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open import Lattice
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open import Relation.Binary.PropositionalEquality as Eq
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using (_≡_;refl; sym; trans; cong; subst)
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open import Agda.Primitive using (Level) renaming (_⊔_ to _⊔ℓ_)
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open import Data.List using (List; _∷_; [])
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module Lattice.FiniteMap {a b : Level} (A : Set a) (B : Set b)
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(_≈₂_ : B → B → Set b)
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(_⊔₂_ : B → B → B) (_⊓₂_ : B → B → B)
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(≡-dec-A : IsDecidable (_≡_ {a} {A}))
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(lB : IsLattice B _≈₂_ _⊔₂_ _⊓₂_) where
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open IsLattice lB using () renaming (_≼_ to _≼₂_)
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open import Lattice.Map A B _≈₂_ _⊔₂_ _⊓₂_ ≡-dec-A lB as Map
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using (Map; ⊔-equal-keys; ⊓-equal-keys; ∈k-dec; m₁≼m₂⇒m₁[k]≼m₂[k])
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renaming
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( _≈_ to _≈ᵐ_
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; _⊔_ to _⊔ᵐ_
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; _⊓_ to _⊓ᵐ_
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; ≈-equiv to ≈ᵐ-equiv
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; ≈-⊔-cong to ≈ᵐ-⊔ᵐ-cong
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; ⊔-assoc to ⊔ᵐ-assoc
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; ⊔-comm to ⊔ᵐ-comm
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; ⊔-idemp to ⊔ᵐ-idemp
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; ≈-⊓-cong to ≈ᵐ-⊓ᵐ-cong
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; ⊓-assoc to ⊓ᵐ-assoc
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; ⊓-comm to ⊓ᵐ-comm
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; ⊓-idemp to ⊓ᵐ-idemp
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; absorb-⊔-⊓ to absorb-⊔ᵐ-⊓ᵐ
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; absorb-⊓-⊔ to absorb-⊓ᵐ-⊔ᵐ
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; ≈-dec to ≈ᵐ-dec
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; _[_] to _[_]ᵐ
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; locate to locateᵐ
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; keys to keysᵐ
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; _updating_via_ to _updatingᵐ_via_
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; updating-via-keys-≡ to updatingᵐ-via-keys-≡
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; f'-Monotonic to f'-Monotonicᵐ
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; _≼_ to _≼ᵐ_
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)
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open import Data.List.Membership.Propositional using () renaming (_∈_ to _∈ˡ_)
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open import Data.Product using (_×_; _,_; Σ; proj₁ ; proj₂)
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open import Equivalence
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open import Function using (_∘_)
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open import Relation.Nullary using (¬_; Dec; yes; no)
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open import Utils using (Pairwise; _∷_; [])
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open import Data.Empty using (⊥-elim)
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module WithKeys (ks : List A) where
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FiniteMap : Set (a ⊔ℓ b)
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FiniteMap = Σ Map (λ m → Map.keys m ≡ ks)
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_≈_ : FiniteMap → FiniteMap → Set (a ⊔ℓ b)
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_≈_ (m₁ , _) (m₂ , _) = m₁ ≈ᵐ m₂
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≈₂-dec⇒≈-dec : IsDecidable _≈₂_ → IsDecidable _≈_
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≈₂-dec⇒≈-dec ≈₂-dec fm₁ fm₂ = ≈ᵐ-dec ≈₂-dec (proj₁ fm₁) (proj₁ fm₂)
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_⊔_ : FiniteMap → FiniteMap → FiniteMap
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_⊔_ (m₁ , km₁≡ks) (m₂ , km₂≡ks) =
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( m₁ ⊔ᵐ m₂
