Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I was proving some properties of filter and map, everything went quite good until I stumbled on this property: filter p (map f xs) ≡ map f (filter (p ∘ f) xs). Here's a part of the code that's relevant:

open import Relation.Binary.PropositionalEquality
open import Data.Bool
open import Data.List hiding (filter)

import Level

filter : ∀ {a} {A : Set a} → (A → Bool) → List A → List A
filter _ [] = []
filter p (x ∷ xs) with p x
... | true  = x ∷ filter p xs
... | false = filter p xs

Now, because I love writing proofs using the ≡-Reasoning module, the first thing I tried was:

open ≡-Reasoning
open import Function

filter-map : ∀ {a b} {A : Set a} {B : Set b}
             (xs : List A) (f : A → B) (p : B → Bool) →
             filter p (map f xs) ≡ map f (filter (p ∘ f) xs)
filter-map []       _ _ = refl
filter-map (x ∷ xs) f p with p (f x)
... | true = begin
  filter p (map f (x ∷ xs))
    ≡⟨ refl ⟩
  f x ∷ filter p (map f xs)
--  ...

But alas, that didn't work. After trying for one hour, I finally gave up and proved it in this way:

filter-map (x ∷ xs) f p with p (f x)
... | true  = cong (λ a → f x ∷ a) (filter-map xs f p)
... | false = filter-map xs f p

Still curious about why going through ≡-Reasoning didn't work, I tried something very trivial:

filter-map-def : ∀ {a b} {A : Set a} {B : Set b}
                 (x : A) xs (f : A → B) (p : B → Bool) → T (p (f x)) →
                 filter p (map f (x ∷ xs)) ≡ f x ∷ filter p (map f xs)
filter-map-def x xs f p _  with p (f x)
filter-map-def x xs f p () | false
filter-map-def x xs f p _  | true = -- not writing refl on purpose
  begin
    filter p (map f (x ∷ xs))
  ≡⟨ refl ⟩
    f x ∷ filter p (map f xs)
  ∎

But typechecker doesn't agree with me. It would seem that the current goal remains filter p (f x ∷ map f xs) | p (f x) and even though I pattern matched on p (f x), filter just won't reduce to f x ∷ filter p (map f xs).

Is there a way to make this work with ≡-Reasoning?

Thanks!

share|improve this question
    
revisiting a similar issue : so "inspect on steroid" or "rewrite" are the blessed way ? –  nicolas Dec 28 '14 at 20:38
    
@nicolas: I think they are in fact the only way (don't forget that rewrite is just a with). –  Vitus Dec 29 '14 at 3:58
    
thank you. for reference to future interested readers, I found those videos which have been quite informative by chris jenkins : youtube.com/channel/UCC84u-u6xRFQQd6wu33NfDw –  nicolas Dec 29 '14 at 14:18

1 Answer 1

The trouble with with-clauses is that Agda forgets the information it learned from pattern match unless you arrange beforehand for this information to be preserved.

More precisely, when Agda sees a with expression clause, it replaces all the occurences of expression in the current context and goal with a fresh variable w and then gives you that variable with updated context and goal into the with-clause, forgetting everything about its origin.

In your case, you write filter p (map f (x ∷ xs)) inside the with-block, so it goes into scope after Agda has performed the rewriting, so Agda has already forgotten the fact that p (f x) is true and does not reduce the term.

You can preserve the proof of equality by using one of the "Inspect"-patterns from the standard library, but I'm not sure how it can be useful in your case.

share|improve this answer
    
Well, yes, that's what I suspected. inspect was the first thing that came to my mind but it somehow doesn't seem to fit anywhere. Thanks for answering! –  Vitus Apr 30 '12 at 17:50

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.