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@ -356,6 +356,8 @@ module WithProg (prog : Program) where
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in
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in
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walkTrace ⟦joinForKey-s⟧ρ tr
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walkTrace ⟦joinForKey-s⟧ρ tr
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postulate initialState-pred-∅ : incoming initialState ≡ []
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joinForKey-initialState-⊥ᵛ : joinForKey initialState result ≡ ⊥ᵛ
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joinForKey-initialState-⊥ᵛ : joinForKey initialState result ≡ ⊥ᵛ
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joinForKey-initialState-⊥ᵛ = cong (λ ins → foldr _⊔ᵛ_ ⊥ᵛ (result [ ins ])) initialState-pred-∅
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joinForKey-initialState-⊥ᵛ = cong (λ ins → foldr _⊔ᵛ_ ⊥ᵛ (result [ ins ])) initialState-pred-∅
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@ -1,8 +1,8 @@
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module Analysis.Sign where
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module Analysis.Sign where
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open import Data.Integer as Int using (ℤ; +_; -[1+_])
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open import Data.Integer using (ℤ; +_; -[1+_])
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open import Data.Nat as Nat using (ℕ; suc; zero)
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open import Data.Nat using (ℕ; suc; zero)
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open import Data.Product using (Σ; proj₁; proj₂; _,_)
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open import Data.Product using (Σ; proj₁; _,_)
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open import Data.Sum using (inj₁; inj₂)
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open import Data.Sum using (inj₁; inj₂)
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open import Data.Empty using (⊥; ⊥-elim)
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open import Data.Empty using (⊥; ⊥-elim)
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open import Data.Unit using (⊤; tt)
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open import Data.Unit using (⊤; tt)
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@ -115,7 +115,7 @@ postulate minus-Monoʳ : ∀ (s₁ : SignLattice) → Monotonic _≼ᵍ_ _≼ᵍ
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⟦_⟧ᵍ ⊥ᵍ _ = ⊥
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⟦_⟧ᵍ ⊥ᵍ _ = ⊥
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⟦_⟧ᵍ ⊤ᵍ _ = ⊤
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⟦_⟧ᵍ ⊤ᵍ _ = ⊤
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⟦_⟧ᵍ [ + ]ᵍ v = Σ ℕ (λ n → v ≡ ↑ᶻ (+_ (suc n)))
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⟦_⟧ᵍ [ + ]ᵍ v = Σ ℕ (λ n → v ≡ ↑ᶻ (+_ (suc n)))
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⟦_⟧ᵍ [ 0ˢ ]ᵍ v = v ≡ ↑ᶻ (+_ zero)
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⟦_⟧ᵍ [ 0ˢ ]ᵍ v = Σ ℕ (λ n → v ≡ ↑ᶻ (+_ zero))
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⟦_⟧ᵍ [ - ]ᵍ v = Σ ℕ (λ n → v ≡ ↑ᶻ -[1+ n ])
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⟦_⟧ᵍ [ - ]ᵍ v = Σ ℕ (λ n → v ≡ ↑ᶻ -[1+ n ])
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⟦⟧ᵍ-respects-≈ᵍ : ∀ {s₁ s₂ : SignLattice} → s₁ ≈ᵍ s₂ → ⟦ s₁ ⟧ᵍ ⇒ ⟦ s₂ ⟧ᵍ
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⟦⟧ᵍ-respects-≈ᵍ : ∀ {s₁ s₂ : SignLattice} → s₁ ≈ᵍ s₂ → ⟦ s₁ ⟧ᵍ ⇒ ⟦ s₂ ⟧ᵍ
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@ -141,12 +141,12 @@ postulate minus-Monoʳ : ∀ (s₁ : SignLattice) → Monotonic _≼ᵍ_ _≼ᵍ
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s₁≢s₂⇒¬s₁∧s₂ : ∀ {s₁ s₂ : Sign} → ¬ s₁ ≡ s₂ → ∀ {v} → ¬ ((⟦ [ s₁ ]ᵍ ⟧ᵍ ∧ ⟦ [ s₂ ]ᵍ ⟧ᵍ) v)
