view list-nat.agda @ 648:10f2057c8bff

use module
author Shinji KONO <kono@ie.u-ryukyu.ac.jp>
date Tue, 04 Jul 2017 10:16:07 +0900
parents 92eb707498c7
children
line wrap: on
line source

module list-nat where
                                                                        
open import Level


postulate A : Set

postulate a : A
postulate b : A
postulate c : A


infixr 40 _::_
data  List  (A : Set ) : Set  where
   [] : List A
   _::_ : A → List A → List A


infixl 30 _++_
_++_ :   {A : Set } → List A → List A → List A
[]        ++ ys = ys
(x :: xs) ++ ys = x :: (xs ++ ys)

l1 = a :: []
l2 = a :: b :: a :: c ::  []

l3 = l1 ++ l2

data Node  ( A : Set  ) : Set  where
   leaf  : A → Node A
   node  : Node A → Node A → Node A

flatten :  { A : Set } → Node A → List A
flatten ( leaf a )   = a :: []
flatten ( node a b ) = flatten a ++ flatten b

n1 = node ( leaf a ) ( node ( leaf b ) ( leaf c ))

open  import  Relation.Binary.PropositionalEquality

infixr 20  _==_

data _==_  {A : Set } :  List A → List A → Set  where
      reflection  : {x : List A} → x == x

cong1 :  {A : Set  }  { B : Set  } →
   ( f : List A → List B ) → {x : List A } → {y : List A} → x == y → f x == f y
cong1 f reflection = reflection

eq-cons :   {A : Set } {x y : List A} ( a : A ) → x ==  y → ( a :: x ) == ( a :: y )
eq-cons a z = cong1 ( λ x → ( a :: x) ) z

trans-list :   {A : Set } {x y z : List A}  → x ==  y → y == z → x == z
trans-list reflection reflection = reflection


==-to-≡ :   {A : Set }  {x y : List A}  → x ==  y → x ≡ y
==-to-≡ reflection = refl

list-id-l : { A : Set } → { x : List A} →  [] ++ x == x
list-id-l = reflection

list-id-r : { A : Set } → ( x : List A ) →  x ++ [] == x
list-id-r [] =   reflection
list-id-r (x :: xs) =  eq-cons x ( list-id-r xs )

list-assoc : {A : Set } → ( xs ys zs : List A ) →
     ( ( xs ++ ys ) ++ zs ) == ( xs ++ ( ys ++ zs ) )
list-assoc  [] ys zs = reflection
list-assoc  (x :: xs)  ys zs = eq-cons x ( list-assoc xs ys zs )


module ==-Reasoning  (A : Set  ) where

  infix  3 _∎
  infixr 2 _==⟨_⟩_ _==⟨⟩_
  infix  1 begin_


  data _IsRelatedTo_ (x y : List A) :
                     Set  where
    relTo : (x≈y : x  == y  ) → x IsRelatedTo y

  begin_ : {x : List A } {y : List A} →
           x IsRelatedTo y →  x ==  y 
  begin relTo x≈y = x≈y

  _==⟨_⟩_ : (x : List A ) {y z : List A} →
            x == y  → y IsRelatedTo z → x IsRelatedTo z
  _ ==⟨ x≈y ⟩ relTo y≈z = relTo (trans-list x≈y y≈z)

  _==⟨⟩_ : (x : List A ) {y : List A} 
            → x IsRelatedTo y → x IsRelatedTo y
  _ ==⟨⟩ x≈y = x≈y

  _∎ : (x : List A ) → x IsRelatedTo x
  _∎ _ = relTo reflection

lemma11 :  (A : Set ) ( x : List A ) → x == x
lemma11 A x =  let open ==-Reasoning A in
     begin x ∎
      

++-assoc :  (L : Set ) ( xs ys zs : List L ) → (xs ++ ys) ++ zs  == xs ++ (ys ++ zs)
++-assoc A [] ys zs = let open ==-Reasoning A in
  begin -- to prove ([] ++ ys) ++ zs  == [] ++ (ys ++ zs)
   ( [] ++ ys ) ++ zs
  ==⟨ reflection ⟩
    ys ++ zs
  ==⟨ reflection ⟩
    [] ++ ( ys ++ zs )

  
++-assoc A (x :: xs) ys zs = let open  ==-Reasoning A in
  begin -- to prove ((x :: xs) ++ ys) ++ zs == (x :: xs) ++ (ys ++ zs)
    ((x :: xs) ++ ys) ++ zs
  ==⟨ reflection ⟩
     (x :: (xs ++ ys)) ++ zs
  ==⟨ reflection ⟩
    x :: ((xs ++ ys) ++ zs)
  ==⟨ cong1 (_::_ x) (++-assoc A xs ys zs) ⟩ 
    x :: (xs ++ (ys ++ zs))
  ==⟨ reflection ⟩
    (x :: xs) ++ (ys ++ zs)




--data Bool : Set where
--      true  : Bool
--      false : Bool


--postulate Obj : Set

--postulate Hom : Obj → Obj → Set


--postulate  id : { a : Obj } → Hom a a


--infixr 80 _○_
--postulate  _○_ : { a b c  : Obj } → Hom b c → Hom a b → Hom a c

-- postulate  axId1 : {a  b : Obj} → ( f : Hom a b ) → f == id ○ f
-- postulate  axId2 : {a  b : Obj} → ( f : Hom a b ) → f == f ○ id

--assoc : { a b c d : Obj } →
--    (f : Hom c d ) → (g : Hom b c) → (h : Hom a b) →
--    (f ○ g) ○ h == f ○ ( g ○ h)


--a = Set

-- ListObj : {A : Set} → List A
-- ListObj =  List Set

-- ListHom : ListObj → ListObj → Set