open import list open import basic open import Level open import Relation.Binary.PropositionalEquality open ≡-Reasoning module delta where data Delta {l : Level} (A : Set l) : (Set (suc l)) where mono : A -> Delta A delta : A -> Delta A -> Delta A deltaAppend : {l : Level} {A : Set l} -> Delta A -> Delta A -> Delta A deltaAppend (mono x) d = delta x d deltaAppend (delta x d) ds = delta x (deltaAppend d ds) headDelta : {l : Level} {A : Set l} -> Delta A -> Delta A headDelta (mono x) = mono x headDelta (delta x _) = mono x tailDelta : {l : Level} {A : Set l} -> Delta A -> Delta A tailDelta (mono x) = mono x tailDelta (delta _ d) = d -- Functor fmap : {l ll : Level} {A : Set l} {B : Set ll} -> (A -> B) -> (Delta A) -> (Delta B) fmap f (mono x) = mono (f x) fmap f (delta x d) = delta (f x) (fmap f d) -- Monad (Category) eta : {l : Level} {A : Set l} -> A -> Delta A eta x = mono x bind : {l ll : Level} {A : Set l} {B : Set ll} -> (Delta A) -> (A -> Delta B) -> Delta B bind (mono x) f = f x bind (delta x d) f = deltaAppend (headDelta (f x)) (bind d (tailDelta ∙ f)) mu : {l : Level} {A : Set l} -> Delta (Delta A) -> Delta A mu d = bind d id returnS : {l : Level} {A : Set l} -> A -> Delta A returnS x = mono x returnSS : {l : Level} {A : Set l} -> A -> A -> Delta A returnSS x y = deltaAppend (returnS x) (returnS y) -- Monad (Haskell) return : {l : Level} {A : Set l} -> A -> Delta A return = eta _>>=_ : {l ll : Level} {A : Set l} {B : Set ll} -> (x : Delta A) -> (f : A -> (Delta B)) -> (Delta B) (mono x) >>= f = f x (delta x d) >>= f = deltaAppend (headDelta (f x)) (d >>= (tailDelta ∙ f)) -- proofs -- sub proofs head-delta-natural-transformation : {l ll : Level} {A : Set l} {B : Set ll} -> (f : A -> B) (d : Delta A) -> (headDelta (fmap f d)) ≡ fmap f (headDelta d) head-delta-natural-transformation f (mono x) = refl head-delta-natural-transformation f (delta x d) = refl tail-delta-natural-transfomation : {l ll : Level} {A : Set l} {B : Set ll} -> (f : A -> B) (d : Delta A) -> (tailDelta (fmap f d)) ≡ fmap f (tailDelta d) tail-delta-natural-transfomation f (mono x) = refl tail-delta-natural-transfomation f (delta x d) = refl delta-append-natural-transfomation : {l ll : Level} {A : Set l} {B : Set ll} -> (f : A -> B) (d : Delta A) (dd : Delta A) -> deltaAppend (fmap f d) (fmap f dd) ≡ fmap f (deltaAppend d dd) delta-append-natural-transfomation f (mono x) dd = refl delta-append-natural-transfomation f (delta x d) dd = begin deltaAppend (fmap f (delta x d)) (fmap f dd) ≡⟨ refl ⟩ deltaAppend (delta (f x) (fmap f d)) (fmap f dd) ≡⟨ refl ⟩ delta (f x) (deltaAppend (fmap f d) (fmap f dd)) ≡⟨ cong (\d -> delta (f x) d) (delta-append-natural-transfomation f d dd) ⟩ delta (f x) (fmap f (deltaAppend d