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.

My understanding of one of the distinctions between Monad and Applicative is that flatMap is available on Monad, but not Applicative.

If that's true, I'm confused by these Scala Play JSON docs:

So what’s interesting there is that JsResult[A] is a monadic structure and can be used with classic functions of such structures:

flatMap[X](f: A => JsResult[X]): JsResult[X]

etc

But, then the docs go on to say:

Please note that JsResult[A] is not just Monadic but Applicative because it cumulates errors. This cumulative feature makes JsResult[T] makes it not very good to be used with for comprehension because you’ll get only the first error and not all.

Since, as I understand, a for-comprehension is syntactic sugar for flatMap, how can JsResult be both a Applicative and Monad?

share|improve this question
    
Take a look at Scalaz Validation to see exactly what this means. –  wheaties Jan 17 at 15:21
    
@wheaties, ah it's covered in the book (Functional Programming in Scala) exercise that I've worked on - github.com/kman007us/side-work/blob/master/MonadsSbt/src/main/…. It's the same, yea? So you can perform validation and read all errors via Monad or Applicative? –  Kevin Meredith Jan 17 at 15:26
1  
I'm actually not going to answer this question 'cause I'm sure I'd screw it up. Add in Monad and Applicative to your tags and I bet a few more eyeballs will answer. Basically, all an Applicative adds is two more methods pure and <*>. The latter is what "solves" the issue of chaining the exceptions (provided they're held in a Semigroup.) –  wheaties Jan 17 at 15:34
    
2  
See also this recent conversation about Scalaz's \/ (which is monadic and does not accumulate errors) and Validation (which isn't monadic and does). In short, when you have a monad you also have an applicative functor, and there are some good reasons to avoid the approach Play takes (having different monadic and applicative behaviors for the same type). –  Travis Brown Jan 17 at 17:15

Your Answer

 
discard

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

Browse other questions tagged or ask your own question.