I am trying to make a function that transverse an object with a tree like structure in a tail recursive way, but so far I can't write a code that does it.

My tree like object is:

case class Node(lex: String,
                position: Int,
                posTag: String,
                var dependency: Int = -1,
                var left: Vector[Node],
                var right: Vector[Node]) 

Version 1, tail Recursive (Not working)

So far I've tried the simplest form:

def matchNodes(goldSentence: LabeledSentence): Int = {

  def condition(n: Node): Boolean = ???

  @tailrec
  def match0(acc: Int, n: Seq[Node]): Int =
    (n: @switch) match {
      case head :: tail => {
        if (condition(head)) {
          match0(acc + 1, tail)
        } else {
          acc
        }
      }
      case _ => acc
    }
  match0(0, left) + match0(0, right)
}

The above code is tailrec, but its not transversing the whole tree, only the first level.

Version 2, tail Recursive (Not working)

Other way would be:

def matchNodes(goldSentence: LabeledSentence): Int = {
  @inline def condition(n: Node): Boolean = ???

  def sumAcc(nodes: Vector[Node]): Vector[Node] = nodes match {
    case head +: tail => sumAcc(head.left ++ head.right ++ tail)
    case _ => nodes
  }

  @tailrec
  def match0(acc: Int, n: Seq[Node]): Int =
    (n: @switch) match {
      case head :: tail => {
        if (condition(head)) {
          match0(acc + 1, tail)
        } else {
          acc
        }
      }
      case _ => acc
    }

  val flatTree  =  sumAcc(right ++ left)
  match0(0, flatTree)
}

Here I've tried to flat all the nodes into a single Vector[Node], but for some reason the expected result after processing the tree is not correct.

Version 3, no Tail recursive (Working)

The last code I've tried isn't tail recursive, but it is the only one that compute the correct result:

def matchNodes(goldSentence: LabeledSentence): Int = {

  var correctRoots = 0
  val position:Int = this.position
  val dep:Int = dependency
  val tag = goldSentence.tags(position)
  if (goldSentence.dep(position) == dep || Constants.punctuationTags.contains(tag))
    correctRoots += 1

  if (right.nonEmpty)
    for (r <- right)
      correctRoots += r.matchNodes(goldSentence)
  if (left.nonEmpty)
    for (l <- left)
      correctRoots += l.matchNodes(goldSentence)

  correctRoots
}

Is there a way in which I could make this function tail recursive?

  • 1
    Can you provide sample data of your input? – Yuval Itzchakov Oct 30 '16 at 7:50
  • I've updated the members of the node class. The input is information about sentences. Each word in a sentence has a lexical value, dependency value and a PosTag. Is this what you want? – ElBaulP Oct 30 '16 at 7:54
  • I want a sample Seq[Node] that you want to traverse. – Yuval Itzchakov Oct 30 '16 at 7:56
up vote 1 down vote accepted

There's no natural way to convert this to use tail recursion (i.e. you're not going to get an asymptotic improvement in space usage). That is the tree traversal algorithm you're using here requires a stack, whether that be the call stack given by recursion or an explicit stack you maintain. If you don't want to blow your call stack you can use an explicit stack and iterate through. If you really want to stick with tail recursion, you can pass the stack around as an extra accumulator argument.

// Simplified version of your Node; let's ignore the value for now
case class Node(value: Unit, children: List[Node])
var counter = 0
def traverseNodeAccum(node: Node)(acc: List[Node]): Unit = {
  counter += 1
  (node.children, acc) match {
    case (Nil, Nil) => 
      ()
    case (Nil, x :: rest) =>
      traverseNodeAccum(x)(rest)
    case (child :: otherChildren, xs) => 
      traverseNodeAccum(child)(otherChildren ++ xs)
  }
}

If you want to traverse without incurring the cost of a stack at all, you'll have to have a mutable representation of your tree (at least to the best of my knowledge). Your case class treatment unfortunately won't do.

  • I've wrote a different solution. – ElBaulP Oct 30 '16 at 18:09

I Finally wrote a tail recursive method to transverse the whole tree, here it is as an alternative to @badcook answer:

def matchNodes(goldSentence: LabeledSentence): Int = {
  @inline def condition(n: Node): Boolean = ???

  @tailrec
  def match0(acc:Int, n: Node)(queue:Seq[Node]): Int = {
    val count = if (condition(n)) acc + 1 else acc

    (queue: @switch) match {
      case head +: tail =>
        match0(count, head)(head.left ++ head.right ++ tail)
      case Nil =>
        count
    }
  }

  match0(0, this)(left ++ right)
}

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