open Equiv
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open Equiv
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open import Algebra.ElgotAlgebra ambient
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open import Algebra.ElgotAlgebra ambient
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open import Monad.PreElgot ambient
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```
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```
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### *Definition 13*: Pre-Elgot Monads
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```agda
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record IsPreElgot (T : Monad C) : Set (o ⊔ ℓ ⊔ e) where
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open Monad T
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open RMonad (Monad⇒Kleisli C T) using (extend)
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open Functor F renaming (F₀ to T₀; F₁ to T₁)
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-- every TX needs to be equipped with an elgot algebra structure
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field
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elgotalgebras : ∀ {X} → Elgot-Algebra-on (T₀ X)
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module elgotalgebras {X} = Elgot-Algebra-on (elgotalgebras {X})
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-- with the following associativity
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field
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pres : ∀ {X Y Z} (f : Z ⇒ T₀ X + Z) (h : X ⇒ T₀ Y)
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→ elgotalgebras._# ((extend h +₁ idC) ∘ f) ≈ extend h ∘ (elgotalgebras._# {X}) f
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record PreElgotMonad : Set (o ⊔ ℓ ⊔ e) where
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field
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T : Monad C
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isPreElgot : IsPreElgot T
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open IsPreElgot isPreElgot public
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```
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### *Definition 14*: Elgot Monads
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### *Definition 14*: Elgot Monads
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```agda
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```agda
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@ -90,7 +50,7 @@ module Monad.ElgotMonad {o ℓ e} (ambient : Ambient o ℓ e) where
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open IsElgot isElgot public
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open IsElgot isElgot public
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```
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```
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### *Proposition 15*: (Strong) Elgot monads are (strong) pre-Elgot
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### *Proposition 15*: Elgot monads are pre-Elgot
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-- elgot monads are pre-elgot
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-- elgot monads are pre-elgot
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Elgot⇒PreElgot : ElgotMonad → PreElgotMonad
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Elgot⇒PreElgot : ElgotMonad → PreElgotMonad
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@ -22,7 +22,7 @@ open import Category.Construction.UniformIterationAlgebras ambient
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open import Algebra.UniformIterationAlgebra ambient
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open import Algebra.UniformIterationAlgebra ambient
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open import Algebra.Properties ambient using (FreeUniformIterationAlgebra; uniformForgetfulF; IsStableFreeUniformIterationAlgebra)
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open import Algebra.Properties ambient using (FreeUniformIterationAlgebra; uniformForgetfulF; IsStableFreeUniformIterationAlgebra)
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open import Algebra.ElgotAlgebra ambient
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open import Algebra.ElgotAlgebra ambient
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open import Monad.Instance.K.Compositionality ambient MK
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open import Monad.Instance.K.Elgot ambient MK
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open Equiv
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open Equiv
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open HomReasoning
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open HomReasoning
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@ -1,5 +1,3 @@
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# TODO: every KX satisfies compositionality
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```agda
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```agda
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{-# OPTIONS --allow-unsolved-metas #-}
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{-# OPTIONS --allow-unsolved-metas #-}
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open import Level
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open import Level
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@ -8,8 +6,10 @@ open import Category.Instance.AmbientCategory
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import Monad.Instance.K as MIK
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import Monad.Instance.K as MIK
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```
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```
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# Every KX is a free Elgot algebra
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```agda
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```agda
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module Monad.Instance.K.Compositionality {o ℓ e} (ambient : Ambient o ℓ e) (MK : MIK.MonadK ambient) where
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module Monad.Instance.K.Elgot {o ℓ e} (ambient : Ambient o ℓ e) (MK : MIK.MonadK ambient) where
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open Ambient ambient
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open Ambient ambient
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open MIK ambient
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open MIK ambient
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open MonadK MK
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open MonadK MK
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@ -20,9 +20,9 @@ open MIK ambient
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open MonadK MK
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open MonadK MK
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open import Algebra.ElgotAlgebra ambient
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open import Algebra.ElgotAlgebra ambient
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open import Algebra.UniformIterationAlgebra ambient
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open import Algebra.UniformIterationAlgebra ambient
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open import Monad.ElgotMonad ambient
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open import Monad.PreElgot ambient
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open import Monad.Instance.K ambient
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open import Monad.Instance.K ambient
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open import Monad.Instance.K.Compositionality ambient MK
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open import Monad.Instance.K.Elgot ambient MK
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open import Monad.Instance.K.Commutative ambient MK
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open import Monad.Instance.K.Commutative ambient MK
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open import Monad.Instance.K.Strong ambient MK
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open import Monad.Instance.K.Strong ambient MK
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open import Category.Construction.PreElgotMonads ambient
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open import Category.Construction.PreElgotMonads ambient
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@ -37,22 +37,22 @@ open M C
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# K is a pre-Elgot monad
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# K is a pre-Elgot monad
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```agda
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```agda
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-- TODO fix global declarations on Commutative.lagda.md
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-- open Elgot-Algebra-on using (#-Compositionality)
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-- TODO fix this import mess!!!
