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I've got what I think is a "enumerative combinatoric" question.

I need to choose 7 elements out of 15 with repetition and I'd like to know if there's an easy way to store all combination in an array and directly find the element I'm interested in.

Basically I'm building a big lookup table (containing a very expensive to compute value) and I'd like to know if I can access it using a simple formula (note that this is not homework, check my profile).

The number of combinations with repetition for 7 out of 15 is 116 280 (I double checked that it is correct).

Here's the code :

public static void main(String[] args) {
    final Random r = new Random( System.currentTimeMillis() );
    final List<String> ls = new ArrayList<String>();
    for (int i = 0; i < 15; i++) {
        for (int j = i; j < 15; j++) {
            for (int k = j; k < 15; k++) {
                for (int l = k; l < 15; l++) {
                    for (int m = l; m < 15; m++) {
                        for (int n = m; n < 15; n++) {
                            for (int o = n; o < 15; o++) {
                                ls.add( i + " " + j + " " + k + " " + l + " " + m + " " + n + " " + o + ": " + r.nextLong() );
                            }
                        }
                    }
                }
            }
        }
    }
    System.out.println( "We have " + ls.size() + " entries" );
    System.out.println( "Entry @ 5,7,2,10,11,8,3 is " + getEntryAt(5,7,2,10,11,8,3) );
}

private static String getEntryAt( int i, int j, int k, int l, int m, int n, int o ) {
    return "FILL ME"; // What goes here ?
}

In the above example I'm just putting a random value in the lookup array but this is basically it: I want to get, say, (5,7,2,10,11,8,3), can I "compute" easily it's location?

Note that the way I'm storing elements in the array has no importance: I can store them in the way that makes for the fastest "formula", if any.

If anyone knows what I'm talking about any help would be much welcome.

share|improve this question
    
not sure I am following, what excactly are you looking for? what is 'location' and what is expected output for your example (5,7,2,10,11,8,3) ? –  amit May 12 '11 at 20:39
    
Could you just build a multi-dimensional array using all 7 numbers as indices to the value? –  mbeckish May 12 '11 at 20:40
    
Should not your list be in order, e.g. {11, 10, 8, 7, 5, 3, 2}? Otherwise, are you not dealing with permutations, rather than combinations? –  Mr.Wizard May 12 '11 at 23:27
    
@mbeckish: but then you have, say, an array 15 exp 7 big or so, which would need 170 millions entries or so, while the number of combinations with repetitions is only 116 820 (in this case, which was just an example). –  SyntaxT3rr0r May 13 '11 at 8:45
    
@Mr.Wizard: the order of the 'query' as no importance, it can be trivially normalized if needed. For example {11, 10, 8, 7, 5, 3, 2} must yeld the same result as {11, 7, 3, 10, 8, 5, 2}. It was really just an example :) –  SyntaxT3rr0r May 13 '11 at 8:48

5 Answers 5

The simple way to break it down is to sum the counts as parts. (For my examples, I used 1-based index)

Let's say you're given (fewer digits, but same principle) the tuple ( 2, 3, 4 ). Its position is simply the sum of:

  • ( 1, x, y ) - all the numbers that fit into this
  • ( 2, 2, x )
  • ( 2, 3, x ) - where x < 4

and you can figure this out iteratively.

Now, for D = 3 digits, and K items, you can draw out the pattern and see how it grows:

K = 1

1 1 1

K = 2

1 1 1
1 1 2

1 2 2

2 2 2

K = 3

1 1 1
1 1 2
1 1 3

1 2 2
1 2 3

1 3 3

2 2 2
2 2 3

2 3 3

3 3 3

for each iteration, what you're doing is actually taking the previous groupings (include an empty grouping) and adding an additional number -- as in the triangular number sequence. You can even think of this recursively as you increase the first digit -- in the above example of D = 3, K = 3, you can re-map the symbols of the stuff that doesn't start with "1", and thus they do not contain any "1"s - D is still 3, but K is now 2:

K = 3 (ignoring 1's)

2 2 2
2 2 3

2 3 3

3 3 3

becomes:

K = 2

1 1 1
1 1 2

1 2 2

2 2 2

This is how you would add to K. (For D = 3, notice that they are triangular numbers.)

