I'm trying to complete the
monadLeftIdentity proof for the following data type:
data ErrorM : (a : Type) -> Type where AllGood : a -> ErrorM a Error : String -> ErrorM a instance Monad ErrorM where (AllGood x) >>= f = f x (Error err) >>= f = Error err instance VerifiedMonad ErrorM where monadApplicative (AllGood f) (AllGood x) = Refl monadApplicative (Error err) (AllGood x) = Refl monadApplicative (AllGood f) (Error err) = Refl monadApplicative (Error er1) (Error er2) = Refl monadLeftIdentity x f = ?z
I've left out the instances for
Applicative and their
Verified counterparts, as they're quite verbose and trivial. Do let me know, can paste them all here.
I've tried to rewrite
return x as
pure x or
AllGood x, but have been unsuccessful in doing so (the rewrite does nothing to the proof state).
I've also tried to refine
return x like so:
monadLeftIdentity x f with (return x) monadLeftIdentity x' f | AllGood x' = ?z
but I get the following err msg:
`-- Error.idr line 51 col 22: When elaborating left hand side of with block in Prelude.Monad.Astra.Error.ErrorM instance of Prelude.Monad.VerifiedMonad, method monadLeftIdentity: Can't match on with block in Prelude.Monad.Astra.Error.ErrorM instance of Prelude.Monad.VerifiedMonad, method monadLeftIdentity a (AllGood x') x' b f return
How does one go about this?