Expose decidability from Map modules
Signed-off-by: Danila Fedorin <danila.fedorin@gmail.com>
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@ -19,4 +19,8 @@ module _ (fhB : FiniteHeightLattice B) where
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module _ {ks : List A} (uks : Unique ks) (≈₂-dec : Decidable _≈₂_) where
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import Lattice.FiniteValueMap A B _≈₂_ _⊔₂_ _⊓₂_ ≡-dec-A isLattice₂ as FVM
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FiniteHeightType = FVM.FiniteMap
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≈-dec = FVM.≈-dec ks ≈₂-dec
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finiteHeightLattice = FVM.IterProdIsomorphism.finiteHeightLattice uks ≈₂-dec height₂ fixedHeight₂
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@ -27,6 +27,7 @@ open import Lattice.Map A B _≈₂_ _⊔₂_ _⊓₂_ ≡-dec-A lB as Map
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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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)
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open import Data.Product using (_×_; _,_; Σ; proj₁ ; proj₂)
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open import Equivalence
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@ -38,6 +39,9 @@ module _ (ks : List A) where
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_≈_ : FiniteMap → FiniteMap → Set (a ⊔ℓ b)
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_≈_ (m₁ , _) (m₂ , _) = m₁ ≈ᵐ m₂
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≈-dec : IsDecidable _≈₂_ → IsDecidable _≈_
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≈-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) = (m₁ ⊔ᵐ m₂ , trans (sym (⊔-equal-keys {m₁} {m₂} (trans (km₁≡ks) (sym km₂≡ks)))) km₁≡ks)
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@ -582,7 +582,7 @@ Expr-Provenance k (e₁ ∩ e₂) k∈ke₁e₂
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... | no k∉ke₁ | yes k∈ke₂ = ⊥-elim (intersect-preserves-∉₁ {l₂ = proj₁ ⟦ e₂ ⟧} k∉ke₁ k∈ke₁e₂)
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... | no k∉ke₁ | no k∉ke₂ = ⊥-elim (intersect-preserves-∉₂ {l₁ = proj₁ ⟦ e₁ ⟧} k∉ke₂ k∈ke₁e₂)
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module _ (≈₂-dec : ∀ (b₁ b₂ : B) → Dec (b₁ ≈₂ b₂)) where
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module _ (≈₂-dec : IsDecidable _≈₂_) where
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private module _ where
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data SubsetInfo (m₁ m₂ : Map) : Set (a ⊔ℓ b) where
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extra : (k : A) → k ∈k m₁ → ¬ k ∈k m₂ → SubsetInfo m₁ m₂
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