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-- _# = λ {A} {X} f → Uniform-Iteration-Algebra._# (algebras A) {X = X} f
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isPreElgot : IsPreElgot monadK
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isPreElgot : IsPreElgot monadK
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isPreElgot = record
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isPreElgot = record
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{ elgotalgebras = λ {X} → elgot X
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{ elgotalgebras = λ {X} → elgot X
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; pres = λ f h → sym (extend-preserve h f)
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; extend-preserves = λ f h → sym (extend-preserve h f)
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}
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}
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where open kleisliK using (extend)
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where open kleisliK using (extend)
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preElgot : PreElgotMonad
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preElgot : PreElgotMonad
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preElgot = record { T = monadK ; isPreElgot = isPreElgot }
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preElgot = record { T = monadK ; isPreElgot = isPreElgot }
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-- initialPreElgot :
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strongPreElgot : IsStrongPreElgot KStrong
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strongPreElgot = record
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{ preElgot = isPreElgot
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; strengthen-preserves = τ-comm
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}
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initialPreElgot : IsInitial PreElgotMonads preElgot
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initialPreElgot : IsInitial PreElgotMonads preElgot
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initialPreElgot = record
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initialPreElgot = record
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{ ! = !′
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{ ! = !′
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@ -67,108 +67,112 @@ initialPreElgot = record
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})
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})
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; α-η = FreeObject.*-lift (freealgebras _) (T.η.η _)
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; α-η = FreeObject.*-lift (freealgebras _) (T.η.η _)
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; α-μ = α-μ
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; α-μ = α-μ
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; preserves = λ {X} {B} f → Elgot-Algebra-Morphism.preserves (((freeElgot B) FreeObject.*) (T.η.η B))
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; preserves = λ {X} {B} f → Elgot-Algebra-Morphism.preserves (((freeElgot B) FreeObject.*) {A = record { A = T.F.F₀ B ; algebra = PreElgotMonad.elgotalgebras A }} (T.η.η B))
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}
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}
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where