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s₁≢s₂⇒¬s₁∧s₂ : ∀ {s₁ s₂ : Sign} → ¬ s₁ ≡ s₂ → ∀ {v} → ¬ ((⟦ [ s₁ ]ᵍ ⟧ᵍ ∧ ⟦ [ s₂ ]ᵍ ⟧ᵍ) v)
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s₁≢s₂⇒¬s₁∧s₂ { + } { + } +≢+ _ = ⊥-elim (+≢+ refl)
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s₁≢s₂⇒¬s₁∧s₂ { + } { + } +≢+ _ = ⊥-elim (+≢+ refl)
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s₁≢s₂⇒¬s₁∧s₂ { + } { - } _ ((n , refl) , (m , ()))
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s₁≢s₂⇒¬s₁∧s₂ { + } { - } _ ((n , refl) , (m , ()))
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s₁≢s₂⇒¬s₁∧s₂ { + } { 0ˢ } _ ((n , refl) , ())
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s₁≢s₂⇒¬s₁∧s₂ { + } { 0ˢ } _ ((n , refl) , (m , ()))
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s₁≢s₂⇒¬s₁∧s₂ { 0ˢ } { + } _ (refl , (m , ()))
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s₁≢s₂⇒¬s₁∧s₂ { 0ˢ } { + } _ ((n , refl) , (m , ()))
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s₁≢s₂⇒¬s₁∧s₂ { 0ˢ } { 0ˢ } +≢+ _ = ⊥-elim (+≢+ refl)
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s₁≢s₂⇒¬s₁∧s₂ { 0ˢ } { 0ˢ } +≢+ _ = ⊥-elim (+≢+ refl)
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s₁≢s₂⇒¬s₁∧s₂ { 0ˢ } { - } _ (refl , (m , ()))
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s₁≢s₂⇒¬s₁∧s₂ { 0ˢ } { - } _ ((n , refl) , (m , ()))
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s₁≢s₂⇒¬s₁∧s₂ { - } { + } _ ((n , refl) , (m , ()))
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s₁≢s₂⇒¬s₁∧s₂ { - } { + } _ ((n , refl) , (m , ()))
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s₁≢s₂⇒¬s₁∧s₂ { - } { 0ˢ } _ ((n , refl) , ())
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s₁≢s₂⇒¬s₁∧s₂ { - } { 0ˢ } _ ((n , refl) , (m , ()))
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s₁≢s₂⇒¬s₁∧s₂ { - } { - } +≢+ _ = ⊥-elim (+≢+ refl)
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s₁≢s₂⇒¬s₁∧s₂ { - } { - } +≢+ _ = ⊥-elim (+≢+ refl)
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⟦⟧ᵍ-⊓ᵍ-∧ : ∀ {s₁ s₂ : SignLattice} → (⟦ s₁ ⟧ᵍ ∧ ⟦ s₂ ⟧ᵍ) ⇒ ⟦ s₁ ⊓ᵍ s₂ ⟧ᵍ
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⟦⟧ᵍ-⊓ᵍ-∧ : ∀ {s₁ s₂ : SignLattice} → (⟦ s₁ ⟧ᵍ ∧ ⟦ s₂ ⟧ᵍ) ⇒ ⟦ s₁ ⊓ᵍ s₂ ⟧ᵍ
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@ -222,75 +222,7 @@ module WithProg (prog : Program) where
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eval-Mono (# 0) _ = ≈ᵍ-refl
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eval-Mono (# 0) _ = ≈ᵍ-refl
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eval-Mono (# (suc n')) _ = ≈ᵍ-refl
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eval-Mono (# (suc n')) _ = ≈ᵍ-refl
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module ForwardWithEval = ForwardWithProg.WithEvaluator eval eval-Mono
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open ForwardWithProg.WithEvaluator eval eval-Mono using (result)
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open ForwardWithEval using (result)
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-- For debugging purposes, print out the result.
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-- For debugging purposes, print out the result.
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output = show result
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output = show result
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module ForwardWithInterp = ForwardWithEval.WithInterpretation latticeInterpretationᵍ
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open ForwardWithInterp using (⟦_⟧ᵛ; InterpretationValid)
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-- This should have fewer cases -- the same number as the actual 'plus' above.
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-- But agda only simplifies on first argument, apparently, so we are stuck
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-- listing them all.
