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Author SHA1 Message Date
ae09a27f64 Prove that finite value-maps are finite height
Signed-off-by: Danila Fedorin <danila.fedorin@gmail.com>
2024-03-01 21:03:23 -08:00
ca90f6509c Re-write the IterProd proofs to couple lattice and finite height lattice
Signed-off-by: Danila Fedorin <danila.fedorin@gmail.com>
2024-03-01 21:02:56 -08:00
29898e738b Clean up a bit
Signed-off-by: Danila Fedorin <danila.fedorin@gmail.com>
2024-03-01 19:08:29 -08:00
3a537f54ba Add a helpful utility function
Signed-off-by: Danila Fedorin <danila.fedorin@gmail.com>
2024-03-01 19:08:11 -08:00
52e7a7a208 Prove distributivity in the other direction, too
Signed-off-by: Danila Fedorin <danila.fedorin@gmail.com>
2024-03-01 19:07:59 -08:00
5 changed files with 209 additions and 146 deletions

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@ -12,10 +12,12 @@ open import Function.Definitions using (Inverseˡ; Inverseʳ)
module Lattice.FiniteValueMap (A : Set) (B : Set)
(_≈₂_ : B B Set)
(_⊔₂_ : B B B) (_⊓₂_ : B B B)
(-dec-A : Decidable (_≡_ {_} {A}))
(-dec-A : Decidable (_≡_ {_} {A}))
(lB : IsLattice B _≈₂_ _⊔₂_ _⊓₂_) where
open import Data.List using (List; length; []; _∷_)
open import Data.List using (List; length; []; _∷_; map)
open import Data.List.Membership.Propositional using () renaming (_∈_ to _∈ˡ_)
open import Data.Nat using ()
open import Data.Product using (Σ; proj₁; proj₂; _×_)
open import Data.Empty using (⊥-elim)
open import Utils using (Unique; push; empty; All¬-¬Any)
@ -25,32 +27,32 @@ open import Data.List.Relation.Unary.All using (All)
open import Data.List.Relation.Unary.Any using (Any; here; there)
open import Relation.Nullary using (¬_)
open import Lattice.Map A B _≈₂_ _⊔₂_ _⊓₂_ -dec-A lB using (subset-impl; locate; forget; _∈_; Map-functional; Expr-Provenance; _∩_; __; `_; in₁; in₂; bothᵘ; single; ⊔-combines)
open import Lattice.FiniteMap A B _≈₂_ _⊔₂_ _⊓₂_ -dec-A lB public
open import Lattice.Map A B _≈₂_ _⊔₂_ _⊓₂_ -dec-A lB using (subset-impl; locate; forget; _∈_; Map-functional; Expr-Provenance; _∩_; __; `_; in₁; in₂; bothᵘ; single; ⊔-combines)
open import Lattice.FiniteMap A B _≈₂_ _⊔₂_ _⊓₂_ -dec-A lB public
module IterProdIsomorphism where
open import Data.Unit using (; tt)
open import Lattice.Unit using () renaming (_≈_ to _≈ᵘ_; _⊔_ to _⊔ᵘ_; _⊓_ to _⊓ᵘ_; ≈-dec to ≈ᵘ-dec; isLattice to isLatticeᵘ; ≈-equiv to ≈ᵘ-equiv)
open import Lattice.Unit using () renaming (_≈_ to _≈ᵘ_; _⊔_ to _⊔ᵘ_; _⊓_ to _⊓ᵘ_; ≈-dec to ≈ᵘ-dec; isLattice to isLatticeᵘ; ≈-equiv to ≈ᵘ-equiv; fixedHeight to fixedHeightᵘ)
open import Lattice.IterProd _≈₂_ _≈ᵘ_ _⊔₂_ _⊔ᵘ_ _⊓₂_ _⊓ᵘ_ lB isLatticeᵘ as IP using (IterProd)
open IsLattice lB using () renaming (≈-trans to ≈₂-trans; ≈-sym to ≈₂-sym)
open IsLattice lB using () renaming (≈-trans to ≈₂-trans; ≈-sym to ≈₂-sym; FixedHeight to FixedHeight₂)
from : {ks : List A} FiniteMap ks IterProd (length ks)
from {[]} (([] , _) , _) = tt
from {k ks'} (((k' , v) kvs' , push _ uks') , refl) = (v , from ((kvs' , uks'), refl))
from {k ks'} (((k' , v) fm' , push _ uks') , refl) = (v , from ((fm' , uks'), refl))
to : {ks : List A} Unique ks IterProd (length ks) FiniteMap ks
to {[]} _ = (([] , empty) , refl)
to {k ks'} (push k≢ks' uks') (v , rest)
with to uks' rest
... | ((kvs' , ukvs') , kvs'≡ks') =
let
-- This would be easier if we pattern matched on the equiality proof
-- to get refl, but that makes it harder to reason about 'to' when
-- the arguments are not known to be refl.
k≢kvs' = subst (λ ks All (λ k' ¬ k k') ks) (sym kvs'≡ks') k≢ks'
kvs≡ks = cong (k ∷_) kvs'≡ks'
in
(((k , v) kvs' , push k≢kvs' ukvs') , kvs≡ks)
to {k ks'} (push k≢ks' uks') (v , rest) =
let
((fm' , ufm') , fm'≡ks') = to uks' rest
-- This would be easier if we pattern matched on the equiality proof
-- to get refl, but that makes it harder to reason about 'to' when
-- the arguments are not known to be refl.
