[Agda] Wrong reporting error ? (Was question on `compare')
Andrés Sicard-Ramírez
asr at eafit.edu.co
Wed Feb 11 17:42:21 CET 2015
Thanks for the explanation!
On 11 February 2015 at 10:50, Andreas Abel <andreas.abel at ifi.lmu.de> wrote:
> Ah, I think it is because type information is not propagated optimally
> into an extended lambda (in this case at least).
>
> It infers the wrong result type (m \leq n) from the clause rhs (\leqrefl
> m=n) and then fails when checking the subsequent clauses.
>
> In particular as case_of_ has type _A -> (_A -> _B) -> _B and the
> arguments are checked before unifying _B with the expected return type (n
> \leq m), result type _B is actually inferred from the clause rhss.
>
> This explains the puzzle.
>
> Andreas
>
>
>
> On 11.02.2015 16:43, Andreas Abel wrote:
>
>> Yes, the error location is wrong when clause tri> comes before
>> tri\approx (otherwise it is correct). Weird.
>>
>> On 11.02.2015 14:18, Andrés Sicard-Ramírez wrote:
>>
>>>
>>> On 11 February 2015 at 05:37, Sergei Meshveliani <mechvel at botik.ru
>>> <mailto:mechvel at botik.ru>> wrote:
>>>
>>> Please, what is wrong here?
>>>
>>> --------------------------------------------------------------------
>>> open import Function using (case_of_)
>>> open import Relation.Binary using (module DecTotalOrder;
>>> module StrictTotalOrder;
>>> module Tri)
>>> open import Data.Empty using (⊥-elim)
>>> open import Data.Nat as Nat using (ℕ; _≮_; _≤_; _≥_; _<_)
>>> open import Data.Nat.Properties as NatProp using ()
>>>
>>> open StrictTotalOrder NatProp.strictTotalOrder using (compare)
>>> open DecTotalOrder Nat.decTotalOrder using ()
>>> renaming (reflexive to
>>> ≤refl)
>>> open Tri
>>>
>>>
>>> postulate <→≤ : ∀ {m n} → m < n → m ≤ n
>>>
>>> ≮→≥ : ∀ {m n} → m ≮ n → n ≤ m
>>> ≮→≥ {m} {n} m≮n =
>>> case compare m n
>>> of \
>>> { (tri< m<n _ _ ) → ⊥-elim (m≮n m<n)
>>> ; (tri≈ _ m=n _ ) → ≤refl m=n
>>> ; (tri> _ _ m>n) → let n<m : n < m
>>> n<m = m>n
>>>
>>> n≤m : n ≤ m
>>> n≤m = <→≤ {n} {m} n<m
>>> in
>>> n≤m
>>> }
>>>
>>>
>>> Rewriting the function by
>>>
>>> ≮→≥ : ∀ {m n} → m ≮ n → n ≤ m
>>> ≮→≥ {m} {n} m≮n with compare m n
>>> ≮→≥ m≮n | tri< m<n _ _ = ⊥-elim (m≮n m<n)
>>> ≮→≥ m≮n | tri≈ _ m=n _ = ≤refl m=n
>>> ≮→≥ {m} {n} m≮n | tri> _ _ m>n =
>>> let n<m : n < m
>>> n<m = m>n
>>>
>>> n≤m : n ≤ m
>>> n≤m = <→≤ {n} {m} n<m
>>> in n≤m
>>>
>>> Why does Agda (correctly) report the error in `≤refl m=n`, but using
>>> the original function Agda reports the error `n≤m`?
>>>
>>> --
>>> Andrés
>>>
>>>
>>> _______________________________________________
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>>>
>>>
>>
>>
>
> --
> Andreas Abel <>< Du bist der geliebte Mensch.
>
> Department of Computer Science and Engineering
> Chalmers and Gothenburg University, Sweden
>
> andreas.abel at gu.se
> http://www2.tcs.ifi.lmu.de/~abel/
>
--
Andrés
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