dd)) ≡⟨ refl ⟩ fmap f (deltaAppend (delta x d) dd) ∎ {- mu-head-delta : {l : Level} {A : Set l} -> (d : Delta (Delta A)) -> mu (headDelta d) ≡ headDelta (mu d) mu-head-delta (mono (mono x)) = refl mu-head-delta (mono (delta x (mono xx))) = begin mu (headDelta (mono (delta x (mono xx)))) ≡⟨ refl ⟩ bind (headDelta (mono (delta x (mono xx)))) id ≡⟨ refl ⟩ bind (delta x (mono xx)) return ≡⟨ refl ⟩ deltaAppend (headDelta (return x)) (bind (mono xx) (tailDelta ∙ return)) ≡⟨ refl ⟩ deltaAppend (headDelta (return x)) ((tailDelta ∙ return) xx) ≡⟨ refl ⟩ deltaAppend (headDelta (mono x)) (tailDelta (mono xx)) ≡⟨ refl ⟩ deltaAppend (mono x) (mono xx) ≡⟨ refl ⟩ delta x (mono xx) ≡⟨ {!!} ⟩ headDelta (delta x (mono xx)) ≡⟨ refl ⟩ headDelta (bind (mono (delta x (mono xx))) id) ≡⟨ refl ⟩ headDelta (mu (mono (delta x (mono xx)))) ∎ mu-head-delta (mono (delta x (delta x₁ d))) = {!!} mu-head-delta (delta d dd) = {!!} -} -- Functor-laws -- Functor-law-1 : T(id) = id' functor-law-1 : {l : Level} {A : Set l} -> (d : Delta A) -> (fmap id) d ≡ id d functor-law-1 (mono x) = refl functor-law-1 (delta x d) = cong (delta x) (functor-law-1 d) -- Functor-law-2 : T(f . g) = T(f) . T(g) functor-law-2 : {l ll lll : Level} {A : Set l} {B : Set ll} {C : Set lll} -> (f : B -> C) -> (g : A -> B) -> (d : Delta A) -> (fmap (f ∙ g)) d ≡ ((fmap f) ∙ (fmap g)) d functor-law-2 f g (mono x) = refl functor-law-2 f g (delta x d) = cong (delta (f (g x))) (functor-law-2 f g d) -- Monad-laws (Category) monad-law-1-4 : {l : Level} {A : Set l} -> (ds : Delta (Delta A)) -> tailDelta (bind ds (tailDelta ∙ id)) ≡ bind (tailDelta ds) (tailDelta ∙ tailDelta) monad-law-1-4 (mono ds) = refl monad-law-1-4 (delta (mono x) ds₁) = refl monad-law-1-4 (delta (delta x (mono x₁)) ds₁) = refl monad-law-1-4 (delta (delta x (delta x₁ ds)) ds₁) = refl monad-law-1-3 : {l : Level} {A : Set l} -> (ds : Delta (Delta A)) -> tailDelta (bind ds tailDelta) ≡ bind (tailDelta ds) (tailDelta ∙ tailDelta) monad-law-1-3 (mono ds) = refl monad-law-1-3 (delta (mono x) ds) = refl monad-law-1-3 (delta (delta x (mono x₁)) ds) = refl monad-law-1-3 (delta (delta x (delta x₁ d)) ds) = refl monad-law-1-sub-sub : {l : Level} {A : Set l} -> (d : Delta (Delta (Delta A))) -> bind (fmap mu d) (tailDelta ∙ tailDelta) ≡ bind (bind d (tailDelta ∙ tailDelta)) (tailDelta ∙ tailDelta) monad-law-1-sub-sub (mono (mono d)) = refl monad-law-1-sub-sub (mono (delta (mono x) ds)) = begin bind (fmap mu (mono (delta (mono x) ds))) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind (mono (mu (delta (mono x) ds))) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind (mono (bind (delta (mono x) ds) id)) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind (mono (deltaAppend (headDelta (mono