k≢fm' = subst (λ ks All (λ k' ¬ k k') ks) (sym fm'≡ks') k≢ks'
kvs≡ks = cong (k ∷_) fm'≡ks'
in
(((k , v) fm' , push k≢fm' ufm') , kvs≡ks)
private
@ -76,10 +78,10 @@ module IterProdIsomorphism where
Inverseˡ (_≈ᵐ_ {ks}) (_≈ⁱᵖ_ {ks}) (from {ks}) (to {ks} uks) -- from (to x) = x
from-to-inverseˡ {[]} _ _ = IsEquivalence.≈-refl (IP.≈-equiv 0)
from-to-inverseˡ {k ks'} (push k≢ks' uks') (v , rest)
with ((kvs' , ukvs') , refl) to uks' rest in p rewrite sym p =
with ((fm' , ufm') , refl) to uks' rest in p rewrite sym p =
(IsLattice.≈-refl lB , from-to-inverseˡ {ks'} uks' rest)
-- the rewrite here is needed because the IH is in terms of `to uks' rest`,
-- but we end up with the 'unpacked' form (kvs', ...). So, put it back
-- but we end up with the 'unpacked' form (fm', ...). So, put it back
-- in the 'packed' form after we've performed enough inspection
-- to know we take the cons branch of `to`.
@ -88,24 +90,24 @@ module IterProdIsomorphism where
from-to-inverseʳ : {ks : List A} (uks : Unique ks)
Inverseʳ (_≈ᵐ_ {ks}) (_≈ⁱᵖ_ {ks}) (from {ks}) (to {ks} uks) -- to (from x) = x
from-to-inverseʳ {[]} _ (([] , empty) , kvs≡ks) rewrite kvs≡ks = ((λ k v ()) , (λ k v ()))
from-to-inverseʳ {k ks'} uks@(push k≢ks'₁ uks'₁) fm₁@(m₁@((k , v) kvs'₁ , push k≢ks'₂ uks'₂) , refl)
with to uks'₁ (from ((kvs'₁ , uks'₂) , refl)) | from-to-inverseʳ {ks'} uks'₁ ((kvs'₁ , uks'₂) , refl)
... | ((kvs'₂ , ukvs'₂) , _) | (kvs'₂⊆kvs'₁ , kvs'₁⊆kvs'₂) = (m₂⊆m₁ , m₁⊆m₂)
from-to-inverseʳ {k ks'} uks@(push k≢ks'₁ uks'₁) fm₁@(m₁@((k , v) fm'₁ , push k≢ks'₂ uks'₂) , refl)
with to uks'₁ (from ((fm'₁ , uks'₂) , refl)) | from-to-inverseʳ {ks'} uks'₁ ((fm'₁ , uks'₂) , refl)
... | ((fm'₂ , ufm'₂) , _) | (fm'₂⊆fm'₁ , fm'₁⊆fm'₂) = (m₂⊆m₁ , m₁⊆m₂)
where
kvs₁ = (k , v) kvs'₁
kvs₂ = (k , v) kvs'₂
kvs₁ = (k , v) fm'₁
kvs₂ = (k , v) fm'₂
m₁⊆m₂ : subset-impl kvs₁ kvs₂
m₁⊆m₂ k' v' (here refl) = (v' , (IsLattice.≈-refl lB , here refl))
m₁⊆m₂ k' v' (there k',v'∈kvs'₁) =
let (v'' , (v'≈v'' , k',v''∈kvs'₂)) = kvs'₁⊆kvs'₂ k' v' k',v'∈kvs'₁
in (v'' , (v'≈v'' , there k',v''∈kvs'₂))
m₁⊆m₂ k' v' (there k',v'∈fm'₁) =
let (v'' , (v'≈v'' , k',v''∈fm'₂)) = fm'₁⊆fm'₂ k' v' k',v'∈fm'₁
in (v'' , (v'≈v'' , there k',v''∈fm'₂))
m₂⊆m₁ : subset-impl kvs₂ kvs₁
m₂⊆m₁ k' v' (here refl) = (v' , (IsLattice.≈-refl lB , here refl))
m₂⊆m₁ k' v' (there k',v'∈kvs'₂) =
let (v'' , (v'≈v'' , k',v''∈kvs'₁)) = kvs'₂⊆kvs'₁ k' v' k',v'∈kvs'₂
in (v'' , (v'≈v'' , there k',v''∈kvs'₁))
m₂⊆m₁ k' v' (there k',v'∈fm'₂) =
let (v'' , (v'≈v'' , k',v''∈fm'₁)) = fm'₂⊆fm'₁ k' v' k',v'∈fm'₂
in (v'' , (v'≈v'' , there k',v''∈fm'₁))
private
first-key-in-map : {k : A} {ks : List A} (fm : FiniteMap (k ks)) Σ B (λ v (k , v) proj₁ fm)
@ -119,40 +121,39 @@ module IterProdIsomorphism where
-- matching into a helper functions, and write solutions in terms
-- of that.