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where
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open PreElgotMonad A using (T)
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open PreElgotMonad A using (T)
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open RMonad (Monad⇒Kleisli C T) using (extend)
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open RMonad (Monad⇒Kleisli C T) using (extend)
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module T = Monad T
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module T = Monad T
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open PreElgotMonad preElgot using ()
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open monadK using () renaming (η to ηK; μ to μK)
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open monadK using () renaming (η to ηK; μ to μK)
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open Elgot-Algebra-on using (#-resp-≈)
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open Elgot-Algebra-on using (#-resp-≈)
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T-Alg : ∀ (X : Obj) → Elgot-Algebra
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T-Alg X = record { A = T.F.₀ X ; algebra = PreElgotMonad.elgotalgebras A }
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K-Alg : ∀ (X : Obj) → Elgot-Algebra
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K-Alg X = record { A = K.₀ X ; algebra = elgot X }
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η' : ∀ (X : Obj) → K.₀ X ⇒ T.F.₀ X
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η' : ∀ (X : Obj) → K.₀ X ⇒ T.F.₀ X
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η' X = Elgot-Algebra-Morphism.h (_* {A = record { A = T.F.F₀ X ; algebra = PreElgotMonad.elgotalgebras A }} (T.η.η X))
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η' X = Elgot-Algebra-Morphism.h (_* {A = T-Alg X} (T.η.η X))
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where open FreeObject (freeElgot X)
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where open FreeObject (freeElgot X)
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commute : ∀ {X Y : Obj} (f : X ⇒ Y) → η' Y ∘ K.₁ f ≈ T.F.₁ f ∘ η' X
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commute {X} {Y} f = begin
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η' Y ∘ K.₁ f ≈⟨ *-uniq (T.F.₁ f ∘ T.η.η X) (record { h = η' Y ∘ K.₁ f ; preserves = pres₁ }) (begin
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(η' Y ∘ K.₁ f) ∘ η ≈⟨ pullʳ (K₁η f) ⟩
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η' Y ∘ ηK.η _ ∘ f ≈⟨ pullˡ (FreeObject.*-lift (freealgebras Y) (T.η.η Y)) ⟩
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T.η.η Y ∘ f ≈⟨ NaturalTransformation.commute T.η f ⟩
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T.F.₁ f ∘ T.η.η X ∎) ⟩
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Elgot-Algebra-Morphism.h (_* {A = record { A = T.F.F₀ Y ; algebra = PreElgotMonad.elgotalgebras A }} (T.F.₁ f ∘ T.η.η _)) ≈⟨ sym (*-uniq (T.F.₁ f ∘ T.η.η X) (record { h = T.F.₁ f ∘ η' X ; preserves = pres₂ }) (begin
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(T.F.₁ f ∘ η' X) ∘ η ≈⟨ pullʳ (FreeObject.*-lift (freealgebras X) (T.η.η X)) ⟩
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T.F.₁ f ∘ T.η.η X ∎)) ⟩
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T.F.₁ f ∘ η' X ∎
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where
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open FreeObject (freeElgot X)