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, trans (sym (⊔-equal-keys {m₁} {m₂} (trans (km₁≡ks) (sym km₂≡ks))))
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km₁≡ks
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)
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_⊓_ : FiniteMap → FiniteMap → FiniteMap
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_⊓_ (m₁ , km₁≡ks) (m₂ , km₂≡ks) =
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( m₁ ⊓ᵐ m₂
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, trans (sym (⊓-equal-keys {m₁} {m₂} (trans (km₁≡ks) (sym km₂≡ks))))
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km₁≡ks
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)
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_∈_ : A × B → FiniteMap → Set (a ⊔ℓ b)
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_∈_ k,v (m₁ , _) = k,v ∈ˡ (proj₁ m₁)
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_∈k_ : A → FiniteMap → Set a
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_∈k_ k (m₁ , _) = k ∈ˡ (keysᵐ m₁)
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locate : ∀ {k : A} {fm : FiniteMap} → k ∈k fm → Σ B (λ v → (k , v) ∈ fm)
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locate {k} {fm = (m , _)} k∈kfm = locateᵐ {k} {m} k∈kfm
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_updating_via_ : FiniteMap → List A → (A → B) → FiniteMap
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_updating_via_ (m₁ , ksm₁≡ks) ks f =
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( m₁ updatingᵐ ks via f
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, trans (sym (updatingᵐ-via-keys-≡ m₁ ks f)) ksm₁≡ks
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)
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_[_] : FiniteMap → List A → List B
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_[_] (m₁ , _) ks = m₁ [ ks ]ᵐ
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≈-equiv : IsEquivalence FiniteMap _≈_
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≈-equiv = record
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{ ≈-refl =
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λ {(m , _)} → IsEquivalence.≈-refl ≈ᵐ-equiv {m}
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; ≈-sym =
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λ {(m₁ , _)} {(m₂ , _)} → IsEquivalence.≈-sym ≈ᵐ-equiv {m₁} {m₂}
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; ≈-trans =
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λ {(m₁ , _)} {(m₂ , _)} {(m₃ , _)} →
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IsEquivalence.≈-trans ≈ᵐ-equiv {m₁} {m₂} {m₃}
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}
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isUnionSemilattice : IsSemilattice FiniteMap _≈_ _⊔_
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isUnionSemilattice = record
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{ ≈-equiv = ≈-equiv
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; ≈-⊔-cong =
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λ {(m₁ , _)} {(m₂ , _)} {(m₃ , _)} {(m₄ , _)} m₁≈m₂ m₃≈m₄ →
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≈ᵐ-⊔ᵐ-cong {m₁} {m₂} {m₃} {m₄} m₁≈m₂ m₃≈m₄
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; ⊔-assoc = λ (m₁ , _) (m₂ , _) (m₃ , _) → ⊔ᵐ-assoc m₁ m₂ m₃
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; ⊔-comm = λ (m₁ , _) (m₂ , _) → ⊔ᵐ-comm m₁ m₂
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; ⊔-idemp = λ (m , _) → ⊔ᵐ-idemp m
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}
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isIntersectSemilattice : IsSemilattice FiniteMap _≈_ _⊓_
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isIntersectSemilattice = record
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{ ≈-equiv = ≈-equiv
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; ≈-⊔-cong =
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λ {(m₁ , _)} {(m₂ , _)} {(m₃ , _)} {(m₄ , _)} m₁≈m₂ m₃≈m₄ →
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≈ᵐ-⊓ᵐ-cong {m₁} {m₂} {m₃} {m₄} m₁≈m₂ m₃≈m₄
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; ⊔-assoc = λ (m₁ , _) (m₂ , _) (m₃ , _) → ⊓ᵐ-assoc m₁ m₂ m₃
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; ⊔-comm = λ (m₁ , _) (m₂ , _) → ⊓ᵐ-comm m₁ m₂
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; ⊔-idemp = λ (m , _) → ⊓ᵐ-idemp m
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}
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isLattice : IsLattice FiniteMap _≈_ _⊔_ _⊓_
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isLattice = record
