Sign up ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

I'm studying Scalaz 7, the type class system is so abstract, and one thing I can not understand is that why Bind.ap is implemented by bind in such a way.

trait Apply[F[_]] extends Functor[F] { self =>
  def ap[A,B](fa: => F[A])(f: => F[A => B]): F[B]

trait Bind[F[_]] extends Apply[F] { self =>
  /** Equivalent to `join(map(fa)(f))`. */
  def bind[A, B](fa: F[A])(f: A => F[B]): F[B]

  override def ap[A, B](fa: => F[A])(f: => F[A => B]): F[B] = bind(f)(f => map(fa)(f))

I know we can treat F[A => B] as F[C], so first argument of bind make sense, but the second argument requires a A => F[B], how is f => map(fa)(f) equivalent to A => F[B] ??

share|improve this question

2 Answers 2

up vote 3 down vote accepted

I know we can treat F[A => B] as F[C]

So C is A => B. Let's call that fact 1.

Let's rewrite bind with replacing A with C and B with D, so that we don't get confused by colliding type parameter variables:

def bind[C, D](fc: F[C])(f: C => F[D]): F[D]

So the f argument in the second parameter list of bind has to be of type C => F[D], which can be written (A => B) => F[D] (using fact 1). Note that it's sneaky how in bind(f)(f => ...), the second f is just a lambda parameter (which happens to be a function), while the first f is not a function. It could have been written bind(f)(fun => map(fa)(fun)).

how is f => map(fa)(f) equivalent to A => F[B]??

Well, it is not... f => map(fa)(f) has to be typed as (A => B) => F[D]. So

  • f is of type A => B
  • fa is of type F[A], that is the fa in the first parameter list of ap - not bind
  • Looking at the definition of map, map(fa)(f) will be of type F[B]

Which means that

 (A => B) =>   F[D]
    f     =>  map(fa)(f)
 (A => B) =>   F[B]
 // D is really B

So bind(f)(f => map(fa)(f)) is of type F[B] which is what is required for ap...

May be this makes it clearer, conceptually, this is what is going on:

def ap[A, B](m_elem: => F[A])(m_fun: => F[A => B]): F[B] =
  for {
    fun <- m_fun
    elem <- m_elem
  } yield {
//To hammer it home, same as: m_fun.flatMap(fun => => fun(elem)))
share|improve this answer
Thanks, this is really helpful. The most confusing part is the name of the second argument of bind(f)(f => map(fa)(f)), should change to bind(f)(g => map(fa)(g)) –  smilingleo Aug 23 '13 at 8:39

As you can see from the bind method signature, it's just a pretentious Haskell's way of naming flatMap function. So Bind trait provides an essential flatMap for a Monad.

Maybe it would be simpler to understand if we take List[Int => String] instead of F[A => B], so what bind is doing it takes each function from the list, let's say we have the following list: List((x: Int) => (x + 1).toString) as f argument and List(1,2) as fa argument to ap method, and apply each function from f argument (List of Int => String functions) to each value of fa argument (List of Int).

So the answer on how is f => map(fa)(f) equivalent to A => F[B], A in this code is a Int => String function from f List and when you map some value from fa List you get F[B], which would be of type String

share|improve this answer

Your Answer


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.