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_#K = λ {B} {C} f → Elgot-Algebra._# (FreeObject.FX (freeElgot C)) {B} f
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_#K = λ {B} {C} f → Elgot-Algebra._# (FreeObject.FX (freeElgot C)) {B} f
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_#T = λ {B} {C} f → PreElgotMonad.elgotalgebras._# A {B} {C} f
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_#T = λ {B} {C} f → PreElgotMonad.elgotalgebras._# A {B} {C} f
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-- some preservation facts that follow immediately, since these things are elgot-algebra-morphisms.
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K₁-preserves : ∀ {X Y Z : Obj} (f : X ⇒ Y) (g : Z ⇒ K.₀ X + Z) → K.₁ f ∘ (g #K) ≈ ((K.₁ f +₁ idC) ∘ g) #K
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K₁-preserves {X} {Y} {Z} f g = Elgot-Algebra-Morphism.preserves (((freeElgot X) FreeObject.*) {A = K-Alg Y} (ηK.η _ ∘ f))
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μK-preserves : ∀ {X Y : Obj} (g : Y ⇒ K.₀ (K.₀ X) + Y) → μK.η X ∘ g #K ≈ ((μK.η X +₁ idC) ∘ g) #K
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μK-preserves {X} g = Elgot-Algebra-Morphism.preserves (((freeElgot (K.₀ X)) FreeObject.*) {A = K-Alg X} idC)
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η'-preserves : ∀ {X Y : Obj} (g : Y ⇒ K.₀ X + Y) → η' X ∘ g #K ≈ ((η' X +₁ idC) ∘ g) #T
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η'-preserves {X} g = Elgot-Algebra-Morphism.preserves (((freeElgot X) FreeObject.*) {A = T-Alg X} (T.η.η X))
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commute : ∀ {X Y : Obj} (f : X ⇒ Y) → η' Y ∘ K.₁ f ≈ T.F.₁ f ∘ η' X
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commute {X} {Y} f = begin
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η' Y ∘ K.₁ f ≈⟨ FreeObject.*-uniq
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(freeElgot X)
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{A = T-Alg Y}
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(T.F.₁ f ∘ T.η.η X)
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(record { h = η' Y ∘ K.₁ f ; preserves = pres₁ })
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comm₁ ⟩
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Elgot-Algebra-Morphism.h (FreeObject._* (freeElgot X) {A = T-Alg Y} (T.F.₁ f ∘ T.η.η _)) ≈⟨ sym (FreeObject.*-uniq
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(freeElgot X)
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{A = T-Alg Y}
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(T.F.₁ f ∘ T.η.η X)
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(record { h = T.F.₁ f ∘ η' X ; preserves = pres₂ })
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(pullʳ (FreeObject.*-lift (freealgebras X) (T.η.η X)))) ⟩
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T.F.₁ f ∘ η' X ∎
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where
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pres₁ : ∀ {Z} {g : Z ⇒ K.₀ X + Z} → (η' Y ∘ K.₁ f) ∘ g #K ≈ ((η' Y ∘ K.₁ f +₁ idC) ∘ g) #T
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pres₁ : ∀ {Z} {g : Z ⇒ K.₀ X + Z} → (η' Y ∘ K.₁ f) ∘ g #K ≈ ((η' Y ∘ K.₁ f +₁ idC) ∘ g) #T
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pres₁ {Z} {g} = begin
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pres₁ {Z} {g} = begin
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(η' Y ∘ K.₁ f) ∘ (g #K) ≈⟨ pullʳ (Elgot-Algebra-Morphism.preserves (((freeElgot X) FreeObject.*) (ηK.η Y ∘ f))) ⟩