pop : {k : A} {ks : List A} FiniteMap (k ks) FiniteMap ks
pop (((_ kvs') , push _ ukvs') , refl) = ((kvs' , ukvs') , refl)
pop (((_ fm') , push _ ufm') , refl) = ((fm' , ufm') , refl)
pop-≈ : {k : A} {ks : List A} (fm₁ fm₂ : FiniteMap (k ks)) fm₁ ≈ᵐ fm₂ pop fm₁ ≈ᵐ pop fm₂
pop-≈ {k} {ks} fm₁ fm₂ (fm₁⊆fm₂ , fm₂⊆fm₁) = (narrow fm₁⊆fm₂ , narrow fm₂⊆fm₁)
where
narrow₁ : {fm₁ fm₂ : FiniteMap (k ks)} fm₁ ⊆ᵐ fm₂ pop fm₁ ⊆ᵐ fm₂
narrow₁ {(_ _ , push _ _) , refl} kvs₁⊆kvs₂ k' v' k',v'∈kvs'₁ = kvs₁⊆kvs₂ k' v' (there k',v'∈kvs'₁)
narrow₁ {(_ _ , push _ _) , refl} kvs₁⊆kvs₂ k' v' k',v'∈fm'₁ = kvs₁⊆kvs₂ k' v' (there k',v'∈fm'₁)
narrow₂ : {fm₁ : FiniteMap ks} {fm₂ : FiniteMap (k ks)} fm₁ ⊆ᵐ fm₂ fm₁ ⊆ᵐ pop fm₂
narrow₂ {fm₁} {fm₂ = (_ kvs'₂ , push k≢ks _) , kvs≡ks@refl} kvs₁⊆kvs₂ k' v' k',v'∈kvs'₁
with kvs₁⊆kvs₂ k' v' k',v'∈kvs'₁
... | (v'' , (v'≈v'' , here refl)) rewrite sym (proj₂ fm₁) = ⊥-elim (All¬-¬Any k≢ks (forget {m = proj₁ fm₁} k',v'∈kvs'₁))
... | (v'' , (v'≈v'' , there k',v'∈kvs'₂)) = (v'' , (v'≈v'' , k',v'∈kvs'₂))
narrow₂ {fm₁} {fm₂ = (_ fm'₂ , push k≢ks _) , kvs≡ks@refl} kvs₁⊆kvs₂ k' v' k',v'∈fm'₁
with kvs₁⊆kvs₂ k' v' k',v'∈fm'₁
... | (v'' , (v'≈v'' , here refl)) rewrite sym (proj₂ fm₁) = ⊥-elim (All¬-¬Any k≢ks (forget {m = proj₁ fm₁} k',v'∈fm'₁))
... | (v'' , (v'≈v'' , there k',v'∈fm'₂)) = (v'' , (v'≈v'' , k',v'∈fm'₂))
narrow : {fm₁ fm₂ : FiniteMap (k ks)} fm₁ ⊆ᵐ fm₂ pop fm₁ ⊆ᵐ pop fm₂
narrow {fm₁} {fm₂} x = narrow₂ {pop fm₁} (narrow₁ {fm₂ = fm₂} x)
k,v∈pop⇒k,v∈ : {k : A} {ks : List A} {k' : A} {v : B} (fm : FiniteMap (k ks)) (k' , v) ∈ᵐ pop fm (¬ k k' × ((k' , v) ∈ᵐ fm))
k,v∈pop⇒k,v∈ {k} {ks} {k'} {v} (m@((k , _) kvs' , push k≢ks uks') , refl) k',v∈fm =
((λ { refl All¬-¬Any k≢ks (forget {m = (kvs' , uks')} k',v∈fm) }), there k',v∈fm)
k,v∈pop⇒k,v∈ {k} {ks} {k'} {v} (m@((k , _) fm' , push k≢ks uks') , refl) k',v∈fm =
((λ { refl All¬-¬Any k≢ks (forget {m = (fm' , uks')} k',v∈fm) }), there k',v∈fm)
k,v∈⇒k,v∈pop : {k : A} {ks : List A} {k' : A} {v : B} (fm : FiniteMap (k ks)) ¬ k k' (k' , v) ∈ᵐ fm (k' , v) ∈ᵐ pop fm
k,v∈⇒k,v∈pop {k} {ks} {k'} {v} (m@((k , _) kvs' , push k≢ks uks') , refl) k≢k' (here refl) = ⊥-elim (k≢k' refl)
k,v∈⇒k,v∈pop {k} {ks} {k'} {v} (m@((k , _) kvs' , push k≢ks uks') , refl) k≢k' (there k,v'∈kvs') = k,v'∈kvs'
k,v∈⇒k,v∈pop {k} {ks} {k'} {v} (m@((k , _) fm' , push k≢ks uks') , refl) k≢k' (here refl) = ⊥-elim (k≢k' refl)
k,v∈⇒k,v∈pop {k} {ks} {k'} {v} (m@((k , _) fm' , push k≢ks uks') , refl) k≢k' (there k,v'∈fm') = k,v'∈fm'
Provenance-union : {ks : List A} (fm₁ fm₂ : FiniteMap ks) (k : A) (v : B) (k , v) ∈ᵐ (fm₁ ⊔ᵐ fm₂) Σ (B × B) (λ (v₁ , v₂) ((v v₁ ⊔₂ v₂) × ((k , v₁) ∈ᵐ fm₁ × (k , v₂) ∈ᵐ fm₂)))
Provenance-union fm₁@(m₁ , ks₁≡ks) fm₂@(m₂ , ks₂≡ks) k v k,v∈fm₁fm₂
Provenance-union : {ks : List A} (fm₁ fm₂ : FiniteMap ks) {k : A} {v : B} (k , v) ∈ᵐ (fm₁ ⊔ᵐ fm₂) Σ (B × B) (λ (v₁ , v₂) ((v v₁ ⊔₂ v₂) × ((k , v₁) ∈ᵐ fm₁ × (k , v₂) ∈ᵐ fm₂)))
