Explain this implementation of the Y combinator in Scala?

First of all, note that this is not a Y-combinator, since the lambda version of the function uses the free variable Y. It is the correct expression for Y though, just not a combinator.

So, let’s first put the part which computes the factorial into a separate function. We can call it comp:

def comp(f: Int => Int) =
  (n: Int) => {
    if (n <= 0) 1
    else n * f(n - 1)
  }

The factorial function can now be constructed like this:

def fact = Y(comp)

Q1:

Y is defined as func(Y(func)). We invoke fact(5) which is actually Y(comp)(5), and Y(comp) evaluates to comp(Y(comp)). This is the key point: we stop here because comp takes a function and it doesn’t evaluate it until needed. So, the runtime sees comp(Y(comp)) as comp(???) because the Y(comp) part is a function and will be evaluated only when (if) needed.

Do you know about call-by-value and call-by-name parameters in Scala? If you declare your parameter as someFunction(x: Int), it will be evaluated as soon as someFunction is invoked. But if you declare it as someFunction(x: => Int), then x will not be evaluated right away, but at the point where it is used. Second call is “call by name” and it is basically defining your x as a “function that takes nothing and returns an Int”. So if you pass in 5, you are actually passing in a function that returns 5. This way we achieve lazy evaluation of function parameters, because functions are evaluated at the point they are used.

So, parameter f in comp is a function, hence it is only evaluated when needed, which is in the else branch. That’s why the whole thing works - Y can create an infinite chain of func(func(func(func(…)))) but the chain is lazy. Each new link is computed only if needed.

So when you invoke fact(5), it will run through the body into the else branch and only at that point f will be evaluated. Not before. Since your Y passed in comp() as parameter f, we will dive into comp() again. In the recursive call of comp() we will be calculating the factorial of 4. We will then again go into the else branch of the comp function, thus effectively diving into another level of recursion (calculating factorial of 3). Note that in each function call your Y provided a comp as an argument to comp, but it is only evaluated in the else branch. Once we get to the level which calculates factorial of 0, the if branch will be triggered and we will stop diving further down.

Q2:

This

func(Y(func))(_:T)

is syntax sugar for this

x => func(Y(func))(x)

which means we wrapped the whole thing into a function. We didn’t lose anything by doing this, only gained.

What did we gain? Well, it’s the same trick as in the answer to a previous question; this way we achieve that func(Y(func)) will be evaluated only if needed since it’s wrapped in a function. This way we will avoid an infinite loop. Expanding a (single-paramter) function f into a function x => f(x) is called eta-expansion (you can read more about it here).

Here’s another simple example of eta-expansion: let’s say we have a method getSquare() which returns a simple square() function (that is, a function that calculates the square of a number). Instead of returning square(x) directly, we can return a function that takes x and returns square(x):

def square(x: Int) = x * x
val getSquare: Int => Int = square
val getSquare2: Int => Int = (x: Int) => square(x)

println(square(5)) // 25
println(getSquare(5)) // 25
println(getSquare2(5)) // 25

Hope this helps.