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(η' Y ∘ K.₁ f) ∘ (g #K) ≈⟨ pullʳ (K₁-preserves f g) ⟩
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η' Y ∘ (((K.₁ f +₁ idC) ∘ g) #K) ≈⟨ Elgot-Algebra-Morphism.preserves (((freeElgot Y) FreeObject.*) {A = record
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η' Y ∘ (((K.₁ f +₁ idC) ∘ g) #K) ≈⟨ η'-preserves ((K.₁ f +₁ idC) ∘ g) ⟩
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{ A = T.F.F₀ Y
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; algebra =
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record
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{ _# = λ {X = X₁} → A PreElgotMonad.elgotalgebras.#
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; #-Fixpoint = PreElgotMonad.elgotalgebras.#-Fixpoint A
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; #-Uniformity = PreElgotMonad.elgotalgebras.#-Uniformity A
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; #-Folding = PreElgotMonad.elgotalgebras.#-Folding A
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; #-resp-≈ = PreElgotMonad.elgotalgebras.#-resp-≈ A
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}
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}} (T.η.η Y)) ⟩
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(((η' Y +₁ idC) ∘ (K.₁ f +₁ idC) ∘ g) #T) ≈⟨ #-resp-≈ (PreElgotMonad.elgotalgebras A) (pullˡ (+₁∘+₁ ○ +₁-cong₂ refl identity²)) ⟩
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(((η' Y +₁ idC) ∘ (K.₁ f +₁ idC) ∘ g) #T) ≈⟨ #-resp-≈ (PreElgotMonad.elgotalgebras A) (pullˡ (+₁∘+₁ ○ +₁-cong₂ refl identity²)) ⟩
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((η' Y ∘ K.₁ f +₁ idC) ∘ g) #T ∎
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((η' Y ∘ K.₁ f +₁ idC) ∘ g) #T ∎
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pres₂ : ∀ {Z} {g : Z ⇒ K.₀ X + Z} → (T.F.₁ f ∘ η' X) ∘ g #K ≈ ((T.F.₁ f ∘ η' X +₁ idC) ∘ g) #T
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pres₂ : ∀ {Z} {g : Z ⇒ K.₀ X + Z} → (T.F.₁ f ∘ η' X) ∘ g #K ≈ ((T.F.₁ f ∘ η' X +₁ idC) ∘ g) #T
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pres₂ {Z} {g} = begin
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pres₂ {Z} {g} = begin
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(T.F.₁ f ∘ η' X) ∘ g #K ≈⟨ pullʳ (Elgot-Algebra-Morphism.preserves (((freeElgot X) FreeObject.*) (T.η.η X))) ⟩
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(T.F.₁ f ∘ η' X) ∘ g #K ≈⟨ pullʳ (η'-preserves g) ⟩
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T.F.₁ f ∘ ((η' X +₁ idC) ∘ g) #T ≈⟨ (sym (F₁⇒extend T f)) ⟩∘⟨refl ⟩
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T.F.₁ f ∘ ((η' X +₁ idC) ∘ g) #T ≈⟨ (sym (F₁⇒extend T f)) ⟩∘⟨refl ⟩
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extend (T.η.η Y ∘ f) ∘ ((η' X +₁ idC) ∘ g) #T ≈⟨ sym (PreElgotMonad.pres A ((η' X +₁ idC) ∘ g) (T.η.η Y ∘ f)) ⟩
|
extend (T.η.η Y ∘ f) ∘ ((η' X +₁ idC) ∘ g) #T ≈⟨ sym (PreElgotMonad.extend-preserves A ((η' X +₁ idC) ∘ g) (T.η.η Y ∘ f)) ⟩
|
||||||
(((extend (T.η.η Y ∘ f) +₁ idC) ∘ (η' X +₁ idC) ∘ g) #T) ≈⟨ #-resp-≈ (PreElgotMonad.elgotalgebras A) (pullˡ (+₁∘+₁ ○ +₁-cong₂ ((F₁⇒extend T f) ⟩∘⟨refl) identity²)) ⟩
|
(((extend (T.η.η Y ∘ f) +₁ idC) ∘ (η' X +₁ idC) ∘ g) #T) ≈⟨ #-resp-≈ (PreElgotMonad.elgotalgebras A) (pullˡ (+₁∘+₁ ○ +₁-cong₂ ((F₁⇒extend T f) ⟩∘⟨refl) identity²)) ⟩
|
||||||
((T.F.₁ f ∘ η' X +₁ idC) ∘ g) #T ∎
|
((T.F.₁ f ∘ η' X +₁ idC) ∘ g) #T ∎
|
||||||
|
comm₁ : (η' Y ∘ K.₁ f) ∘ _ ≈ T.F.₁ f ∘ T.η.η X
|