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plus-valid : ∀ {g₁ g₂} {z₁ z₂} → ⟦ g₁ ⟧ᵍ (↑ᶻ z₁) → ⟦ g₂ ⟧ᵍ (↑ᶻ z₂) → ⟦ plus g₁ g₂ ⟧ᵍ (↑ᶻ (z₁ Int.+ z₂))
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plus-valid {⊥ᵍ} {_} ⊥ _ = ⊥
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plus-valid {[ + ]ᵍ} {⊥ᵍ} _ ⊥ = ⊥
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plus-valid {[ - ]ᵍ} {⊥ᵍ} _ ⊥ = ⊥
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plus-valid {[ 0ˢ ]ᵍ} {⊥ᵍ} _ ⊥ = ⊥
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plus-valid {⊤ᵍ} {⊥ᵍ} _ ⊥ = ⊥
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plus-valid {⊤ᵍ} {[ + ]ᵍ} _ _ = tt
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plus-valid {⊤ᵍ} {[ - ]ᵍ} _ _ = tt
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plus-valid {⊤ᵍ} {[ 0ˢ ]ᵍ} _ _ = tt
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plus-valid {⊤ᵍ} {⊤ᵍ} _ _ = tt
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plus-valid {[ + ]ᵍ} {[ + ]ᵍ} (n₁ , refl) (n₂ , refl) = (_ , refl)
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plus-valid {[ + ]ᵍ} {[ - ]ᵍ} _ _ = tt
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plus-valid {[ + ]ᵍ} {[ 0ˢ ]ᵍ} (n₁ , refl) refl = (_ , refl)
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plus-valid {[ + ]ᵍ} {⊤ᵍ} _ _ = tt
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plus-valid {[ - ]ᵍ} {[ + ]ᵍ} _ _ = tt
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plus-valid {[ - ]ᵍ} {[ - ]ᵍ} (n₁ , refl) (n₂ , refl) = (_ , refl)
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plus-valid {[ - ]ᵍ} {[ 0ˢ ]ᵍ} (n₁ , refl) refl = (_ , refl)
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plus-valid {[ - ]ᵍ} {⊤ᵍ} _ _ = tt
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plus-valid {[ 0ˢ ]ᵍ} {[ + ]ᵍ} refl (n₂ , refl) = (_ , refl)
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plus-valid {[ 0ˢ ]ᵍ} {[ - ]ᵍ} refl (n₂ , refl) = (_ , refl)
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plus-valid {[ 0ˢ ]ᵍ} {[ 0ˢ ]ᵍ} refl refl = refl
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plus-valid {[ 0ˢ ]ᵍ} {⊤ᵍ} _ _ = tt
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-- Same for this one. It should be easier, but Agda won't simplify.
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minus-valid : ∀ {g₁ g₂} {z₁ z₂} → ⟦ g₁ ⟧ᵍ (↑ᶻ z₁) → ⟦ g₂ ⟧ᵍ (↑ᶻ z₂) → ⟦ minus g₁ g₂ ⟧ᵍ (↑ᶻ (z₁ Int.- z₂))
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minus-valid {⊥ᵍ} {_} ⊥ _ = ⊥
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minus-valid {[ + ]ᵍ} {⊥ᵍ} _ ⊥ = ⊥
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minus-valid {[ - ]ᵍ} {⊥ᵍ} _ ⊥ = ⊥
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minus-valid {[ 0ˢ ]ᵍ} {⊥ᵍ} _ ⊥ = ⊥
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minus-valid {⊤ᵍ} {⊥ᵍ} _ ⊥ = ⊥
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minus-valid {⊤ᵍ} {[ + ]ᵍ} _ _ = tt
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minus-valid {⊤ᵍ} {[ - ]ᵍ} _ _ = tt
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minus-valid {⊤ᵍ} {[ 0ˢ ]ᵍ} _ _ = tt
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minus-valid {⊤ᵍ} {⊤ᵍ} _ _ = tt
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minus-valid {[ + ]ᵍ} {[ + ]ᵍ} _ _ = tt
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minus-valid {[ + ]ᵍ} {[ - ]ᵍ} (n₁ , refl) (n₂ , refl) = (_ , refl)
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minus-valid {[ + ]ᵍ} {[ 0ˢ ]ᵍ} (n₁ , refl) refl = (_ , refl)
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minus-valid {[ + ]ᵍ} {⊤ᵍ} _ _ = tt
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minus-valid {[ - ]ᵍ} {[ + ]ᵍ} (n₁ , refl) (n₂ , refl) = (_ , refl)
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minus-valid {[ - ]ᵍ} {[ - ]ᵍ} _ _ = tt
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minus-valid {[ - ]ᵍ} {[ 0ˢ ]ᵍ} (n₁ , refl) refl = (_ , refl)
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minus-valid {[ - ]ᵍ} {⊤ᵍ} _ _ = tt
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minus-valid {[ 0ˢ ]ᵍ} {[ + ]ᵍ} refl (n₂ , refl) = (_ , refl)
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minus-valid {[ 0ˢ ]ᵍ} {[ - ]ᵍ} refl (n₂ , refl) = (_ , refl)
