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module Lattice where
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2023-04-06 23:08:49 -07:00
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import Data.Nat.Properties as NatProps
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open import Relation.Binary.PropositionalEquality as Eq using (_≡_; sym)
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open import Relation.Binary.Definitions
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open import Data.Nat as Nat using (ℕ; _≤_)
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open import Data.Product using (_×_; _,_)
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open import Data.Sum using (_⊎_; inj₁; inj₂)
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open import Agda.Primitive using (lsuc; Level)
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open import NatMap using (NatMap)
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record IsPreorder {a} (A : Set a) (_≼_ : A → A → Set a) : Set a where
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field
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≼-refl : Reflexive (_≼_)
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≼-trans : Transitive (_≼_)
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≼-antisym : Antisymmetric (_≡_) (_≼_)
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isPreorderFlip : {a : Level} → {A : Set a} → {_≼_ : A → A → Set a} → IsPreorder A _≼_ → IsPreorder A (λ x y → y ≼ x)
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isPreorderFlip isPreorder = record
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{ ≼-refl = IsPreorder.≼-refl isPreorder
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; ≼-trans = λ {x} {y} {z} x≽y y≽z → IsPreorder.≼-trans isPreorder y≽z x≽y
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; ≼-antisym = λ {x} {y} x≽y y≽x → IsPreorder.≼-antisym isPreorder y≽x x≽y
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}
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record Preorder {a} (A : Set a) : Set (lsuc a) where
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field
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_≼_ : A → A → Set a
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isPreorder : IsPreorder A _≼_
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open IsPreorder isPreorder public
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record IsSemilattice {a} (A : Set a) (_≼_ : A → A → Set a) (_⊔_ : A → A → A) : Set a where
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field
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isPreorder : IsPreorder A _≼_
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⊔-assoc : (x y z : A) → (x ⊔ y) ⊔ z ≡ x ⊔ (y ⊔ z)
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⊔-comm : (x y : A) → x ⊔ y ≡ y ⊔ x
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⊔-idemp : (x : A) → x ⊔ x ≡ x
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⊔-bound : (x y z : A) → x ⊔ y ≡ z → (x ≼ z × y ≼ z)
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⊔-least : (x y z : A) → x ⊔ y ≡ z → ∀ (z' : A) → (x ≼ z' × y ≼ z') → z ≼ z'
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open IsPreorder isPreorder public
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record Semilattice {a} (A : Set a) : Set (lsuc a) where
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field
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_≼_ : A → A → Set a
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_⊔_ : A → A → A
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isSemilattice : IsSemilattice A _≼_ _⊔_
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open IsSemilattice isSemilattice public
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record IsLattice {a} (A : Set a) (_≼_ : A → A → Set a) (_⊔_ : A → A → A) (_⊓_ : A → A → A) : Set a where
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_≽_ : A → A → Set a
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a ≽ b = b ≼ a
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field
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joinSemilattice : IsSemilattice A _≼_ _⊔_
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meetSemilattice : IsSemilattice A _≽_ _⊓_
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absorb-⊔-⊓ : (x y : A) → x ⊔ (x ⊓ y) ≡ x
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absorb-⊓-⊔ : (x y : A) → x ⊓ (x ⊔ y) ≡ x
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open IsSemilattice joinSemilattice public
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open IsSemilattice meetSemilattice public renaming
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( ⊔-assoc to ⊓-assoc
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; ⊔-comm to ⊓-comm
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; ⊔-idemp to ⊓-idemp
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; ⊔-bound to ⊓-bound
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; ⊔-least to ⊓-least
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)
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record Lattice {a} (A : Set a) : Set (lsuc a) where
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field
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_≼_ : A → A → Set a
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_⊔_ : A → A → A
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_⊓_ : A → A → A
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isLattice : IsLattice A _≼_ _⊔_ _⊓_
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open IsLattice isLattice public