Provenance-union fm₁@(m₁ , ks₁≡ks) fm₂@(m₂ , ks₂≡ks) {k} {v} k,v∈fm₁fm₂
with Expr-Provenance k ((` m₁) (` m₂)) (forget {m = proj₁ (fm₁ ⊔ᵐ fm₂)} k,v∈fm₁fm₂)
... | (_ , (in (single k,v∈m₁) k∉km₂ , _)) with k∈km₁ (forget {m = m₁} k,v∈m₁) rewrite trans ks₁≡ks (sym ks₂≡ks) = ⊥-elim (k∉km₂ k∈km₁)
... | (_ , (in k∉km₁ (single k,v∈m₂) , _)) with k∈km₂ (forget {m = m₂} k,v∈m₂) rewrite trans ks₁≡ks (sym ks₂≡ks) = ⊥-elim (k∉km₁ k∈km₂)
... | (v₁⊔v₂ , (bothᵘ {v₁} {v₂} (single k,v₁∈m₁) (single k,v₂∈m₂) , k,v₁⊔v₂∈m₁m₂))
rewrite Map-functional {m = proj₁ (fm₁ ⊔ᵐ fm₂)} k,v∈fm₁fm₂ k,v₁⊔v₂∈m₁m₂ = ((v₁ , v₂) , (refl , (k,v₁∈m₁ , k,v₂∈m₂)))
pop-⊔-distr : {k : A} {ks : List A} (fm₁ fm₂ : FiniteMap (k ks)) pop (fm₁ ⊔ᵐ fm₂) ≈ᵐ (pop fm₁ ⊔ᵐ pop fm₂)
pop-⊔-distr {k} {ks} fm₁@(m₁ , _) fm₂@(m₂ , _) = (pfm₁fm₂⊆pfm₁pfm₂ , pfm₁pfm₂⊆pfm₁fm₂)
where
@ -160,51 +161,51 @@ module IterProdIsomorphism where
pfm₁fm₂⊆pfm₁pfm₂ : pop (fm₁ ⊔ᵐ fm₂) ⊆ᵐ (pop fm₁ ⊔ᵐ pop fm₂)
pfm₁fm₂⊆pfm₁pfm₂ k' v' k',v'∈pfm₁fm₂
with (k≢k' , k',v'∈fm₁fm₂) k,v∈pop⇒k,v∈ (fm₁ ⊔ᵐ fm₂) k',v'∈pfm₁fm₂
with ((v₁ , v₂) , (refl , (k,v₁∈fm₁ , k,v₂∈fm₂))) Provenance-union fm₁ fm₂ k' v' k',v'∈fm₁fm₂
with ((v₁ , v₂) , (refl , (k,v₁∈fm₁ , k,v₂∈fm₂))) Provenance-union fm₁ fm₂ k',v'∈fm₁fm₂
with k',v₁∈pfm₁ k,v∈⇒k,v∈pop fm₁ k≢k' k,v₁∈fm₁
with k',v₂∈pfm₂ k,v∈⇒k,v∈pop fm₂ k≢k' k,v₂∈fm₂
= (v₁ ⊔₂ v₂ , (IsLattice.≈-refl lB , ⊔-combines {m₁ = proj₁ (pop fm₁)} {m₂ = proj₁ (pop fm₂)} k',v₁∈pfm₁ k',v₂∈pfm₂))
pfm₁pfm₂⊆pfm₁fm₂ : (pop fm₁ ⊔ᵐ pop fm₂) ⊆ᵐ pop (fm₁ ⊔ᵐ fm₂)
pfm₁pfm₂⊆pfm₁fm₂ k' v' k',v'∈pfm₁pfm₂
with ((v₁ , v₂) , (refl , (k,v₁∈pfm₁ , k,v₂∈pfm₂))) Provenance-union (pop fm₁) (pop fm₂) k' v' k',v'∈pfm₁pfm₂
with ((v₁ , v₂) , (refl , (k,v₁∈pfm₁ , k,v₂∈pfm₂))) Provenance-union (pop fm₁) (pop fm₂) k',v'∈pfm₁pfm₂
with (k≢k' , k',v₁∈fm₁) k,v∈pop⇒k,v∈ fm₁ k,v₁∈pfm₁
with (_ , k',v₂∈fm₂) k,v∈pop⇒k,v∈ fm₂ k,v₂∈pfm₂
= (v₁ ⊔₂ v₂ , (IsLattice.≈-refl lB , k,v∈⇒k,v∈pop (fm₁ ⊔ᵐ fm₂) k≢k' (⊔-combines {m₁ = m₁} {m₂ = m₂} k',v₁∈fm₁ k',v₂∈fm₂)))
from-rest : {k : A} {ks : List A} (fm : FiniteMap (k ks)) proj₂ (from fm) from (pop fm)
from-rest (((_ kvs') , push _ ukvs') , refl) = refl
from-rest (((_ fm') , push _ ufm') , refl) = refl
from-preserves-≈ : {ks : List A} (fm₁ fm₂ : FiniteMap ks) fm₁ ≈ᵐ fm₂ (_≈ⁱᵖ_ {ks}) (from fm₁) (from fm₂)
from-preserves-≈ {[]} (([] , _) , _) (([] , _) , _) _ = IsEquivalence.≈-refl ≈ᵘ-equiv
from-preserves-≈ {k ks'} fm₁@(m₁ , _) fm₂@(m₂ , _) fm₁≈fm₂@(kvs₁⊆kvs₂ , kvs₂⊆kvs₁)
from-preserves-≈ : {ks : List A} {fm₁ fm₂ : FiniteMap ks} fm₁ ≈ᵐ fm₂ (_≈ⁱᵖ_ {ks}) (from fm₁) (from fm₂)
from-preserves-≈ {[]} {([] , _) , _} {([] , _) , _} _ = IsEquivalence.≈-refl ≈ᵘ-equiv
from-preserves-≈ {k ks'} {fm₁@(m₁ , _)} {fm₂@(m₂ , _)} fm₁≈fm₂@(kvs₁⊆kvs₂ , kvs₂⊆kvs₁)
