Mercurial > hg > Members > atton > similar_monad
view agda/similar.agda @ 28:6e6d646d7722
Split basic functions to file
| author | Yasutaka Higa <e115763@ie.u-ryukyu.ac.jp> |
|---|---|
| date | Tue, 07 Oct 2014 14:55:40 +0900 |
| parents | 742e62fc63e4 |
| children | e0ba1bf564dd |
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open import list open import basic open import Relation.Binary.PropositionalEquality open ≡-Reasoning module similar where data Similar (A : Set) : Set where similar : List String -> A -> List String -> A -> Similar A fmap : {A B : Set} -> (A -> B) -> (Similar A) -> (Similar B) fmap f (similar xs x ys y) = similar xs (f x) ys (f y) mu : {A : Set} -> Similar (Similar A) -> Similar A mu (similar lx (similar llx x _ _) ly (similar _ _ lly y)) = similar (lx ++ llx) x (ly ++ lly) y return : {A : Set} -> A -> Similar A return x = similar [] x [] x returnS : {A : Set} -> A -> Similar A returnS x = similar [[ (show x) ]] x [[ (show x) ]] x returnSS : {A : Set} -> A -> A -> Similar A returnSS x y = similar [[ (show x) ]] x [[ (show y) ]] y monad-law-1 : mu ∙ (fmap mu) ≡ mu ∙ mu monad-law-1 = {!!} --monad-law-2 : mu ∙ fmap return ≡ mu ∙ return ≡id monad-law-2-1 : mu ∙ fmap return ≡ mu ∙ return monad-law-2-1 = {!!} monad-law-2-2 : mu ∙ return ≡ id monad-law-2-2 = {!!} monad-law-3 : ∀{f} -> return ∙ f ≡ fmap f ∙ return monad-law-3 = {!!} monad-law-4 : ∀{f} -> mu ∙ fmap (fmap f) ≡ fmap f ∙ mu monad-law-4 = {!!}