From 9dca7fdaf192843f21f9785975ef52cace6558ee Mon Sep 17 00:00:00 2001 From: Helmut Grohne Date: Thu, 26 Jan 2012 15:51:15 +0100 Subject: split Bidir.agda to FinMap.agda --- FinMap.agda | 97 +++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++ 1 file changed, 97 insertions(+) create mode 100644 FinMap.agda (limited to 'FinMap.agda') diff --git a/FinMap.agda b/FinMap.agda new file mode 100644 index 0000000..a099e4f --- /dev/null +++ b/FinMap.agda @@ -0,0 +1,97 @@ +module FinMap where + +open import Data.Nat using (ℕ) +open import Data.Maybe using (Maybe ; just ; nothing ; maybe′) +open import Data.Fin using (Fin ; zero ; suc) +open import Data.Fin.Props using (_≟_) +open import Data.Vec using (Vec ; [] ; _∷_ ; _[_]≔_ ; replicate ; tabulate) renaming (lookup to lookupVec) +open import Data.List using (List ; [] ; _∷_ ; map ; zip) +open import Data.Product using (_×_ ; _,_) +open import Function using (id) +open import Relation.Nullary using (¬_ ; yes ; no) +open import Relation.Nullary.Negation using (contradiction ; contraposition) +open import Relation.Binary.Core using (_≡_ ; refl) +open import Relation.Binary.PropositionalEquality using (cong ; sym) +open Relation.Binary.PropositionalEquality.≡-Reasoning using (begin_ ; _≡⟨_⟩_ ; _∎) + +FinMapMaybe : ℕ → Set → Set +FinMapMaybe n A = Vec (Maybe A) n + +lookupM : {A : Set} {n : ℕ} → Fin n → FinMapMaybe n A → Maybe A +lookupM = lookupVec + +insert : {A : Set} {n : ℕ} → Fin n → A → FinMapMaybe n A → FinMapMaybe n A +insert f a m = m [ f ]≔ (just a) + +empty : {A : Set} {n : ℕ} → FinMapMaybe n A +empty = replicate nothing + +fromAscList : {A : Set} {n : ℕ} → List (Fin n × A) → FinMapMaybe n A +fromAscList [] = empty +fromAscList ((f , a) ∷ xs) = insert f a (fromAscList xs) + +FinMap : ℕ → Set → Set +FinMap n A = Vec A n + +lookup : {A : Set} {n : ℕ} → Fin n → FinMap n A → A +lookup = lookupVec + +fromFunc : {A : Set} {n : ℕ} → (Fin n → A) → FinMap n A +fromFunc = tabulate + +union : {A : Set} {n : ℕ} → FinMapMaybe n A → FinMap n A → FinMap n A +union m1 m2 = tabulate (λ f → maybe′ id (lookup f m2) (lookupM f m1)) + +generate : {A : Set} {n : ℕ} → (Fin n → A) → List (Fin n) → FinMapMaybe n A +generate f is = fromAscList (zip is (map f is)) + + +lemma-insert-same : {τ : Set} {n : ℕ} → (m : FinMapMaybe n τ) → (f : Fin n) → (a : τ) → lookupM f m ≡ just a → m ≡ insert f a m +lemma-insert-same [] () a p +lemma-insert-same (.(just a) ∷ xs) zero a refl = refl +lemma-insert-same (x ∷ xs) (suc i) a p = cong (_∷_ x) (lemma-insert-same xs i a p) + +lemma-lookupM-empty : {A : Set} {n : ℕ} → (i : Fin n) → lookupM {A} i empty ≡ nothing +lemma-lookupM-empty zero = refl +lemma-lookupM-empty (suc i) = lemma-lookupM-empty i + +lemma-lookupM-insert : {A : Set} {n : ℕ} → (i : Fin n) → (a : A) → (m : FinMapMaybe n A) → lookupM i (insert i a m) ≡ just a +lemma-lookupM-insert zero _ (_ ∷ _) = refl +lemma-lookupM-insert (suc i) a (_ ∷ xs) = lemma-lookupM-insert i a xs + +lemma-lookupM-insert-other : {A : Set} {n : ℕ} → (i j : Fin n) → (a : A) → (m : FinMapMaybe n A) → ¬(i ≡ j) → lookupM i m ≡ lookupM i (insert j a m) +lemma-lookupM-insert-other zero zero a m p = contradiction refl p +lemma-lookupM-insert-other zero (suc j) a (x ∷ xs) p = refl +lemma-lookupM-insert-other (suc i) zero a (x ∷ xs) p = refl +lemma-lookupM-insert-other (suc i) (suc j) a (x ∷ xs) p = lemma-lookupM-insert-other i j a xs (contraposition (cong suc) p) + +lemma-from-just : {A : Set} → {x y : A} → _≡_ {_} {Maybe A} (just x) (just y) → x ≡ y +lemma-from-just refl = refl + +lemma-lookupM-generate : {A : Set} {n : ℕ} → (i : Fin n) → (f : Fin n → A) → (is : List (Fin n)) → (a : A) → lookupM i (generate f is) ≡ just a → f i ≡ a +lemma-lookupM-generate {A} i f [] a p with begin + just a + ≡⟨ sym p ⟩ + lookupM i (generate f []) + ≡⟨ refl ⟩ + lookupM i empty + ≡⟨ lemma-lookupM-empty i ⟩ + nothing ∎ +lemma-lookupM-generate i f [] a p | () +lemma-lookupM-generate i f (i' ∷ is) a p with i ≟ i' +lemma-lookupM-generate i f (.i ∷ is) a p | yes refl = lemma-from-just (begin + just (f i) + ≡⟨ sym (lemma-lookupM-insert i (f i) (generate f is)) ⟩ + lookupM i (insert i (f i) (generate f is)) + ≡⟨ refl ⟩ + lookupM i (generate f (i ∷ is)) + ≡⟨ p ⟩ + just a ∎) +lemma-lookupM-generate i f (i' ∷ is) a p | no ¬p2 = lemma-lookupM-generate i f is a (begin + lookupM i (generate f is) + ≡⟨ lemma-lookupM-insert-other i i' (f i') (generate f is) ¬p2 ⟩ + lookupM i (insert i' (f i') (generate f is)) + ≡⟨ refl ⟩ + lookupM i (generate f (i' ∷ is)) + ≡⟨ p ⟩ + just a ∎) -- cgit v1.2.3