with first-key-in-map fm₁ | first-key-in-map fm₂ | from-first-value fm₁ | from-first-value fm₂
... | (v₁ , k,v₁∈fm₁) | (v₂ , k,v₂∈fm₂) | refl | refl
with kvs₁⊆kvs₂ _ _ k,v₁∈fm₁
... | (v₁' , (v₁≈v₁' , k,v₁'∈fm₂))
rewrite Map-functional {m = m₂} k,v₂∈fm₂ k,v₁'∈fm₂
rewrite from-rest fm₁ rewrite from-rest fm₂
= (v₁≈v₁' , from-preserves-≈ (pop fm₁) (pop fm₂) (pop-≈ fm₁ fm₂ fm₁≈fm₂))
= (v₁≈v₁' , from-preserves-≈ {ks'} {pop fm₁} {pop fm₂} (pop-≈ fm₁ fm₂ fm₁≈fm₂))
to-preserves-≈ : {ks : List A} (uks : Unique ks) (ip₁ ip₂ : IterProd (length ks)) _≈ⁱᵖ_ {ks} ip₁ ip₂ to uks ip₁ ≈ᵐ to uks ip₂
to-preserves-≈ {[]} empty tt tt _ = ((λ k v ()), (λ k v ()))
to-preserves-≈ {k ks'} uks@(push k≢ks' uks') ip₁@(v₁ , rest₁) ip₂@(v₂ , rest₂) (v₁≈v₂ , rest₁≈rest₂) = (fm₁⊆fm₂ , fm₂⊆fm₁)
to-preserves-≈ : {ks : List A} (uks : Unique ks) {ip₁ ip₂ : IterProd (length ks)} _≈ⁱᵖ_ {ks} ip₁ ip₂ to uks ip₁ ≈ᵐ to uks ip₂
to-preserves-≈ {[]} empty {tt} {tt} _ = ((λ k v ()), (λ k v ()))
to-preserves-≈ {k ks'} uks@(push k≢ks' uks') {ip₁@(v₁ , rest₁)} {ip₂@(v₂ , rest₂)} (v₁≈v₂ , rest₁≈rest₂) = (fm₁⊆fm₂ , fm₂⊆fm₁)
where
fm₁⊆fm₂ : to uks ip₁ ⊆ᵐ to uks ip₂
fm₁⊆fm₂ k v k,v∈kvs₁
with ((kvs'₁ , ukvs'₁) , kvs'₁≡ks') to uks' rest₁ in p₁
with ((kvs'₂ , ukvs'₂) , kvs'₂≡ks') to uks' rest₂ in p₂
with ((fm'₁ , ufm'₁) , fm'₁≡ks') to uks' rest₁ in p₁
with ((fm'₂ , ufm'₂) , fm'₂≡ks') to uks' rest₂ in p₂
with k,v∈kvs₁
... | here refl = (v₂ , (v₁≈v₂ , here refl))
... | there k,v∈kvs'₁ with refl p₁ with refl p₂ = let (v' , (v≈v' , k,v'∈kvs₁)) = proj₁ (to-preserves-≈ uks' rest₁ rest₂ rest₁≈rest₂) k v k,v∈kvs'₁ in (v' , (v≈v' , there k,v'∈kvs₁))
... | there k,v∈fm'₁ with refl p₁ with refl p₂ = let (v' , (v≈v' , k,v'∈kvs₁)) = proj₁ (to-preserves-≈ uks' {rest₁} {rest₂} rest₁≈rest₂) k v k,v∈fm'₁ in (v' , (v≈v' , there k,v'∈kvs₁))
fm₂⊆fm₁ : to uks ip₂ ⊆ᵐ to uks ip₁
fm₂⊆fm₁ k v k,v∈kvs₂
with ((kvs'₁ , ukvs'₁) , kvs'₁≡ks') to uks' rest₁ in p₁
with ((kvs'₂ , ukvs'₂) , kvs'₂≡ks') to uks' rest₂ in p₂
with ((fm'₁ , ufm'₁) , fm'₁≡ks') to uks' rest₁ in p₁
with ((fm'₂ , ufm'₂) , fm'₂≡ks') to uks' rest₂ in p₂
with k,v∈kvs₂
... | here refl = (v₁ , (IsLattice.≈-sym lB v₁≈v₂ , here refl))
... | there k,v∈kvs'₂ with refl p₁ with refl p₂ = let (v' , (v≈v' , k,v'∈kvs₂)) = proj₂ (to-preserves-≈ uks' rest₁ rest₂ rest₁≈rest₂) k v k,v∈kvs'₂ in (v' , (v≈v' , there k,v'∈kvs₂))
... | there k,v∈fm'₂ with refl p₁ with refl p₂ = let (v' , (v≈v' , k,v'∈kvs₂)) = proj₂ (to-preserves-≈ uks' {rest₁} {rest₂} rest₁≈rest₂) k v k,v∈fm'₂ in (v' , (v≈v' , there k,v'∈kvs₂))
from-⊔-distr : {ks : List A} (fm₁ fm₂ : FiniteMap ks) _≈ⁱᵖ_ {ks} (from (fm₁ ⊔ᵐ fm₂)) (_⊔ⁱᵖ_ {ks} (from fm₁) (from fm₂))
from-⊔-distr {[]} fm₁ fm₂ = IsEquivalence.≈-refl ≈ᵘ-equiv
@ -220,5 +221,54 @@ module IterProdIsomorphism where
rewrite Map-functional {m = proj₁ (fm₁ ⊔ᵐ fm₂)} k,v∈fm₁fm₂ k,v₁⊔v₂∈m₁m₂