x)) (bind ds tailDelta))) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind (mono (deltaAppend (mono x) (bind ds tailDelta))) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind (mono (delta x (bind ds tailDelta))) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ (tailDelta ∙ tailDelta) (delta x (bind ds tailDelta)) ≡⟨ refl ⟩ tailDelta (bind ds tailDelta) ≡⟨ monad-law-1-3 ds ⟩ -- ? bind (tailDelta ds) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind ((tailDelta ∙ tailDelta) (delta (mono x) ds)) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind (bind (mono (delta (mono x) ds)) (tailDelta ∙ tailDelta)) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind (bind (headDelta (tailDelta (mono (delta (mono x) ds)))) (tailDelta ∙ tailDelta)) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind (bind (mono (delta (mono x) ds)) (tailDelta ∙ tailDelta)) (tailDelta ∙ tailDelta) ∎ monad-law-1-sub-sub (mono (delta (delta x (mono x₁)) ds)) = begin bind (fmap mu (mono (delta (delta x (mono x₁)) ds))) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind (mono (mu (delta (delta x (mono x₁)) ds))) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ (tailDelta ∙ tailDelta) (mu (delta (delta x (mono x₁)) ds)) ≡⟨ refl ⟩ (tailDelta ∙ tailDelta) (bind (delta (delta x (mono x₁)) ds) id) ≡⟨ refl ⟩ (tailDelta ∙ tailDelta) (deltaAppend (headDelta (delta x (mono x₁))) (bind ds (tailDelta ∙ id))) ≡⟨ refl ⟩ (tailDelta ∙ tailDelta) (deltaAppend (mono x) (bind ds (tailDelta ∙ id))) ≡⟨ refl ⟩ (tailDelta ∙ tailDelta) (delta x (bind ds (tailDelta ∙ id))) ≡⟨ refl ⟩ tailDelta (bind ds (tailDelta ∙ id)) ≡⟨ monad-law-1-4 ds ⟩ bind (tailDelta ds) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind ((tailDelta ∙ tailDelta) (delta (delta x (mono x₁)) ds)) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind (bind (mono (delta (delta x (mono x₁)) ds)) (tailDelta ∙ tailDelta)) (tailDelta ∙ tailDelta) ∎ monad-law-1-sub-sub (mono (delta (delta x (delta xx d)) ds)) = begin bind (fmap mu (mono (delta (delta x (delta xx d)) ds))) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ bind (mono (mu (delta (delta x (delta xx d)) ds))) (tailDelta ∙ tailDelta) ≡⟨ refl ⟩ (tailDelta ∙ tailDelta) (mu (delta (delta x (delta xx d)) ds)) ≡⟨ {!!} ⟩ -- ? bind (bind (mono (delta (delta x (delta xx d)) ds)) (tailDelta ∙ tailDelta)) (tailDelta ∙ tailDelta) ∎ monad-law-1-sub-sub (delta d ds) = {!!