||||||
|
comm₁ = begin
|
||||||
|
(η' Y ∘ K.₁ f) ∘ _ ≈⟨ pullʳ (K₁η f) ⟩
|
||||||
|
η' Y ∘ ηK.η _ ∘ f ≈⟨ pullˡ (FreeObject.*-lift (freealgebras Y) (T.η.η Y)) ⟩
|
||||||
|
T.η.η Y ∘ f ≈⟨ NaturalTransformation.commute T.η f ⟩
|
||||||
|
T.F.₁ f ∘ T.η.η X ∎
|
||||||
α-μ : ∀ {X : Obj} → η' X ∘ μK.η X ≈ T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X)
|
α-μ : ∀ {X : Obj} → η' X ∘ μK.η X ≈ T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X)
|
||||||
α-μ {X} = begin
|
α-μ {X} = begin
|
||||||
η' X ∘ μK.η X ≈⟨ FreeObject.*-uniq (freeElgot (K.₀ X)) (η' X) (record { h = η' X ∘ μK.η X ; preserves = pres₁ }) (cancelʳ monadK.identityʳ) ⟩
|
η' X ∘ μK.η X ≈⟨ FreeObject.*-uniq
|
||||||
Elgot-Algebra-Morphism.h (((freeElgot (K.₀ X)) FreeObject.*) {A = record
|
(freeElgot (K.₀ X))
|
||||||
{ A = T.F.F₀ X
|
{A = T-Alg X}
|
||||||
; algebra =
|
(η' X)
|
||||||
record
|
(record { h = η' X ∘ μK.η X ; preserves = pres₁ })
|
||||||
{ _# = λ Z → (A PreElgotMonad.elgotalgebras.#) Z
|
(cancelʳ monadK.identityʳ) ⟩
|
||||||
; #-Fixpoint = PreElgotMonad.elgotalgebras.#-Fixpoint A
|
Elgot-Algebra-Morphism.h (((freeElgot (K.₀ X)) FreeObject.*) {A = T-Alg X} (η' X)) ≈⟨ sym (FreeObject.*-uniq
|
||||||
; #-Uniformity = PreElgotMonad.elgotalgebras.#-Uniformity A
|
(freeElgot (K.₀ X))
|
||||||
; #-Folding = PreElgotMonad.elgotalgebras.#-Folding A
|
{A = T-Alg X}
|
||||||
; #-resp-≈ = PreElgotMonad.elgotalgebras.#-resp-≈ A
|
(η' X)
|
||||||
}
|
(record { h = T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X) ; preserves = pres₂ })
|
||||||
}} (η' X)) ≈⟨ sym (FreeObject.*-uniq (freeElgot (K.₀ X)) (η' X) (record { h = T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X) ; preserves = pres₂ }) (begin
|
comm) ⟩
|
||||||
(T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X)) ∘ ηK.η (K.₀ X) ≈⟨ (refl⟩∘⟨ sym (commute (η' X))) ⟩∘⟨refl ⟩
|
|
||||||
(T.μ.η X ∘ η' _ ∘ K.₁ (η' X)) ∘ ηK.η (K.₀ X) ≈⟨ assoc ○ refl⟩∘⟨ (assoc ○ refl⟩∘⟨ sym (monadK.η.commute (η' X))) ⟩
|
|
||||||
T.μ.η X ∘ η' _ ∘ ηK.η (T.F.F₀ X) ∘ η' X ≈⟨ refl⟩∘⟨ (pullˡ (FreeObject.*-lift (freealgebras _) (T.η.η _))) ⟩
|
|
||||||
T.μ.η X ∘ T.η.η _ ∘ η' X ≈⟨ cancelˡ (Monad.identityʳ T) ⟩
|
|
||||||
η' X ∎)) ⟩
|
|
||||||
T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X) ∎
|
T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X) ∎
|
||||||
where
|
where
|
||||||
_#K = λ {B} {C} f → Elgot-Algebra._# (FreeObject.FX (freeElgot C)) {B} f
|
|
||||||
_#T = λ {B} {C} f → PreElgotMonad.elgotalgebras._# A {B} {C} f
|
|
||||||
pres₁ : ∀ {Z} {g : Z ⇒ K.₀ (K.₀ X) + Z} → (η' X ∘ μK.η X) ∘ g #K ≈ ((η' X ∘ μK.η X +₁ idC) ∘ g) #T
|
pres₁ : ∀ {Z} {g : Z ⇒ K.₀ (K.₀ X) + Z} → (η' X ∘ μK.η X) ∘ g #K ≈ ((η' X ∘ μK.η X +₁ idC) ∘ g) #T
|
||||||
pres₁ {Z} {g} = begin
|
pres₁ {Z} {g} = begin
|
||||||
(η' X ∘ μK.η X) ∘ (g #K) ≈⟨ pullʳ (Elgot-Algebra-Morphism.preserves (((freeElgot (K.₀ X)) FreeObject.*) idC)) ⟩
|
(η' X ∘ μK.η X) ∘ (g #K) ≈⟨ pullʳ (μK-preserves g) ⟩
|
||||||
η' X ∘ ((μK.η X +₁ idC) ∘ g) #K ≈⟨ Elgot-Algebra-Morphism.preserves (((freeElgot X) FreeObject.*) (T.η.η X)) ⟩
|
η' X ∘ ((μK.η X +₁ idC) ∘ g) #K ≈⟨ η'-preserves ((μK.η X +₁ idC) ∘ g) ⟩
|
||||||
(((η' X +₁ idC) ∘ (μK.η X +₁ idC) ∘ g) #T) ≈⟨ #-resp-≈ (PreElgotMonad.elgotalgebras A) (pullˡ (+₁∘+₁ ○ +₁-cong₂ refl identity²)) ⟩
|
(((η' X +₁ idC) ∘ (μK.η X +₁ idC) ∘ g) #T) ≈⟨ #-resp-≈ (PreElgotMonad.elgotalgebras A) (pullˡ (+₁∘+₁ ○ +₁-cong₂ refl identity²)) ⟩
|
||||||
(((η' X ∘ μK.η X +₁ idC) ∘ g) #T) ∎
|
(((η' X ∘ μK.η X +₁ idC) ∘ g) #T) ∎
|
||||||
