2024-04-13 18:39:38 -07:00
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module Language.Graphs where
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2024-04-25 23:10:41 -07:00
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open import Language.Base using (Expr; Stmt; BasicStmt; ⟨_⟩; _then_; if_then_else_; while_repeat_)
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2024-04-25 23:10:41 -07:00
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open import Data.Fin as Fin using (Fin; 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.Membership.Propositional as ListMem using ()
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open import Data.List.Membership.Propositional.Properties as ListMemProp using (∈-filter⁺; ∈-filter⁻)
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open import Data.List.Relation.Unary.All using (All; []; _∷_)
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open import Data.List.Relation.Unary.Any as RelAny using ()
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open import Data.Nat as Nat using (ℕ; suc)
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open import Data.Nat.Properties using (+-assoc; +-comm)
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open import Data.Product using (_×_; Σ; _,_; proj₁; proj₂)
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open import Data.Product.Properties as ProdProp using ()
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open import Data.Vec using (Vec; []; _∷_; lookup; cast; _++_)
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2024-04-20 19:31:47 -07:00
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open import Data.Vec.Properties using (cast-is-id; ++-assoc; lookup-++ˡ; cast-sym; ++-identityʳ; lookup-++ʳ)
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open import Relation.Binary.PropositionalEquality as Eq using (_≡_; sym; refl; subst; trans)
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open import Relation.Nullary using (¬_)
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open import Lattice
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open import Utils using (Unique; push; Unique-map; x∈xs⇒fx∈fxs; ∈-cartesianProduct)
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record Graph : Set where
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constructor MkGraph
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field
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size : ℕ
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Index : Set
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Index = Fin size
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Edge : Set
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Edge = Index × Index
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field
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nodes : Vec (List BasicStmt) size
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edges : List Edge
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inputs : List Index
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outputs : List Index
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_↑ˡ_ : ∀ {n} → (Fin n × Fin n) → ∀ m → (Fin (n Nat.+ m) × Fin (n Nat.+ m))
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_↑ˡ_ (idx₁ , idx₂) m = (idx₁ Fin.↑ˡ m , idx₂ Fin.↑ˡ m)
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_↑ʳ_ : ∀ {m} n → (Fin m × Fin m) → Fin (n Nat.+ m) × Fin (n Nat.+ m)
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_↑ʳ_ n (idx₁ , idx₂) = (n Fin.↑ʳ idx₁ , n Fin.↑ʳ idx₂)
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_↑ˡⁱ_ : ∀ {n} → List (Fin n) → ∀ m → List (Fin (n Nat.+ m))
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_↑ˡⁱ_ l m = List.map (Fin._↑ˡ m) l
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_↑ʳⁱ_ : ∀ {m} n → List (Fin m) → List (Fin (n Nat.+ m))
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_↑ʳⁱ_ n l = List.map (n Fin.↑ʳ_) l
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_↑ˡᵉ_ : ∀ {n} → List (Fin n × Fin n) → ∀ m → List (Fin (n Nat.+ m) × Fin (n Nat.+ m))
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_↑ˡᵉ_ l m = List.map (_↑ˡ m) l
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_↑ʳᵉ_ : ∀ {m} n → List (Fin m × Fin m) → List (Fin (n Nat.+ m) × Fin (n Nat.+ m))
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_↑ʳᵉ_ n l = List.map (n ↑ʳ_) l
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2024-04-28 12:10:12 -07:00
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infixr 5 _∙_
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_∙_ : Graph → Graph → Graph
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_∙_ g₁ g₂ = record
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{ size = Graph.size g₁ Nat.+ Graph.size g₂
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; nodes = Graph.nodes g₁ ++ Graph.nodes g₂
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; edges = (Graph.edges g₁ ↑ˡᵉ Graph.size g₂) List.++
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(Graph.size g₁ ↑ʳᵉ Graph.edges g₂)
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; inputs = (Graph.inputs g₁ ↑ˡⁱ Graph.size g₂) List.++
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(Graph.size g₁ ↑ʳⁱ Graph.inputs g₂)
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; outputs = (Graph.outputs g₁ ↑ˡⁱ Graph.size g₂) List.++
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(Graph.size g₁ ↑ʳⁱ Graph.outputs g₂)
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}
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2024-04-28 12:10:12 -07:00
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infixr 5 _↦_
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_↦_ : Graph → Graph → Graph
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_↦_ g₁ g₂ = record
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{ size = Graph.size g₁ Nat.+ Graph.size g₂
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; nodes = Graph.nodes g₁ ++ Graph.nodes g₂
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; edges = (Graph.edges g₁ ↑ˡᵉ Graph.size g₂) List.++
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(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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; inputs = Graph.inputs g₁ ↑ˡⁱ Graph.size g₂
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; outputs = Graph.size g₁ ↑ʳⁱ Graph.outputs g₂
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}
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loop : Graph → Graph
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loop g = record
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{ size = 2 Nat.+ Graph.size g
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; nodes = [] ∷ [] ∷ Graph.nodes g
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; edges = (2 ↑ʳᵉ Graph.edges g) List.++