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private module NatInstances where
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open Nat
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open NatProps
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open Eq
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open Data.Sum
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NatPreorder : Preorder ℕ
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NatPreorder = record
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{ _≼_ = _≤_
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; isPreorder = record
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{ ≼-refl = ≤-refl
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; ≼-trans = ≤-trans
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; ≼-antisym = ≤-antisym
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}
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}
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private
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max-bound₁ : {x y z : ℕ} → x ⊔ y ≡ z → x ≤ z
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max-bound₁ {x} {y} {z} x⊔y≡z rewrite sym x⊔y≡z rewrite ⊔-comm x y = m≤n⇒m≤o⊔n y (≤-refl)
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max-bound₂ : {x y z : ℕ} → x ⊔ y ≡ z → y ≤ z
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max-bound₂ {x} {y} {z} x⊔y≡z rewrite sym x⊔y≡z = m≤n⇒m≤o⊔n x (≤-refl)
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max-least : (x y z : ℕ) → x ⊔ y ≡ z → ∀ (z' : ℕ) → (x ≤ z' × y ≤ z') → z ≤ z'
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max-least x y z x⊔y≡z z' (x≤z' , y≤z') with (⊔-sel x y)
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... | inj₁ x⊔y≡x rewrite trans (sym x⊔y≡z) (x⊔y≡x) = x≤z'
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... | inj₂ x⊔y≡y rewrite trans (sym x⊔y≡z) (x⊔y≡y) = y≤z'
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NatMaxSemilattice : Semilattice ℕ
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NatMaxSemilattice = record
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{ _≼_ = _≤_
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; _⊔_ = _⊔_
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; isSemilattice = record
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{ isPreorder = Preorder.isPreorder NatPreorder
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; ⊔-assoc = ⊔-assoc
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; ⊔-comm = ⊔-comm
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; ⊔-idemp = ⊔-idem
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; ⊔-bound = λ x y z x⊔y≡z → (max-bound₁ x⊔y≡z , max-bound₂ x⊔y≡z)
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; ⊔-least = max-least
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}
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}
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private
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min-bound₁ : {x y z : ℕ} → x ⊓ y ≡ z → z ≤ x
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min-bound₁ {x} {y} {z} x⊓y≡z rewrite sym x⊓y≡z = m≤n⇒m⊓o≤n y (≤-refl)
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min-bound₂ : {x y z : ℕ} → x ⊓ y ≡ z → z ≤ y
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min-bound₂ {x} {y} {z} x⊓y≡z rewrite sym x⊓y≡z rewrite ⊓-comm x y = m≤n⇒m⊓o≤n x (≤-refl)
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min-greatest : (x y z : ℕ) → x ⊓ y ≡ z → ∀ (z' : ℕ) → (z' ≤ x × z' ≤ y) → z' ≤ z
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min-greatest x y z x⊓y≡z z' (z'≤x , z'≤y) with (⊓-sel x y)
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... | inj₁ x⊓y≡x rewrite trans (sym x⊓y≡z) (x⊓y≡x) = z'≤x
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... | inj₂ x⊓y≡y rewrite trans (sym x⊓y≡z) (x⊓y≡y) = z'≤y
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NatMinSemilattice : Semilattice ℕ
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NatMinSemilattice = record
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{ _≼_ = _≥_
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; _⊔_ = _⊓_
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; isSemilattice = record
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{ isPreorder = isPreorderFlip (Preorder.isPreorder NatPreorder)
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; ⊔-assoc = ⊓-assoc
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; ⊔-comm = ⊓-comm
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; ⊔-idemp = ⊓-idem
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; ⊔-bound = λ x y z x⊓y≡z → (min-bound₁ x⊓y≡z , min-bound₂ x⊓y≡z)
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; ⊔-least = min-greatest
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}
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}
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NatLattice : Lattice ℕ
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NatLattice = record
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{ _≼_ = _≤_
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; _⊔_ = _⊔_
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; _⊓_ = _⊓_
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; isLattice = record
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{ joinSemilattice = Semilattice.isSemilattice NatMaxSemilattice
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; meetSemilattice = Semilattice.isSemilattice NatMinSemilattice
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}
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}
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