rewrite from-rest (fm₁ ⊔ᵐ fm₂) rewrite from-rest fm₁ rewrite from-rest fm₂
= ( IsLattice.≈-refl lB
, IsEquivalence.≈-trans (IP.≈-equiv (length ks)) (from-preserves-≈ (pop (fm₁ ⊔ᵐ fm₂)) (pop fm₁ ⊔ᵐ pop fm₂) (pop-⊔-distr fm₁ fm₂)) ((from-⊔-distr (pop fm₁) (pop fm₂)))
, IsEquivalence.≈-trans (IP.≈-equiv (length ks)) (from-preserves-≈ {_} {pop (fm₁ ⊔ᵐ fm₂)} {pop fm₁ ⊔ᵐ pop fm₂} (pop-⊔-distr fm₁ fm₂)) ((from-⊔-distr (pop fm₁) (pop fm₂)))
)
to-⊔-distr : {ks : List A} (uks : Unique ks) (ip₁ ip₂ : IterProd (length ks)) to uks (_⊔ⁱᵖ_ {ks} ip₁ ip₂) ≈ᵐ (to uks ip₁ ⊔ᵐ to uks ip₂)
to-⊔-distr {[]} empty tt tt = ((λ k v ()), (λ k v ()))
to-⊔-distr {ks@(k ks')} uks@(push k≢ks' uks') ip₁@(v₁ , rest₁) ip₂@(v₂ , rest₂) = (fm⊆fm₁fm₂ , fm₁fm₂⊆fm)
where
fm₁ = to uks ip₁
fm₁' = to uks' rest₁
fm₂ = to uks ip₂
fm₂' = to uks' rest₂
fm = to uks (_⊔ⁱᵖ_ {k ks'} ip₁ ip₂)
fm⊆fm₁fm₂ : fm ⊆ᵐ (fm₁ ⊔ᵐ fm₂)
fm⊆fm₁fm₂ k v (here refl) =
(v₁ ⊔₂ v₂
, (IsLattice.≈-refl lB
, ⊔-combines {k} {v₁} {v₂} {proj₁ fm₁} {proj₁ fm₂} (here refl) (here refl)
)
)
fm⊆fm₁fm₂ k' v (there k',v∈fm')
with (fm'⊆fm'₁fm'₂ , _) to-⊔-distr uks' rest₁ rest₂
with (v' , (v₁⊔v₂≈v' , k',v'∈fm'₁fm'₂)) fm'⊆fm'₁fm'₂ k' v k',v∈fm'
with (_ , (refl , (v₁∈fm'₁ , v₂∈fm'₂))) Provenance-union fm₁' fm₂' k',v'∈fm'₁fm'₂ =
(v' , (v₁⊔v₂≈v' , ⊔-combines {m₁ = proj₁ fm₁} {m₂ = proj₁ fm₂} (there v₁∈fm'₁) (there v₂∈fm'₂)))
fm₁fm₂⊆fm : (fm₁ ⊔ᵐ fm₂) ⊆ᵐ fm
fm₁fm₂⊆fm k' v k',v∈fm₁fm₂
with (_ , fm'₁fm'₂⊆fm') to-⊔-distr uks' rest₁ rest₂
with (_ , (refl , (v₁∈fm₁ , v₂∈fm₂))) Provenance-union fm₁ fm₂ k',v∈fm₁fm₂
with v₁∈fm₁ | v₂∈fm₂
... | here refl | here refl = (v , (IsLattice.≈-refl lB , here refl))
... | here refl | there k',v₂∈fm₂' = ⊥-elim (All¬-¬Any k≢ks' (subst (λ list k' ∈ˡ list) (proj₂ fm₂') (forget {m = proj₁ fm₂'} k',v₂∈fm₂')))
... | there k',v₁∈fm₁' | here refl = ⊥-elim (All¬-¬Any k≢ks' (subst (λ list k' ∈ˡ list) (proj₂ fm₁') (forget {m = proj₁ fm₁'} k',v₁∈fm₁')))
... | there k',v₁∈fm₁' | there k',v₂∈fm₂' =
let
k',v₁v₂∈fm₁'fm₂' = ⊔-combines {m₁ = proj₁ fm₁'} {m₂ = proj₁ fm₂'} k',v₁∈fm₁' k',v₂∈fm₂'
(v' , (v₁⊔v₂≈v' , v'∈fm')) = fm'₁fm'₂⊆fm' _ _ k',v₁v₂∈fm₁'fm₂'
in
(v' , (v₁⊔v₂≈v' , there v'∈fm'))
module _ {ks : List A} (uks : Unique ks) (≈₂-dec : Decidable _≈₂_) (h₂ : ) (fhB : FixedHeight₂ h₂) where
import Isomorphism
open Isomorphism.TransportFiniteHeight
(IP.isFiniteHeightLattice (length ks) ≈₂-dec ≈ᵘ-dec h₂ 0 fhB fixedHeightᵘ) (isLattice ks)
{f = to uks} {g = from {ks}}
(to-preserves-≈ uks) (from-preserves-≈ {ks})
(to-⊔-distr uks) (from-⊔-distr {ks})
(from-to-inverseʳ uks) (from-to-inverseˡ uks)
using (isFiniteHeightLattice) public

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@ -23,94 +23,97 @@ IterProd k = iterate k (λ t → A × t) B
-- To make iteration more convenient, package the definitions in Lattice
-- records, perform the recursion, and unpackage.