} monad-law-1-sub : {l : Level } {A : Set l} -> (x : Delta (Delta A)) -> (d : Delta (Delta (Delta A))) -> deltaAppend (headDelta (mu x)) (bind (fmap mu d) tailDelta) ≡ mu (deltaAppend (headDelta x) (bind d tailDelta)) monad-law-1-sub (mono (mono _)) (mono (mono _)) = refl monad-law-1-sub (mono (mono _)) (mono (delta (mono _) _)) = refl monad-law-1-sub (mono (mono _)) (mono (delta (delta _ _) _)) = refl monad-law-1-sub (mono (mono x)) (delta (mono (mono xx)) d) = begin deltaAppend (headDelta (mu (mono (mono x)))) (bind (fmap mu (delta (mono (mono xx)) d)) tailDelta) ≡⟨ refl ⟩ deltaAppend (headDelta (mu (mono (mono x)))) (bind (delta (mu (mono (mono xx))) (fmap mu d)) tailDelta) ≡⟨ refl ⟩ deltaAppend (headDelta (bind (mono (mono x)) id)) (bind (delta (mu (mono (mono xx))) (fmap mu d)) tailDelta) ≡⟨ refl ⟩ deltaAppend (headDelta (mono x)) (bind (delta (mu (mono (mono xx))) (fmap mu d)) tailDelta) ≡⟨ refl ⟩ deltaAppend (headDelta (mono x)) (bind (delta (mono xx) (fmap mu d)) tailDelta) ≡⟨ refl ⟩ deltaAppend (mono x) (bind (delta (mono xx) (fmap mu d)) tailDelta) ≡⟨ refl ⟩ deltaAppend (mono x) (bind (delta (mono xx) (fmap mu d)) tailDelta) ≡⟨ refl ⟩ deltaAppend (mono x) (deltaAppend (tailDelta (mono xx)) (bind (fmap mu d) (tailDelta ∙ tailDelta))) ≡⟨ refl ⟩ deltaAppend (mono x) (deltaAppend (mono xx) (bind (fmap mu d) (tailDelta ∙ tailDelta))) ≡⟨ refl ⟩ deltaAppend (mono x) (deltaAppend (mu (mono (mono xx))) (bind (fmap mu d) (tailDelta ∙ tailDelta))) ≡⟨ refl ⟩ deltaAppend (mono x) (deltaAppend (mono xx) (bind (fmap mu d) (tailDelta ∙ tailDelta))) ≡⟨ refl ⟩ delta x (deltaAppend (mono xx) (bind (fmap mu d) (tailDelta ∙ tailDelta))) ≡⟨ refl ⟩ delta x (delta xx (bind (fmap mu d) (tailDelta ∙ tailDelta))) ≡⟨ cong (\d -> (delta x (delta xx d))) (monad-law-1-sub-sub d) ⟩ -- ??? delta x (delta xx (bind (bind d (tailDelta ∙ tailDelta)) (tailDelta ∙ tailDelta))) ≡⟨ refl ⟩ delta x ((deltaAppend (mono xx) (bind (bind d (tailDelta ∙ tailDelta)) (tailDelta ∙ tailDelta)))) ≡⟨ refl ⟩ delta x ((deltaAppend (tailDelta (mono xx)) (bind (bind d (tailDelta ∙ tailDelta)) (tailDelta ∙ tailDelta)))) ≡⟨ refl ⟩ delta x (bind (delta (mono xx) (bind d (tailDelta ∙ tailDelta))) tailDelta) ≡⟨ refl ⟩ delta x (bind (deltaAppend (mono (mono xx)) (bind d (tailDelta ∙ tailDelta))) tailDelta) ≡⟨ refl ⟩ delta x (bind (deltaAppend (headDelta (tailDelta (mono (mono xx)))) (bind d (tailDelta ∙ tailDelta))) tailDelta) ≡⟨ refl ⟩ delta x (bind (bind (delta (mono (mono xx)) d) tailDelta) tailDelta) ≡⟨ refl ⟩ deltaAppend (mono x) (bind (bind (delta (mono (mono xx)) d) tailDelta) tailDelta) ≡⟨ refl ⟩ bind (delta (mono x) (bind (delta (mono (mono xx)) d) tailDelta)) id ≡⟨ refl ⟩ mu (delta (mono x) (bind (delta (mono (mono xx)) d) tailDelta)) ≡⟨ refl ⟩ mu (deltaAppend (mono (mono x)) (bind (delta (mono (mono xx)) d) tailDelta)) ≡⟨ refl ⟩ mu (deltaAppend (headDelta (mono (mono x))) (bind (delta (mono (mono xx)) d) tailDelta)) ∎ monad-law-1-sub (mono (mono x)) (delta (mono (delta x₁ d)) d₁) = {!!} monad-law-1-sub (mono (mono x)) (delta (delta d d₁) d₂) = {!!