How about adding a digit? Well, for K = 3, D = 3, you can imagine, given this:

K = 3

1 1 1
1 1 2
1 1 3

1 2 2
1 2 3

1 3 3

2 2 2
2 2 3

2 3 3

3 3 3

and add a digit in front of them. You can add "1" in front of all of them. You can only add "2" in front of the "2" or higher, and "3" to the one with only "3"s. Now you can see the recursive structure.

For a simple example, to find the index of ( 2, 4, 4 ) with D = 3, K = 5:

index( 2, 4, 4 ) =
   # number of leading 1's, and re-index
   index( 3, 3 ) + count( D = 2, K = 5 ) =
   index( 3, 3 ) + 15 =
   # number of leading 1's and 2's, and re-index
   index( 1 ) + count( D = 1, K = 4 ) + count( D = 1, K = 3 ) + 15 =
   index( 1 ) + 4 + 3 + 15 = index( 1 ) + 22 = 
   22

So index( 2, 4, 4 ) = 22

Now the tricky part is figuring out count( D, K ), which is actually just C( K + D - 1, D ). You can now generalize this to your K = 15, D = 7.

// This is actually 0-based.
// Really should use an array or something to make it easy to generalize, 
// so I'm going to skip a lot of cut and paste
private static int getEntryAt( int i, int j, int k, int l, int m, int n, int o ) {
   int D = 7, K = 15;
   int total = 0;

   if ( i > 0 ) {
      for ( int index = 0; index < i; index++ ) {
         total += count( D, K - index );
      }
   }

   j -= i, k -= i, l -= i, m -= i, n -= i, o -= i;
   D--;
   K -= i;
   // repeat for j, k, ...

   return count;
}
share|improve this answer
    
+1, thanks a lot for taking the time to write this. This should get me started :) Nice answer! +1 :) –  SyntaxT3rr0r May 13 '11 at 8:42
long[,,,,,,] ls = new long[15, 15, 15, 15, 15, 15, 15];

and in your deeply nested for loops:

ls[i, j, k, l, m, n, o] = r.nextLong();

and for your get statements, it's as simple as:

return ls[i, j, k, l, m, n, o];

But for this, ls needs to be either passed as a parameter to the getter function or it needs to be global.

share|improve this answer
1  
I may not be entirely familiar with your pseudo-code notation but aren't you advocating creating a 15 exp 7 array, which would be 170 millions entries, only to hold a "combination with repetition" which, for 15 and 7, yelds only 116 820 results? –  SyntaxT3rr0r May 13 '11 at 8:50
    
@SyntaxT3rr0r All the code notation is actually perfectly legal c#. As for the apparent judgement error, I wasn't aware of the simplifications that could result from your problem set, and as a result I would agree that using a simple array when there is that much repetition would be less memory conscious. On another note, however, arrays are incredibly fast, and if memory isn't a concern for you (more accurately, if you have enough memory to hold it all) a simply written approach of an array may be better than an intricate solution to save a small amount of memory. –  Thebigcheeze May 13 '11 at 15:08

Build a tree of height 7. The root node has 15 children, named 1-15. Each child name corresponds to the selection of that number in the set. A node with number n has children with numbers m (n <= m <= 15) At the leaves of the tree (all 116 280 of them, all have depth 7) you link to the pre-computed solution for that combination.

Looking up the solution for a given set then requires you tracing the relevant path through the tree, which can be done in constant time.

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Perhaps you could use combinatorial number system to solve your problem?

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Seems like you want a Map<Multiset,T> where T is the type of your expensive-to-compute value(s). A HashMap<Multiset,T> would use an array internally, so I guess that is a valid answer.

The point of making the key a Multiset is that the equals() method on the multiset should consider two multisets to be equal if they contain the same numbers of each element, disregarding ordering. (By the way, the JDK doesn't have a Multiset class, but you can find third-party Multiset classes.)

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