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minus-valid {[ 0ˢ ]ᵍ} {[ 0ˢ ]ᵍ} refl refl = refl
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minus-valid {[ 0ˢ ]ᵍ} {⊤ᵍ} _ _ = tt
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eval-Valid : InterpretationValid
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eval-Valid (⇒ᵉ-+ ρ e₁ e₂ z₁ z₂ ρ,e₁⇒z₁ ρ,e₂⇒z₂) ⟦vs⟧ρ =
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plus-valid (eval-Valid ρ,e₁⇒z₁ ⟦vs⟧ρ) (eval-Valid ρ,e₂⇒z₂ ⟦vs⟧ρ)
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eval-Valid (⇒ᵉ-- ρ e₁ e₂ z₁ z₂ ρ,e₁⇒z₁ ρ,e₂⇒z₂) ⟦vs⟧ρ =
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minus-valid (eval-Valid ρ,e₁⇒z₁ ⟦vs⟧ρ) (eval-Valid ρ,e₂⇒z₂ ⟦vs⟧ρ)
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eval-Valid {vs} (⇒ᵉ-Var ρ x v x,v∈ρ) ⟦vs⟧ρ
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with ∈k-decᵛ x (proj₁ (proj₁ vs))
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... | yes x∈kvs = ⟦vs⟧ρ (proj₂ (locateᵛ {x} {vs} x∈kvs)) x,v∈ρ
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... | no x∉kvs = tt
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eval-Valid (⇒ᵉ-ℕ ρ 0) _ = refl
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eval-Valid (⇒ᵉ-ℕ ρ (suc n')) _ = (n' , refl)
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open ForwardWithInterp.WithValidity eval-Valid using (analyze-correct) public
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@ -84,10 +84,6 @@ record Program : Set where
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incoming : State → List State
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incoming : State → List State
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incoming = predecessors graph
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incoming = predecessors graph
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initialState-pred-∅ : incoming initialState ≡ []
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initialState-pred-∅ =
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wrap-preds-∅ (buildCfg rootStmt) initialState (RelAny.here refl)
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edge⇒incoming : ∀ {s₁ s₂ : State} → (s₁ , s₂) ListMem.∈ (Graph.edges graph) →
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edge⇒incoming : ∀ {s₁ s₂ : State} → (s₁ , s₂) ListMem.∈ (Graph.edges graph) →
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s₁ ListMem.∈ (incoming s₂)
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s₁ ListMem.∈ (incoming s₂)
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edge⇒incoming = edge⇒predecessor graph
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edge⇒incoming = edge⇒predecessor graph
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@ -6,84 +6,23 @@ open import Language.Graphs
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open import Language.Traces
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open import Language.Traces
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open import Data.Fin as Fin using (suc; zero)
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open import Data.Fin as Fin using (suc; zero)
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open import Data.Fin.Properties as FinProp using (suc-injective)
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open import Data.List as List using (List; _∷_; [])
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open import Data.List as List using (List; _∷_; [])
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open import Data.List.Properties using (filter-none)
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open import Data.List.Relation.Unary.Any using (here; there)
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open import Data.List.Relation.Unary.Any using (here; there)
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open import Data.List.Relation.Unary.All using (All; []; _∷_; map; tabulate)
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open import Data.List.Membership.Propositional as ListMem using ()
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open import Data.List.Membership.Propositional as ListMem using ()
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open import Data.List.Membership.Propositional.Properties as ListMemProp using ()