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List.map (zero ,_) (2 ↑ʳⁱ Graph.inputs g) List.++
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List.map (_, suc zero) (2 ↑ʳⁱ Graph.outputs g) List.++
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((suc zero , zero) ∷ (zero , suc zero) ∷ [])
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; inputs = zero ∷ []
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; outputs = (suc zero) ∷ []
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}
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2024-04-28 12:10:12 -07:00
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infixr 5 _skipto_
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2024-04-27 13:50:06 -07:00
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_skipto_ : Graph → Graph → Graph
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_skipto_ g₁ g₂ = record (g₁ ∙ g₂)
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{ edges = Graph.edges (g₁ ∙ g₂) List.++
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(List.cartesianProduct (Graph.inputs g₁ ↑ˡⁱ Graph.size g₂)
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(Graph.size g₁ ↑ʳⁱ Graph.inputs g₂))
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; inputs = Graph.inputs g₁ ↑ˡⁱ Graph.size g₂
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; outputs = Graph.size g₁ ↑ʳⁱ Graph.inputs g₂
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}
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_[_] : ∀ (g : Graph) → Graph.Index g → List BasicStmt
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_[_] g idx = lookup (Graph.nodes g) idx
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singleton : List BasicStmt → Graph
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singleton bss = record
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{ size = 1
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; nodes = bss ∷ []
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; edges = []
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; inputs = zero ∷ []
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; outputs = zero ∷ []
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}
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2024-05-09 21:08:32 -07:00
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wrap : Graph → Graph
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wrap g = singleton [] ↦ g ↦ singleton []
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buildCfg : Stmt → Graph
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buildCfg ⟨ bs₁ ⟩ = singleton (bs₁ ∷ [])
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buildCfg (s₁ then s₂) = buildCfg s₁ ↦ buildCfg s₂
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buildCfg (if _ then s₁ else s₂) = singleton [] ↦ (buildCfg s₁ ∙ buildCfg s₂) ↦ singleton []
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buildCfg (while _ repeat s) = loop (buildCfg s)
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private
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z≢sf : ∀ {n : ℕ} (f : Fin n) → ¬ (zero ≡ suc f)
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z≢sf f ()
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z≢mapsfs : ∀ {n : ℕ} (fs : List (Fin n)) → All (λ sf → ¬ zero ≡ sf) (List.map suc fs)
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z≢mapsfs [] = []
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z≢mapsfs (f ∷ fs') = z≢sf f ∷ z≢mapsfs fs'
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finValues : ∀ (n : ℕ) → Σ (List (Fin n)) Unique
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finValues 0 = ([] , Utils.empty)
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finValues (suc n') =
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let
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(inds' , unids') = finValues n'
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in
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( zero ∷ List.map suc inds'
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, push (z≢mapsfs inds') (Unique-map suc suc-injective unids')
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)
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finValues-complete : ∀ (n : ℕ) (f : Fin n) → f ListMem.∈ (proj₁ (finValues n))
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finValues-complete (suc n') zero = RelAny.here refl
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finValues-complete (suc n') (suc f') = RelAny.there (x∈xs⇒fx∈fxs suc (finValues-complete n' f'))
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module _ (g : Graph) where
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open import Data.List.Membership.DecPropositional (ProdProp.≡-dec (FinProp._≟_ {Graph.size g}) (FinProp._≟_ {Graph.size g})) using (_∈?_)
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indices : List (Graph.Index g)
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indices = proj₁ (finValues (Graph.size g))
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indices-complete : ∀ (idx : (Graph.Index g)) → idx ListMem.∈ indices
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indices-complete = finValues-complete (Graph.size g)
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indices-Unique : Unique indices
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indices-Unique = proj₂ (finValues (Graph.size g))
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predecessors : (Graph.Index g) → List (Graph.Index g)
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predecessors idx = List.filter (λ idx' → (idx' , idx) ∈? (Graph.edges g)) indices
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edge⇒predecessor : ∀ {idx₁ idx₂ : Graph.Index g} → (idx₁ , idx₂) ListMem.∈ (Graph.edges g) →
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idx₁ ListMem.∈ (predecessors idx₂)
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edge⇒predecessor {idx₁} {idx₂} idx₁,idx₂∈es =
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∈-filter⁺ (λ idx' → (idx' , idx₂) ∈? (Graph.edges g))
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(indices-complete idx₁) idx₁,idx₂∈es
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2024-05-09 23:18:51 -07:00
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predecessor⇒edge : ∀ {idx₁ idx₂ : Graph.Index g} → idx₁ ListMem.∈ (predecessors idx₂) →
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(idx₁ , idx₂) ListMem.∈ (Graph.edges g)
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predecessor⇒edge {idx₁} {idx₂} idx₁∈pred =
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proj₂ (∈-filter⁻ (λ idx' → (idx' , idx₂) ∈? (Graph.edges g)) {v = idx₁} {xs = indices} idx₁∈pred )
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