--
module _ where
lattice : {k : } Lattice (IterProd k)
lattice {0} = record
-- If we prove isLattice and isFiniteHeightLattice by induction separately,
-- we lose the connection between the operations (which should be the same)
-- that are built up by the two iterations. So, do everything in one iteration.
-- This requires some odd code.
private
record RequiredForFixedHeight : Set (lsuc a) where
field
≈₁-dec : IsDecidable _≈₁_
≈₂-dec : IsDecidable _≈₂_
h₁ h₂ :
fhA : FixedHeight₁ h₁
fhB : FixedHeight₂ h₂
record IsFiniteHeightAndDecEq {A : Set a} {_≈_ : A A Set a} {_⊔_ : A A A} {_⊓_ : A A A} (isLattice : IsLattice A _≈_ _⊔_ _⊓_) : Set (lsuc a) where
field
height :
fixedHeight : IsLattice.FixedHeight isLattice height
≈-dec : IsDecidable _≈_
record Everything (A : Set a) : Set (lsuc a) where
field
_≈_ : A A Set a
_⊔_ : A A A
_⊓_ : A A A
isLattice : IsLattice A _≈_ _⊔_ _⊓_
isFiniteHeightIfSupported : RequiredForFixedHeight IsFiniteHeightAndDecEq isLattice
everything : (k : ) Everything (IterProd k)
everything 0 = record
{ _≈_ = _≈₂_
; _⊔_ = _⊔₂_
; _⊓_ = _⊓₂_
; isLattice = lB
; isFiniteHeightIfSupported = λ req record
{ height = RequiredForFixedHeight.h₂ req
; fixedHeight = RequiredForFixedHeight.fhB req
; ≈-dec = RequiredForFixedHeight.≈₂-dec req
}
}
lattice {suc k'} = record
{ _≈_ = _≈_
; _⊔_ = _⊔_
; _⊓_ = _⊓_
; isLattice = isLattice
everything (suc k') = record
{ _≈_ = P._≈_
; _⊔_ = P._⊔_
; _⊓_ = P._⊓_
; isLattice = P.isLattice
; isFiniteHeightIfSupported = λ req
let
fhlRest = Everything.isFiniteHeightIfSupported everythingRest req
in
record
{ height = (RequiredForFixedHeight.h₁ req) + IsFiniteHeightAndDecEq.height fhlRest
; fixedHeight =
P.fixedHeight
(RequiredForFixedHeight.≈₁-dec req) (IsFiniteHeightAndDecEq.≈-dec fhlRest)
(RequiredForFixedHeight.h₁ req) (IsFiniteHeightAndDecEq.height fhlRest)
(RequiredForFixedHeight.fhA req) (IsFiniteHeightAndDecEq.fixedHeight fhlRest)
; ≈-dec = P.≈-dec (RequiredForFixedHeight.≈₁-dec req) (IsFiniteHeightAndDecEq.≈-dec fhlRest)
}
}
where
Right : Lattice (IterProd k')
Right = lattice {k'}
everythingRest = everything k'
open import Lattice.Prod
_≈₁_ (Lattice._≈_ Right)
_⊔₁_ (Lattice._⊔_ Right)
_⊓₁_ (Lattice._⊓_ Right)
lA (Lattice.isLattice Right)
import Lattice.Prod
_≈₁_ (Everything._≈_ everythingRest)
_⊔₁_ (Everything._⊔_ everythingRest)
_⊓₁_ (Everything._⊓_ everythingRest)
lA (Everything.isLattice everythingRest) as P
module _ (k : ) where
open Lattice.Lattice (lattice {k}) public
open Everything (everything k) using (_≈_; _⊔_; _⊓_; isLattice) public
open Lattice.IsLattice isLattice public
module _ (≈₁-dec : IsDecidable _≈₁_) (≈₂-dec : IsDecidable _≈₂_)
(h₁ h₂ : )
(fhA : FixedHeight₁ h₁) (fhB : FixedHeight₂ h₂) where
private module _ where
record FiniteHeightAndDecEq (A : Set a) : Set (lsuc a) where
field
height :
_≈_ : A A Set a
_⊔_ : A A A
_⊓_ : A A A
isFiniteHeightLattice : IsFiniteHeightLattice A height _≈_ _⊔_ _⊓_
≈-dec : IsDecidable _≈_
open IsFiniteHeightLattice isFiniteHeightLattice public
finiteHeightAndDec : {k : } FiniteHeightAndDecEq (IterProd k)
finiteHeightAndDec {0} = record
{ height = h₂
; _≈_ = _≈₂_
; _⊔_ = _⊔₂_
; _⊓_ = _⊓₂_
; isFiniteHeightLattice = record
{ isLattice = lB
; fixedHeight = fhB
}
; ≈-dec = ≈₂-dec
}
finiteHeightAndDec {suc k'} = record
{ height = h₁ + FiniteHeightAndDecEq.height Right
; _≈_ = P._≈_
; _⊔_ = P._⊔_
; _⊓_ = P._⊓_
; isFiniteHeightLattice = isFiniteHeightLattice
≈₁-dec (FiniteHeightAndDecEq.≈-dec Right)
h₁ (FiniteHeightAndDecEq.height Right)
fhA (IsFiniteHeightLattice.fixedHeight (FiniteHeightAndDecEq.isFiniteHeightLattice Right))
