Add functions to reason about the 'monotonic state' operations
Signed-off-by: Danila Fedorin <danila.fedorin@gmail.com>
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@ -87,6 +87,10 @@ Both : {T₁ T₂ : S → Set s} → DependentPredicate T₁ → DependentPredic
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DependentPredicate (T₁ ⊗ T₂)
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Both P Q = (λ { s (t₁ , t₂) → (P s t₁ × Q s t₂) })
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And : {T : S → Set s} → DependentPredicate T → DependentPredicate T →
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DependentPredicate T
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And P Q = (λ { s t → (P s t × Q s t) })
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-- Since monotnic functions keep adding on to the state, proofs of
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-- predicates over their outputs go stale fast (they describe old values of
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-- the state). To keep them relevant, we need them to still hold on 'bigger
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@ -103,14 +107,42 @@ record MonotonicPredicate {T : S → Set s} {{ r : Relaxable T }} (P : Dependent
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always : ∀ {T : S → Set s} → DependentPredicate T → MonotonicState T → Set s
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always P m = ∀ s₁ → let (s₂ , t , _) = m s₁ in P s₂ t
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⟨⊗⟩-reason : ∀ {T₁ T₂ : S → Set s} {{ _ : Relaxable T₁ }}
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infixr 4 _⟨⊗⟩-reason_
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_⟨⊗⟩-reason_ : ∀ {T₁ T₂ : S → Set s} {{ _ : Relaxable T₁ }}
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{P : DependentPredicate T₁} {Q : DependentPredicate T₂}
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{{P-Mono : MonotonicPredicate P}}
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{m₁ : MonotonicState T₁} {m₂ : MonotonicState T₂} →
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always P m₁ → always Q m₂ → always (Both P Q) (m₁ ⟨⊗⟩ m₂)
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⟨⊗⟩-reason {{P-Mono = P-Mono}} {m₁ = m₁} {m₂ = m₂} aP aQ s
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_⟨⊗⟩-reason_ {{P-Mono = P-Mono}} {m₁ = m₁} {m₂ = m₂} aP aQ s
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with p ← aP s
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with (s' , (t₁ , s≼s')) ← m₁ s
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with q ← aQ s'
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with (s'' , (t₂ , s'≼s'')) ← m₂ s' =
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(MonotonicPredicate.relaxPredicate P-Mono _ _ _ s'≼s'' p , q)
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infixl 4 _update-reason_
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_update-reason_ : ∀ {T : S → Set s} {{ r : Relaxable T }} →
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{P : DependentPredicate T} {Q : DependentPredicate T}
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{{P-Mono : MonotonicPredicate P}}
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{m : MonotonicState T} {mod : ∀ (s : S) → T s → Σ S (λ s' → s ≼ s')} →
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always P m → (∀ (s : S) (t : T s) →
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let (s' , s≼s') = mod s t
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in P s t → Q s' (Relaxable.relax r s≼s' t)) →
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always (And P Q) (m update mod)
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_update-reason_ {{r = r}} {{P-Mono = P-Mono}} {m = m} {mod = mod} aP modQ s
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with p ← aP s
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with (s' , (t , s≼s')) ← m s
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with q ← modQ s' t p
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with (s'' , s'≼s'') ← mod s' t =
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(MonotonicPredicate.relaxPredicate P-Mono _ _ _ s'≼s'' p , q)
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infixl 4 _map-reason_
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_map-reason_ : ∀ {T₁ T₂ : S → Set s}
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{P : DependentPredicate T₁} {Q : DependentPredicate T₂}
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{m : MonotonicState T₁}
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{f : ∀ (s : S) → T₁ s → T₂ s} →
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always P m → (∀ (s : S) (t₁ : T₁ s) (t₂ : T₂ s) → P s t₁ → Q s t₂) →
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always Q (m map f)
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_map-reason_ {m = m} {f = f} aP P⇒Q s
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with p ← aP s
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with (s' , (t₁ , s≼s')) ← m s = P⇒Q s' t₁ (f s' t₁) p
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