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 several hash maps I need to generate combinations of:

A: [x->1, y->2,...]
B: [x->1, a->4,...]
C: [x->1, b->5,...]
...

some possible combinations:

A+B; A; A+C; A+B+C...

For each combination I need to produce the joint hashmap and perform an operation of key-value pairs with the same key in both hash maps.

All I could come up with was using a binary counter and mapping the digits to the respective hash map:

001 -> A
101 -> A,C
...

Although this solution works, the modulo operations are time consuming when I have more than 100 hashmaps. I'm new to Scala but I believe that there must be a better way to achieve this?

share|improve this question
15  
You have 100 hash maps and you are able to compute all possible combinations of them? What brand is your computer? Actually, scrap that; what year do you think this is and can you take me to your leader? –  oxbow_lakes Sep 26 '11 at 19:46
6  
100 hash maps give rise to 2^100 combinations. Even if you had all the computing power in the world, and each combination would take the equivalent of 1 floating-point operation, it would still take you about 4000 years to go through all of them. Is there another way to approach your problem? –  Jeffrey Sax Sep 26 '11 at 19:53
    
I think you are both right in theory, but in practice, since he's taking the intersection of the sets of keys, it's going to decrease very quickly. –  Philippe Sep 27 '11 at 15:46
add comment

3 Answers

up vote 11 down vote accepted

Well, think of how many combinations there are of your maps: suppose you have N maps.

(the maps individually) + (pairs of maps) + (triples of maps) + ... + (all the maps)

Which is of course

(N choose 1) + (N choose 2) + ... + (N choose N-1)

Where N choose M is defined as:

N! / (M! * (N-M)!)

For N=100 and M=50, N choose M is over 100,000,000,000,000,000,000,000,000,000 so "time consuming" really doesn't do justice to the problem!

Oh, and that assumes that ordering is irrelevant - that is that A + B is equal to B + A. If that assumption is wrong, you are faced with significantly more permutations than there are particles in the visible universe

Why scala might help with this problem: its parallel collections framework!

share|improve this answer
add comment

Scala sequences have a combinations function. This gives you combinations for choosing a certain number from the total. From you question it looks like you want to choose all different numbers, so your code in theory could be something like:

val elements = List('a, 'b, 'c, 'd)
(1 to elements.size).flatMap(elements.combinations).toList

/* List[List[Symbol]] = List(List('a), List('b), List('c), List('d), List('a, 'b), 
   List('a, 'c), List('a, 'd), List('b, 'c), List('b, 'd), List('c, 'd), 
   List('a, 'b, 'c), List('a, 'b, 'd), List('a, 'c, 'd), List('b, 'c, 'd), 
   List('a, 'b, 'c, 'd)) */

But as pointed out, all combinations will be too many. With 100 elements, choosing 2 from 100 will give you 4950 combinations, 3 will give you 161700, 4 will give you 3921225, and 5 will likely give you an overflow error. So if you just keep the argument for combinations to 2 or 3 you should be OK.

share|improve this answer
    
+1 for combinations function –  4e6 Sep 27 '11 at 0:51
add comment

Following up on your idea to use integers to represent bitsets. Are you using the actual modulo operator? You can also use bitmasks to check whether some number is in a bitset. (Note that on the JVM they are both one instruction operations, so who knows what's happening there.)

Another potential major improvement is that, since your operation on the range of the maps is associative, you can save computations by reusing the previous ones. For example, if you combine A,B,C but have already combined, say, A,C into AC, for instance, you can just combine B with AC.

The following code implements both ideas:

type MapT = Map[String,Int] // for conciseness later

@scala.annotation.tailrec
def pow2(i : Int, acc : Int = 1) : Int = {
  // for reasonably sized ints...
  if(i <= 0) acc else pow2(i - 1, 2 * acc)
}

// initial set of maps
val maps = List(
  Map("x" -> 1, "y" -> 2),
  Map("x" -> 1, "a" -> 4),
  Map("x" -> 1, "b" -> 5)
)
val num = maps.size

// any 'op' that's commutative will do
def combine(m1 : MapT, m2 : MapT)(op : (Int,Int)=>Int) : MapT = 
  ((m1.keySet intersect m2.keySet).map(k => (k -> op(m1(k), m2(k))))).toMap

val numCombs = pow2(num)

// precomputes all required powers of two
val masks : Array[Int] = (0 until num).map(pow2(_)).toArray

// this array will be filled, à la Dynamic Algorithm
val results : Array[MapT] = Array.fill(numCombs)(Map.empty)
// fill in the results for "combinations" of one map
for((m,i) <- maps.zipWithIndex) { results(masks(i)) = m }

val zeroUntilNum = (0 until num).toList
for(n <- 2 to num; (x :: xs) <- zeroUntilNum.combinations(n)) {
  // The trick here is that we already know the result of combining the maps
  // indexed by xs, we just need to compute the corresponding bitmask and get
  // the result from the array later.
  val known = xs.foldLeft(0)((a,i) => a | masks(i))
  val xm = masks(x)
  results(known | xm) = combine(results(known), results(xm))(_ + _)
}

If you print the resulting array, you get:

0  ->  Map()
1  ->  Map(x -> 1, y -> 2)
2  ->  Map(x -> 1, a -> 4)
3  ->  Map(x -> 2)
4  ->  Map(x -> 1, b -> 5)
5  ->  Map(x -> 2)
6  ->  Map(x -> 2)
7  ->  Map(x -> 3)

Of course, like everyone else pointed out, it will blow up eventually as the number of input maps increases.

share|improve this answer
    
Actually, this dynamic algorithm can be much improved by ignoring all combinations that contain a map which is known to be empty, and by not allocating the results array in the first place (who has 2^100 bytes available, after all). –  Philippe Sep 27 '11 at 15:48
add comment

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.