} monad-law-1-sub (mono (delta x x₁)) d = {!!} monad-law-1-sub (delta x x₁) d = {!!} -- monad-law-1 : join . fmap join = join . join monad-law-1 : {l : Level} {A : Set l} -> (d : Delta (Delta (Delta A))) -> ((mu ∙ (fmap mu)) d) ≡ ((mu ∙ mu) d) monad-law-1 (mono d) = refl monad-law-1 (delta x d) = begin (mu ∙ (fmap mu)) (delta x d) ≡⟨ refl ⟩ mu (fmap mu (delta x d)) ≡⟨ refl ⟩ mu (delta (mu x) (fmap mu d)) ≡⟨ refl ⟩ bind (delta (mu x) (fmap mu d)) id ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) (bind (fmap mu d) tailDelta) ≡⟨ monad-law-1-sub x d ⟩ mu (deltaAppend (headDelta x) (bind d tailDelta)) ≡⟨ refl ⟩ mu (bind (delta x d) id) ≡⟨ refl ⟩ mu (mu (delta x d)) ≡⟨ refl ⟩ (mu ∙ mu) (delta x d) ∎ -- split d {- monad-law-1 (delta x (mono d)) = begin (mu ∙ fmap mu) (delta x (mono d)) ≡⟨ refl ⟩ mu (fmap mu (delta x (mono d))) ≡⟨ refl ⟩ mu (delta (mu x) (mono (mu d))) ≡⟨ refl ⟩ bind (delta (mu x) (mono (mu d))) id ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) (bind (mono (mu d)) tailDelta) ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) (tailDelta (mu d)) ≡⟨ {!!} ⟩ mu (deltaAppend (headDelta x) (tailDelta d)) ≡⟨ refl ⟩ mu (deltaAppend (headDelta x) (tailDelta (id d))) ≡⟨ refl ⟩ mu (deltaAppend (headDelta x) ((tailDelta ∙ id) d)) ≡⟨ refl ⟩ mu (deltaAppend (headDelta x) (bind (mono d) (tailDelta ∙ id))) ≡⟨ refl ⟩ mu (bind (delta x (mono d)) id) ≡⟨ refl ⟩ mu (mu (delta x (mono d))) ≡⟨ refl ⟩ (mu ∙ mu) (delta x (mono d)) ∎ monad-law-1 (delta x (delta d ds)) = begin (mu ∙ fmap mu) (delta x (delta d ds)) ≡⟨ refl ⟩ mu (fmap mu (delta x (delta d ds))) ≡⟨ refl ⟩ mu (delta (mu x) (delta (mu d) (fmap mu ds))) ≡⟨ refl ⟩ bind (delta (mu x) (delta (mu d) (fmap mu ds))) id ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) (bind (delta (mu d) (fmap mu ds)) tailDelta) ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) (deltaAppend (headDelta (tailDelta (mu d))) (bind (fmap mu ds) (tailDelta ∙ tailDelta))) ≡⟨ {!!} ⟩ (mu ∙ mu) (delta x (delta d ds)) ∎ -} {- monad-law-1 : {l : Level} {A : Set l} -> (d : Delta (Delta (Delta A))) -> ((mu ∙ (fmap mu)) d) ≡ ((mu ∙ mu) d) monad-law-1 (mono d) = refl monad-law-1 (delta x (mono d)) = begin (mu ∙ fmap mu) (delta x (mono d)) ≡⟨ refl ⟩ mu ((fmap mu) (delta x (mono d))) ≡⟨ refl ⟩ mu (delta (mu x) (fmap mu (mono d))) ≡⟨ refl ⟩ mu (delta (mu x) (fmap mu (mono d))) ≡⟨ refl ⟩ mu (delta (mu x) (mono (mu d))) ≡⟨ refl ⟩ bind (delta (mu x) (mono (mu d))) id ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) (bind (mono (mu d)) (tailDelta ∙ id)) ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) (bind (mono (mu d)) (tailDelta)) ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) (tailDelta (mu d)) ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) ((tailDelta ∙ mu) d) ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) (bind (mono d) (tailDelta ∙ mu)) ≡⟨ refl ⟩ bind (delta x (mono d)) mu ≡⟨ {!!