; ≈-dec = ≈-dec ≈₁-dec (FiniteHeightAndDecEq.≈-dec Right)
}
where
Right = finiteHeightAndDec {k'}
open import Lattice.Prod
_≈₁_ (FiniteHeightAndDecEq._≈_ Right)
_⊔₁_ (FiniteHeightAndDecEq._⊔_ Right)
_⊓₁_ (FiniteHeightAndDecEq._⊓_ Right)
lA (FiniteHeightAndDecEq.isLattice Right) as P
module _ (k : ) where
open FiniteHeightAndDecEq (finiteHeightAndDec {k}) using (isFiniteHeightLattice) public
module _ (≈₁-dec : IsDecidable _≈₁_) (≈₂-dec : IsDecidable _≈₂_)
(h₁ h₂ : )
(fhA : FixedHeight₁ h₁) (fhB : FixedHeight₂ h₂) where
private
FHD = finiteHeightAndDec {k}
required : RequiredForFixedHeight
required = record
{ ≈₁-dec = ≈₁-dec
; ≈₂-dec = ≈₂-dec
; h₁ = h₁
; h₂ = h₂
; fhA = fhA
; fhB = fhB
}
finiteHeightLattice : FiniteHeightLattice (IterProd k)
finiteHeightLattice = record
{ height = FiniteHeightAndDecEq.height FHD
; _≈_ = FiniteHeightAndDecEq._≈_ FHD
; _⊔_ = FiniteHeightAndDecEq._⊔_ FHD
; _⊓_ = FiniteHeightAndDecEq._⊓_ FHD
; isFiniteHeightLattice = isFiniteHeightLattice
isFiniteHeightLattice = record
{ isLattice = isLattice
; fixedHeight = IsFiniteHeightAndDecEq.fixedHeight (Everything.isFiniteHeightIfSupported (everything k) required)
}

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@ -171,18 +171,21 @@ module _ (≈₁-dec : IsDecidable _≈₁_) (≈₂-dec : IsDecidable _≈₂_)
, ≤-stepsˡ 1 (subst (n ≤_) (sym (+-suc n₁ n₂)) (+-monoʳ-≤ 1 n≤n₁+n₂))
))
fixedHeight : IsLattice.FixedHeight isLattice (h₁ + h₂)
fixedHeight =
( ( ((amin , bmin) , (amax , bmax))
, concat
(ChainMapping₁.Chain-map (λ a (a , bmin)) (∙,b-Monotonic _) proj₁ (∙,b-Preserves-≈₁ _) (proj₂ (proj₁ fhA)))
(ChainMapping₂.Chain-map (λ b (amax , b)) (a,∙-Monotonic _) proj₂ (a,∙-Preserves-≈₂ _) (proj₂ (proj₁ fhB)))
)
, λ a₁b₁a₂b₂ let ((n₁ , n₂) , ((a₁a₂ , b₁b₂) , n≤n₁+n₂)) = unzip a₁b₁a₂b₂
in ≤-trans n≤n₁+n₂ (+-mono-≤ (proj₂ fhA a₁a₂) (proj₂ fhB b₁b₂))
)
isFiniteHeightLattice : IsFiniteHeightLattice (A × B) (h₁ + h₂) _≈_ _⊔_ _⊓_
isFiniteHeightLattice = record
{ isLattice = isLattice
; fixedHeight =
( ( ((amin , bmin) , (amax , bmax))
, concat
(ChainMapping₁.Chain-map (λ a (a , bmin)) (∙,b-Monotonic _) proj₁ (∙,b-Preserves-≈₁ _) (proj₂ (proj₁ fhA)))
(ChainMapping₂.Chain-map (λ b (amax , b)) (a,∙-Monotonic _) proj₂ (a,∙-Preserves-≈₂ _) (proj₂ (proj₁ fhB)))
)
, λ a₁b₁a₂b₂ let ((n₁ , n₂) , ((a₁a₂ , b₁b₂) , n≤n₁+n₂)) = unzip a₁b₁a₂b₂
in ≤-trans n≤n₁+n₂ (+-mono-≤ (proj₂ fhA a₁a₂) (proj₂ fhB b₁b₂))
)
; fixedHeight = fixedHeight
}
finiteHeightLattice : FiniteHeightLattice (A × B)

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@ -107,10 +107,13 @@ private
isLongest {tt} {tt} (step (tt⊔tt≈tt , tt̷≈tt) _ _) = ⊥-elim (tt̷≈tt refl)
isLongest (done _) = z≤n
fixedHeight : IsLattice.FixedHeight isLattice 0
fixedHeight = (((tt , tt) , longestChain) , isLongest)
isFiniteHeightLattice : IsFiniteHeightLattice 0 _≈_ _⊔_ _⊓_
isFiniteHeightLattice = record
{ isLattice = isLattice
; fixedHeight = (((tt , tt) , longestChain) , isLongest)
; fixedHeight = fixedHeight
}
finiteHeightLattice : FiniteHeightLattice

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@ -32,6 +32,10 @@ All¬-¬Any : ∀ {p c} {C : Set c} {P : C → Set p} {l : List C} → All (λ x
All¬-¬Any {l = x xs} (¬Px _) (here Px) = ¬Px Px
All¬-¬Any {l = x xs} (_ ¬Pxs) (there Pxs) = All¬-¬Any ¬Pxs Pxs
All-single : {p c} {C : Set c} {P : C Set p} {c : C} {l : List C} All P l c l P c
All-single {c = c} {l = x xs} (p ps) (here refl) = p
All-single {c = c} {l = x xs} (p ps) (there c∈xs) = All-single ps c∈xs
All-x∈xs : {a} {A : Set a} (xs : List A) All (λ x x xs) xs
All-x∈xs [] = []
All-x∈xs (x xs') = here refl map there (All-x∈xs xs')