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open import Data.List.Membership.Propositional.Properties as ListMemProp using ()
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open import Data.Nat as Nat using ()
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open import Data.Product using (Σ; _,_; _×_)
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open import Data.Product using (Σ; _,_; _×_; proj₂)
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open import Data.Product.Properties as ProdProp using ()
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open import Data.Sum using (inj₁; inj₂)
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open import Data.Vec as Vec using (_∷_)
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open import Data.Vec as Vec using (_∷_)
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open import Data.Vec.Properties using (lookup-++ˡ; ++-identityʳ; lookup-++ʳ)
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open import Data.Vec.Properties using (lookup-++ˡ; ++-identityʳ; lookup-++ʳ)
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open import Function using (_∘_)
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open import Function using (_∘_)
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open import Relation.Binary.PropositionalEquality as Eq using (_≡_; refl; sym; cong)
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open import Relation.Binary.PropositionalEquality as Eq using (_≡_; refl; sym)
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open import Relation.Nullary using (¬_)
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open import Utils using (x∈xs⇒fx∈fxs; ∈-cartesianProduct; concat-∈)
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open import Utils using (x∈xs⇒fx∈fxs; ∈-cartesianProduct; concat-∈)
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-- All of the below helpers are to reason about what edges aren't included
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wrap-input : ∀ (g : Graph) → Σ (Graph.Index (wrap g)) (λ idx → Graph.inputs (wrap g) ≡ idx ∷ [])
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-- when combinings graphs. The currenty most important use for this is proving
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wrap-input g = (_ , refl)
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-- that the entry node has no incoming edges.
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--
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-- -------------- Begin ugly code to make this work ----------------
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↑-≢ : ∀ {n m} (f₁ : Fin.Fin n) (f₂ : Fin.Fin m) → ¬ (f₁ Fin.↑ˡ m) ≡ (n Fin.↑ʳ f₂)
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↑-≢ zero f₂ ()
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↑-≢ (suc f₁') f₂ f₁≡f₂ = ↑-≢ f₁' f₂ (suc-injective f₁≡f₂)
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idx→f∉↑ʳᵉ : ∀ {n m} (idx : Fin.Fin (n Nat.+ m)) (f : Fin.Fin n) (es₂ : List (Fin.Fin m × Fin.Fin m)) → ¬ (idx , f Fin.↑ˡ m) ListMem.∈ (n ↑ʳᵉ es₂)
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wrap-output : ∀ (g : Graph) → Σ (Graph.Index (wrap g)) (λ idx → Graph.outputs (wrap g) ≡ idx ∷ [])
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idx→f∉↑ʳᵉ idx f ((idx₁ , idx₂) ∷ es') (here idx,f≡idx₁,idx₂) = ↑-≢ f idx₂ (cong proj₂ idx,f≡idx₁,idx₂)
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wrap-output g = (_ , refl)
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idx→f∉↑ʳᵉ idx f (_ ∷ es₂') (there idx→f∈es₂') = idx→f∉↑ʳᵉ idx f es₂' idx→f∈es₂'
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idx→f∉pair : ∀ {n m} (idx idx' : Fin.Fin (n Nat.+ m)) (f : Fin.Fin n) (inputs₂ : List (Fin.Fin m)) → ¬ (idx , f Fin.↑ˡ m) ListMem.∈ (List.map (idx' ,_) (n ↑ʳⁱ inputs₂))
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idx→f∉pair idx idx' f [] ()
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idx→f∉pair idx idx' f (input ∷ inputs') (here idx,f≡idx',input) = ↑-≢ f input (cong proj₂ idx,f≡idx',input)
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idx→f∉pair idx idx' f (_ ∷ inputs₂') (there idx,f∈inputs₂') = idx→f∉pair idx idx' f inputs₂' idx,f∈inputs₂'