} ⟩ mu (deltaAppend (headDelta x) (tailDelta d)) ≡⟨ refl ⟩ mu (deltaAppend (headDelta x) (bind (mono d) tailDelta)) ≡⟨ refl ⟩ mu (deltaAppend (headDelta (id x)) (bind (mono d) (tailDelta ∙ id))) ≡⟨ refl ⟩ mu (deltaAppend (headDelta x) (bind (mono d) (tailDelta ∙ id))) ≡⟨ refl ⟩ mu (bind (delta x (mono d)) id) ≡⟨ refl ⟩ mu (deltaAppend (headDelta (id x)) (bind (mono d) (tailDelta ∙ id))) ≡⟨ refl ⟩ mu (mu (delta x (mono d))) ≡⟨ refl ⟩ (mu ∙ mu) (delta x (mono d)) ∎ monad-law-1 (delta x (delta xx d)) = {!!} monad-law-1 (delta x d) = begin (mu ∙ fmap mu) (delta x d) ≡⟨ refl ⟩ mu ((fmap mu) (delta x d)) ≡⟨ refl ⟩ mu (delta (mu x) (fmap mu d)) ≡⟨ refl ⟩ bind (delta (mu x) (fmap mu d)) id ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) (bind (fmap mu d) (tailDelta ∙ id)) ≡⟨ refl ⟩ deltaAppend (headDelta (mu x)) (bind (fmap mu d) (tailDelta ∙ id)) ≡⟨ {!!} ⟩ (mu ∙ mu) (delta x d) ∎ -- monad-law-2-2 : join . return = id monad-law-2-2 : {l : Level} {A : Set l } -> (s : Delta A) -> (mu ∙ eta) s ≡ id s monad-law-2-2 (similar lx x ly y) = refl -- monad-law-3 : return . f = fmap f . return monad-law-3 : {l : Level} {A B : Set l} (f : A -> B) (x : A) -> (eta ∙ f) x ≡ (fmap f ∙ eta) x monad-law-3 f x = refl -- monad-law-4 : join . fmap (fmap f) = fmap f . join monad-law-4 : {l ll : Level} {A : Set l} {B : Set ll} (f : A -> B) (s : Delta (Delta A)) -> (mu ∙ fmap (fmap f)) s ≡ (fmap f ∙ mu) s monad-law-4 f (similar lx (similar llx x _ _) ly (similar _ _ lly y)) = refl -- Monad-laws (Haskell) -- monad-law-h-1 : return a >>= k = k a monad-law-h-1 : {l ll : Level} {A : Set l} {B : Set ll} -> (a : A) -> (k : A -> (Delta B)) -> (return a >>= k) ≡ (k a) monad-law-h-1 a k = refl -- monad-law-h-2 : m >>= return = m monad-law-h-2 : {l : Level}{A : Set l} -> (m : Delta A) -> (m >>= return) ≡ m monad-law-h-2 (mono x) = refl monad-law-h-2 (delta x d) = cong (delta x) (monad-law-h-2 d) -- monad-law-h-3 : m >>= (\x -> k x >>= h) = (m >>= k) >>= h monad-law-h-3 : {l ll lll : Level} {A : Set l} {B : Set ll} {C : Set lll} -> (m : Delta A) -> (k : A -> (Delta B)) -> (h : B -> (Delta C)) -> (m >>= (\x -> k x >>= h)) ≡ ((m >>= k) >>= h) monad-law-h-3 (mono x) k h = refl monad-law-h-3 (delta x d) k h = begin (delta x d) >>= (\x -> k x >>= h) ≡⟨ refl ⟩ -- (delta x d) >>= f = deltaAppend (headDelta (f x)) (d >>= (tailDelta ∙ f)) deltaAppend (headDelta ((\x -> k x >>= h) x)) (d >>= (tailDelta ∙ (\x -> k x >>= h))) ≡⟨ refl ⟩ deltaAppend (headDelta (k x >>= h)) (d >>= (tailDelta ∙ (\x -> k x >>= h))) ≡⟨ {!!} ⟩ ((delta x d) >>= k) >>= h ∎ -}