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{ joinSemilattice = isUnionSemilattice
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; meetSemilattice = isIntersectSemilattice
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; absorb-⊔-⊓ = λ (m₁ , _) (m₂ , _) → absorb-⊔ᵐ-⊓ᵐ m₁ m₂
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; absorb-⊓-⊔ = λ (m₁ , _) (m₂ , _) → absorb-⊓ᵐ-⊔ᵐ m₁ m₂
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}
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open IsLattice isLattice using (_≼_) public
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lattice : Lattice FiniteMap
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lattice = record
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{ _≈_ = _≈_
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; _⊔_ = _⊔_
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; _⊓_ = _⊓_
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; isLattice = isLattice
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}
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module GeneralizedUpdate
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{l} {L : Set l}
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{_≈ˡ_ : L → L → Set l} {_⊔ˡ_ : L → L → L} {_⊓ˡ_ : L → L → L}
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(lL : IsLattice L _≈ˡ_ _⊔ˡ_ _⊓ˡ_)
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(f : L → FiniteMap) (f-Monotonic : Monotonic (IsLattice._≼_ lL) _≼_ f)
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(g : A → L → B) (g-Monotonicʳ : ∀ k → Monotonic (IsLattice._≼_ lL) _≼₂_ (g k))
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(ks : List A) where
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open IsLattice lL using () renaming (_≼_ to _≼ˡ_)
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updater : L → A → B
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updater l k = g k l
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f' : L → FiniteMap
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f' l = (f l) updating ks via (updater l)
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f'-Monotonic : Monotonic _≼ˡ_ _≼_ f'
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f'-Monotonic {l₁} {l₂} l₁≼l₂ = f'-Monotonicᵐ lL (proj₁ ∘ f) f-Monotonic g g-Monotonicʳ ks l₁≼l₂
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all-equal-keys : ∀ (fm₁ fm₂ : FiniteMap) → (Map.keys (proj₁ fm₁) ≡ Map.keys (proj₁ fm₂))
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all-equal-keys (fm₁ , km₁≡ks) (fm₂ , km₂≡ks) = trans km₁≡ks (sym km₂≡ks)
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∈k-exclusive : ∀ (fm₁ fm₂ : FiniteMap) {k : A} → ¬ ((k ∈k fm₁) × (¬ k ∈k fm₂))
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∈k-exclusive fm₁ fm₂ {k} (k∈kfm₁ , k∉kfm₂) =
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let
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k∈kfm₂ = subst (λ l → k ∈ˡ l) (all-equal-keys fm₁ fm₂) k∈kfm₁
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in
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k∉kfm₂ k∈kfm₂
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m₁≼m₂⇒m₁[ks]≼m₂[ks] : ∀ (fm₁ fm₂ : FiniteMap) (ks' : List A) →
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fm₁ ≼ fm₂ → Pairwise _≼₂_ (fm₁ [ ks' ]) (fm₂ [ ks' ])
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m₁≼m₂⇒m₁[ks]≼m₂[ks] _ _ [] _ = []
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m₁≼m₂⇒m₁[ks]≼m₂[ks] fm₁@(m₁ , km₁≡ks) fm₂@(m₂ , km₂≡ks) (k ∷ ks'') m₁≼m₂
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with ∈k-dec k (proj₁ m₁) | ∈k-dec k (proj₁ m₂)
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... | yes k∈km₁ | yes k∈km₂ =
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let
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(v₁ , k,v₁∈m₁) = locateᵐ {m = m₁} k∈km₁
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(v₂ , k,v₂∈m₂) = locateᵐ {m = m₂} k∈km₂
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in
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(m₁≼m₂⇒m₁[k]≼m₂[k] m₁ m₂ m₁≼m₂ k,v₁∈m₁ k,v₂∈m₂) ∷ m₁≼m₂⇒m₁[ks]≼m₂[ks] fm₁ fm₂ ks'' m₁≼m₂
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... | no k∉km₁ | no k∉km₂ = m₁≼m₂⇒m₁[ks]≼m₂[ks] fm₁ fm₂ ks'' m₁≼m₂
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... | yes k∈km₁ | no k∉km₂ = ⊥-elim (∈k-exclusive fm₁ fm₂ (k∈km₁ , k∉km₂))
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... | no k∉km₁ | yes k∈km₂ = ⊥-elim (∈k-exclusive fm₂ fm₁ (k∈km₂ , k∉km₁))
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open WithKeys public
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