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idx→f∉cart : ∀ {n m} (idx : Fin.Fin (n Nat.+ m)) (f : Fin.Fin n) (outputs₁ : List (Fin.Fin n)) (inputs₂ : List (Fin.Fin m)) → ¬ (idx , f Fin.↑ˡ m) ListMem.∈ (List.cartesianProduct (outputs₁ ↑ˡⁱ m) (n ↑ʳⁱ inputs₂))
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idx→f∉cart idx f [] inputs₂ ()
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idx→f∉cart {n} {m} idx f (output ∷ outputs₁') inputs₂ idx,f∈pair++cart
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with ListMemProp.∈-++⁻ (List.map (output Fin.↑ˡ m ,_) (n ↑ʳⁱ inputs₂)) idx,f∈pair++cart
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... | inj₁ idx,f∈pair = idx→f∉pair idx (output Fin.↑ˡ m) f inputs₂ idx,f∈pair
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... | inj₂ idx,f∈cart = idx→f∉cart idx f outputs₁' inputs₂ idx,f∈cart
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help : let g₁ = singleton [] in
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∀ (g₂ : Graph) (idx₁ : Graph.Index g₁) (idx : Graph.Index (g₁ ↦ g₂)) →
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¬ (idx , idx₁ Fin.↑ˡ Graph.size g₂) ListMem.∈ ((Graph.size g₁ ↑ʳᵉ Graph.edges g₂) List.++
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(List.cartesianProduct (Graph.outputs g₁ ↑ˡⁱ Graph.size g₂)
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(Graph.size g₁ ↑ʳⁱ Graph.inputs g₂)))
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help g₂ idx₁ idx idx,idx₁∈g
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with ListMemProp.∈-++⁻ (Graph.size (singleton []) ↑ʳᵉ Graph.edges g₂) idx,idx₁∈g
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... | inj₁ idx,idx₁∈edges₂ = idx→f∉↑ʳᵉ idx idx₁ (Graph.edges g₂) idx,idx₁∈edges₂
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... | inj₂ idx,idx₁∈cart = idx→f∉cart idx idx₁ (Graph.outputs (singleton [])) (Graph.inputs g₂) idx,idx₁∈cart
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helpAll : let g₁ = singleton [] in
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||||||
∀ (g₂ : Graph) (idx₁ : Graph.Index g₁) →
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|
||||||
All (λ idx → ¬ (idx , idx₁ Fin.↑ˡ Graph.size g₂) ListMem.∈ ((Graph.size g₁ ↑ʳᵉ Graph.edges g₂) List.++
|
|
||||||
(List.cartesianProduct (Graph.outputs g₁ ↑ˡⁱ Graph.size g₂)
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|
||||||
(Graph.size g₁ ↑ʳⁱ Graph.inputs g₂)))) (indices (g₁ ↦ g₂))
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|
||||||
helpAll g₂ idx₁ = tabulate (λ {idx} _ → help g₂ idx₁ idx)
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|
||||||
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|
||||||
module _ (g : Graph) where
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|
||||||
wrap-preds-∅ : (idx : Graph.Index (wrap g)) →
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|
||||||
idx ListMem.∈ Graph.inputs (wrap g) → predecessors (wrap g) idx ≡ []
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|
||||||
wrap-preds-∅ zero (here refl) =
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|
||||||
filter-none (λ idx' → (idx' , zero) ∈?
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|
||||||
(Graph.edges (wrap g)))
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|
||||||
(helpAll (g ↦ singleton []) zero)
|
|
||||||
where open import Data.List.Membership.DecPropositional (ProdProp.≡-dec (FinProp._≟_ {Graph.size (wrap g)}) (FinProp._≟_ {Graph.size (wrap g)})) using (_∈?_)
|
|
||||||
-- -------------- End ugly code to make this work ----------------
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|
||||||
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|
||||||
|
|
||||||
module _ (g : Graph) where
|
|
||||||
wrap-input : Σ (Graph.Index (wrap g)) (λ idx → Graph.inputs (wrap g) ≡ idx ∷ [])
|
|
||||||
wrap-input = (_ , refl)
|
|
||||||
|
|
||||||
wrap-output : Σ (Graph.Index (wrap g)) (λ idx → Graph.outputs (wrap g) ≡ idx ∷ [])
|
|
||||||
wrap-output = (_ , refl)
|
|
||||||
|
|
||||||
Trace-∙ˡ : ∀ {g₁ g₂ : Graph} {idx₁ idx₂ : Graph.Index g₁} {ρ₁ ρ₂ : Env} →
|
Trace-∙ˡ : ∀ {g₁ g₂ : Graph} {idx₁ idx₂ : Graph.Index g₁} {ρ₁ ρ₂ : Env} →
|
||||||
Trace {g₁} idx₁ idx₂ ρ₁ ρ₂ →
|
Trace {g₁} idx₁ idx₂ ρ₁ ρ₂ →
|
||||||
|
|
|
||||||
Loading…
Reference in New Issue
Block a user