pres₂ : ∀ {Z} {g : Z ⇒ K.₀ (K.₀ X) + Z} → (T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X)) ∘ g #K ≈ ((T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X) +₁ idC) ∘ g) #T
|
pres₂ : ∀ {Z} {g : Z ⇒ K.₀ (K.₀ X) + Z} → (T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X)) ∘ g #K ≈ ((T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X) +₁ idC) ∘ g) #T
|
||||||
pres₂ {Z} {g} = begin
|
pres₂ {Z} {g} = begin
|
||||||
(T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X)) ∘ (g #K) ≈⟨ pullʳ (pullʳ (Elgot-Algebra-Morphism.preserves (((freeElgot (K.₀ X)) FreeObject.*) (T.η.η (K.₀ X))))) ⟩
|
(T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X)) ∘ (g #K) ≈⟨ pullʳ (pullʳ (η'-preserves g)) ⟩
|
||||||
T.μ.η X ∘ T.F.₁ (η' X) ∘ (((η' (K.₀ X) +₁ idC) ∘ g) #T) ≈⟨ refl⟩∘⟨ ((sym (F₁⇒extend T (η' X))) ⟩∘⟨refl ○ sym (PreElgotMonad.pres A ((η' (K.₀ X) +₁ idC) ∘ g) (T.η.η (T.F.F₀ X) ∘ η' X)) )⟩
|
T.μ.η X ∘ T.F.₁ (η' X) ∘ (((η' (K.₀ X) +₁ idC) ∘ g) #T) ≈⟨ refl⟩∘⟨ ((sym (F₁⇒extend T (η' X))) ⟩∘⟨refl ○ sym (PreElgotMonad.extend-preserves A ((η' (K.₀ X) +₁ idC) ∘ g) (T.η.η (T.F.F₀ X) ∘ η' X)) )⟩
|
||||||
T.μ.η X ∘ ((extend (T.η.η _ ∘ η' _) +₁ idC) ∘ ((η' _ +₁ idC)) ∘ g) #T ≈⟨ (sym μ-extend) ⟩∘⟨refl ⟩
|
T.μ.η X ∘ ((extend (T.η.η _ ∘ η' _) +₁ idC) ∘ ((η' _ +₁ idC)) ∘ g) #T ≈⟨ (sym (elimʳ T.F.identity)) ⟩∘⟨refl ⟩
|
||||||
extend idC ∘ ((extend (T.η.η _ ∘ η' _) +₁ idC) ∘ ((η' _ +₁ idC)) ∘ g) #T ≈⟨ sym (PreElgotMonad.pres A ((extend (T.η.η (T.F.F₀ X) ∘ η' X) +₁ idC) ∘
|
extend idC ∘ ((extend (T.η.η _ ∘ η' _) +₁ idC) ∘ ((η' _ +₁ idC)) ∘ g) #T ≈⟨ sym (PreElgotMonad.extend-preserves A ((extend (T.η.η (T.F.F₀ X) ∘ η' X) +₁ idC) ∘ (η' (K.₀ X) +₁ idC) ∘ g) idC) ⟩
|
||||||
(η' (K.₀ X) +₁ idC) ∘ g) idC) ⟩
|
(((extend idC +₁ idC) ∘ (extend (T.η.η _ ∘ η' _) +₁ idC) ∘ ((η' _ +₁ idC)) ∘ g) #T) ≈⟨ #-resp-≈ (PreElgotMonad.elgotalgebras A) (pullˡ (+₁∘+₁ ○ +₁-cong₂ ((elimʳ T.F.identity) ⟩∘⟨ (F₁⇒extend T (η' X))) identity²)) ⟩
|
||||||
(((extend idC +₁ idC) ∘ (extend (T.η.η _ ∘ η' _) +₁ idC) ∘ ((η' _ +₁ idC)) ∘ g) #T) ≈⟨ #-resp-≈ (PreElgotMonad.elgotalgebras A) (pullˡ (+₁∘+₁ ○ +₁-cong₂ (μ-extend ⟩∘⟨ (F₁⇒extend T (η' X))) identity²)) ⟩
|
|
||||||
(((T.μ.η X ∘ T.F.₁ (η' X) +₁ idC) ∘ (η' _ +₁ idC) ∘ g) #T) ≈⟨ #-resp-≈ (PreElgotMonad.elgotalgebras A) (pullˡ (+₁∘+₁ ○ +₁-cong₂ assoc identity²)) ⟩
|
(((T.μ.η X ∘ T.F.₁ (η' X) +₁ idC) ∘ (η' _ +₁ idC) ∘ g) #T) ≈⟨ #-resp-≈ (PreElgotMonad.elgotalgebras A) (pullˡ (+₁∘+₁ ○ +₁-cong₂ assoc identity²)) ⟩
|
||||||
(((T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X) +₁ idC) ∘ g) #T) ∎
|
(((T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X) +₁ idC) ∘ g) #T) ∎
|
||||||
where
|
comm : (T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X)) ∘ ηK.η (K.₀ X) ≈ η' X
|
||||||
μ-extend : extend idC ≈ T.μ.η X
|
comm = begin
|
||||||
μ-extend = begin
|
(T.μ.η X ∘ T.F.₁ (η' X) ∘ η' (K.₀ X)) ∘ ηK.η (K.₀ X) ≈⟨ (refl⟩∘⟨ sym (commute (η' X))) ⟩∘⟨refl ⟩
|
||||||
T.μ.η _ ∘ T.F.₁ idC ≈⟨ elimʳ T.F.identity ⟩
|
(T.μ.η X ∘ η' _ ∘ K.₁ (η' X)) ∘ ηK.η (K.₀ X) ≈⟨ assoc ○ refl⟩∘⟨ (assoc ○ refl⟩∘⟨ sym (monadK.η.commute (η' X))) ⟩
|
||||||
T.μ.η X ∎
|
T.μ.η X ∘ η' _ ∘ ηK.η (T.F.F₀ X) ∘ η' X ≈⟨ refl⟩∘⟨ (pullˡ (FreeObject.*-lift (freealgebras _) (T.η.η _))) ⟩
|
||||||
|
T.μ.η X ∘ T.η.η _ ∘ η' X ≈⟨ cancelˡ (Monad.identityʳ T) ⟩
|
||||||
|
η' X ∎
|
||||||
!-unique′ : ∀ {A : PreElgotMonad} (f : PreElgotMonad-Morphism preElgot A) → PreElgotMonad-Morphism.α (!′ {A = A}) ≃ PreElgotMonad-Morphism.α f
|
!-unique′ : ∀ {A : PreElgotMonad} (f : PreElgotMonad-Morphism preElgot A) → PreElgotMonad-Morphism.α (!′ {A = A}) ≃ PreElgotMonad-Morphism.α f
