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.

I have this code in Python that finds all pairs of numbers in an array that sum to k:

def two_sum_k(array, k):
    seen = set()
    out = set()

    for v in array:
        if k - v in seen:
            out.add((min(v, k-v), max(v, k-v)))
        seen.add(v)
    return out

Can anyone help me convert this to Scala (in a functional style)? Also with linear complexity.

share|improve this question

6 Answers 6

up vote 4 down vote accepted

I'm not sure this is the clearest, but folds usually do the trick:

def two_sum_k(xs: Seq[Int], k: Int) = {
  xs.foldLeft((Set[Int](),Set[(Int,Int)]())){ case ((seen,out),v) =>
    (seen+v, if (seen contains k-v) out+((v min k-v, v max k-v)) else out)
  }._2
}
share|improve this answer
    
Looks a bit complicated, but was the fastest in a short test with 10000 Elements, about 10% not suitable for building a sum. Faster than mine. –  user unknown Jan 29 '12 at 2:29

I think this is a classic case of when a for-comprehension can provide additional clarity

scala> def algo(xs: IndexedSeq[Int], target: Int) =
   | for {
   |   i <- 0 until xs.length
   |   j <- (i + 1) until xs.length if xs(i) + xs(j) == target
   | }
   | yield xs(i) -> xs(j)
algo: (xs: IndexedSeq[Int], target: Int)scala.collection.immutable.IndexedSeq[(Int, Int)]

Using it:

scala> algo(1 to 20, 15)
res0: scala.collection.immutable.IndexedSeq[(Int, Int)] = Vector((1,14), (2,13), (3,12), (4,11), (5,10), (6,9), (7,8))

I think it also doesn't suffer from the problems that your algorithm has

share|improve this answer
1  
This have a worse big-oh than the python solution, assuming a HashSet. –  Daniel C. Sobral Jan 28 '12 at 14:04
    
Yes - I'm sure there are more efficient solutions –  oxbow_lakes Jan 28 '12 at 15:19
    
what do you think of my solution? –  axaluss Jan 28 '12 at 20:28
    
"user unknown" posted a good solution –  axaluss Jan 29 '12 at 1:17

You could just filter for (k-x <= x) by only using those x as first element, which aren't bigger than k/2:

def two_sum_k (xs: List[Int], k: Int): List [(Int, Int)] =
  xs.filter (x => (x <= k/2)).
    filter (x => (xs contains k-x) && (xs.indexOf (x) != xs.lastIndexOf (x))).
      map (x => (x, k-x)).distinct

My first filter on line 3 was just filter (x => xs contains k-x)., which failed as found in the comment by Someone Else. Now it's more complicated and doesn't find (4, 4).

scala> li
res6: List[Int] = List(2, 3, 3, 4, 5, 5)

scala> two_sum_k (li, 8) 
res7: List[(Int, Int)] = List((3,5))
share|improve this answer
    
This is incomplete. Given xs = (2,3,5,6) and k = 4 it returns (2,2), which it should not. –  S0rin Jan 29 '12 at 22:39
    
You're right. I made an improvement, tested it, tested the code of others. What do you expect for f((2, 3, 3, 4, 5, 5), 8) to be returned? 4 times (3, 5)? I guess you don't. What does the python code do? Since there are sets, I guess every combination only once. Mh. A final distinct solved the problem. –  user unknown Jan 30 '12 at 1:15
    
That's the trick. Cool. –  S0rin Jan 30 '12 at 9:47
def twoSumK(xs: List[Int], k: Int): List[(Int, Int)] = {
  val tuples = xs.iterator map { x => (x, k-x) }
  val potentialValues = tuples map { case (a, b) => (a min b) -> (a max b) }
  val values = potentialValues filter { xs contains _._2 }
  values.toSet.toList
}
share|improve this answer

Well, a direct translation would be this:

import scala.collection.mutable

def twoSumK[T : Numeric](array: Array[T], k: T) = {
  val num = implicitly[Numeric[T]]
  import num._

  val seen = mutable.HashSet[T]()
  val out: mutable.Set[(T, T)]  = mutable.HashSet[(T, T)]()

  for (v <- array) {
    if (seen contains k - v) out += min(v, k - v) -> max(v, k - v)
    seen += v
  }

  out
}

One clever way of doing it would be this:

def twoSumK[T : Numeric](array: Array[T], k: T) = {
  val num = implicitly[Numeric[T]]
  import num._

  // One can write all the rest as a one-liner
  val s1 = array.toSet
  val s2 = s1 map (k -)
  val s3 = s1 intersect s2

  s3 map (v => min(v, k - v) -> max(v, k - v))
}
share|improve this answer

This does the trick:

def two_sum_k(xs: List[Int], k: Int): List[(Int, Int)] ={
      xs.map(a=>xs.map(b=>(b,a+b)).filter(_._2 == k).map(b=>(b._1,a))).flatten.collect{case (a,b)=>if(a>b){(b,a)}else{(a,b)}}.distinct
}
share|improve this answer
    
This fails the basic requisite: all numbers in the answer must be contained in xs. –  Daniel C. Sobral Jan 29 '12 at 0:47

Your Answer

 
discard

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.