|
||||||
!-unique′ {A} f {X} = sym (*-uniq (T.η.η X) (record
|
!-unique′ {A} f {X} = sym (FreeObject.*-uniq
|
||||||
{ h = α.η X
|
(freeElgot X)
|
||||||
; preserves = preserves _
|
{A = record { A = T.F.F₀ X ; algebra = PreElgotMonad.elgotalgebras A }}
|
||||||
}) α-η)
|
(T.η.η X)
|
||||||
|
(record { h = α.η X ; preserves = preserves _ })
|
||||||
|
α-η)
|
||||||
where
|
where
|
||||||
open PreElgotMonad-Morphism f using (α; α-η; preserves)
|
open PreElgotMonad-Morphism f using (α; α-η; preserves)
|
||||||
open PreElgotMonad A using (T)
|
open PreElgotMonad A using (T)
|
||||||
module T = Monad T
|
module T = Monad T
|
||||||
open FreeObject (freeElgot X)
|
|
||||||
```
|
```
|
||||||
|
|
|
||||||
73
src/Monad/PreElgot.lagda.md
Normal file
73
src/Monad/PreElgot.lagda.md
Normal file
|
|
@ -0,0 +1,73 @@
|
||||||
|
<!--
|
||||||
|
```agda
|
||||||
|
{-# OPTIONS --allow-unsolved-metas #-}
|
||||||
|
|
||||||
|
open import Level
|
||||||
|
open import Category.Instance.AmbientCategory using (Ambient)
|
||||||
|
open import Categories.Monad.Construction.Kleisli
|
||||||
|
open import Categories.Monad
|
||||||
|
open import Categories.Monad.Strong
|
||||||
|
open import Categories.Monad.Relative renaming (Monad to RMonad)
|
||||||
|
open import Categories.Functor
|
||||||
|
open import Data.Product using (_,_)
|
||||||
|
```
|
||||||
|
-->
|
||||||
|
|
||||||
|
```agda
|
||||||
|
module Monad.PreElgot {o ℓ e} (ambient : Ambient o ℓ e) where
|
||||||
|
open Ambient ambient
|
||||||
|
open HomReasoning
|
||||||
|
open MR C
|
||||||
|
open Equiv
|
||||||
|
open import Algebra.ElgotAlgebra ambient
|
||||||
|
```
|
||||||
|
|
||||||
|
# (strong) pre-Elgot monads
|
||||||
|
|
||||||
|
```agda
|
||||||
|
record IsPreElgot (T : Monad C) : Set (o ⊔ ℓ ⊔ e) where
|
||||||
|
open Monad T
|
||||||
|
open RMonad (Monad⇒Kleisli C T) using (extend)
|
||||||
|
open Functor F renaming (F₀ to T₀; F₁ to T₁)
|
||||||
|
|
||||||
|
-- every TX needs to be equipped with an elgot algebra structure
|
||||||
|
field
|
||||||
|
elgotalgebras : ∀ {X} → Elgot-Algebra-on (T₀ X)
|
||||||
|
|
||||||
|
module elgotalgebras {X} = Elgot-Algebra-on (elgotalgebras {X})
|
||||||
|
|
||||||
|
-- where kleisli lifting preserves iteration
|
||||||
|
field
|
||||||
|
extend-preserves : ∀ {X Y Z} (f : Z ⇒ T₀ X + Z) (h : X ⇒ T₀ Y)
|
||||||
|
→ elgotalgebras._# ((extend h +₁ idC) ∘ f) ≈ extend h ∘ elgotalgebras._# {X} f
|
||||||
|
|
||||||
|
record PreElgotMonad : Set (o ⊔ ℓ ⊔ e) where
|
||||||
|
field
|
||||||
|
T : Monad C
|
||||||
|
isPreElgot : IsPreElgot T
|
||||||
|
|
||||||
|
open IsPreElgot isPreElgot public
|
||||||
|
|
||||||
|
record IsStrongPreElgot (SM : StrongMonad monoidal) : Set (o ⊔ ℓ ⊔ e) where
|
||||||
|
open StrongMonad SM using (M; strengthen)
|
||||||
|
open Monad M using (F)
|
||||||
|
|
||||||
|
-- M is pre-Elgot
|
||||||
|
field
|
||||||
|
preElgot : IsPreElgot M
|
||||||
|
|
||||||
|
open IsPreElgot preElgot public
|
||||||
|
|
||||||
|
-- and strength is iteration preserving
|
||||||
|
field
|
||||||
|
strengthen-preserves : ∀ {X Y Z} (f : Z ⇒ F.₀ Y + Z)
|
||||||
|
→ strengthen.η (X , Y) ∘ (idC ⁂ elgotalgebras._# f) ≈ elgotalgebras._# ((strengthen.η (X , Y) +₁ idC) ∘ distributeˡ⁻¹ ∘ (idC ⁂ f))
|
||||||
|
|
||||||
|
record StrongPreElgotMonad : Set (o ⊔ ℓ ⊔ e) where
|
||||||
|
field
|
||||||
|
SM : StrongMonad monoidal
|
||||||
|
isStrongPreElgot : IsStrongPreElgot SM
|
||||||
|
|
||||||
|
open IsStrongPreElgot isStrongPreElgot public
|
||||||
|
```
|
||||||
|
|
||||||
Loading…
Reference in a new issue