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Update: my problem has been solved, I updated the code source in my question to match with Jason's answer. Note that rikitikitik answer is solving the issue of picking cards from a sample with replacement.

I want to select x random elements from a weighted list. The sampling is without replacement. I found this answer: http://stackoverflow.com/a/2149533/57369 with an implementation in Python. I implemented it in C# and tested it. But the results (as described below) were not matching what I expected. I've no knowledge of Python so I'm quite sure I made a mistake while porting the code to C# but I can't see where as the code in Pythong was really well documented.

I picked one card 10000 times and this is the results I obtained (the result is consistent accross executions):

Card 1: 18.25 % (10.00 % expected)
Card 2: 26.85 % (30.00 % expected)
Card 3: 46.22 % (50.00 % expected)
Card 4: 8.68 % (10.00 % expected)

As you can see Card 1 and Card 4 have both a weigth of 1 but Card 1 is awlays picked way more often than card 4 (even if I pick 2 or 3 cards).

Test data:

var cards = new List<Card>
{
    new Card { Id = 1, AttributionRate = 1 }, // 10 %
    new Card { Id = 2, AttributionRate = 3 }, // 30 %
    new Card { Id = 3, AttributionRate = 5 }, // 50 %
    new Card { Id = 4, AttributionRate = 1 }, // 10 %
};

Here is my implementation in C#

public class CardAttributor : ICardsAttributor
{
    private static Random random = new Random();

    private List<Node> GenerateHeap(List<Card> cards)
    {
        List<Node> nodes = new List<Node>();
        nodes.Add(null);

        foreach (Card card in cards)
        {
            nodes.Add(new Node(card.AttributionRate, card, card.AttributionRate));
        }

        for (int i = nodes.Count - 1; i > 1; i--)
        {
            nodes[i>>1].TotalWeight += nodes[i].TotalWeight;
        }

        return nodes;
    }

    private Card PopFromHeap(List<Node> heap)
    {
        Card card = null;

        int gas = random.Next(heap[1].TotalWeight);
        int i = 1;

        while (gas >= heap[i].Weight)
        {
            gas -= heap[i].Weight;
            i <<= 1;

            if (gas >= heap[i].TotalWeight)
            {
                gas -= heap[i].TotalWeight;
                i += 1;
            }
        }

        int weight = heap[i].Weight;
        card = heap[i].Value;

        heap[i].Weight = 0;

        while (i > 0)
        {
            heap[i].TotalWeight -= weight;
            i >>= 1;
        }

        return card;
    }

    public List<Card> PickMultipleCards(List<Card> cards, int cardsToPickCount)
    {
        List<Card> pickedCards = new List<Card>();

        List<Node> heap = GenerateHeap(cards);

        for (int i = 0; i < cardsToPickCount; i++)
        {
            pickedCards.Add(PopFromHeap(heap));
        }

        return pickedCards;
    }
}

class Node
{
    public int Weight { get; set; }
    public Card Value { get; set; }
    public int TotalWeight { get; set; }

    public Node(int weight, Card value, int totalWeight)
    {
        Weight = weight;
        Value = value;
        TotalWeight = totalWeight;
    }
}

public class Card
{
    public int Id { get; set; }
    public int AttributionRate { get; set; }
}
share|improve this question
    
woho, i would do that with linq, order by Guid.NewGuid() and double/triple/... the amount of instances according to rate. easier to implement and easier to read - no word about performance though. –  Andreas Niedermair Aug 2 '12 at 10:54
    
System.Random is NOT a good random number generator (and Guids aren't random generators at all). If you need a true random distribution you have to use something else. No choice. –  Adriano Repetti Aug 2 '12 at 11:18
    
Note: even for a "perfect" RNG you won't get the same number of hits for both cards (even if they have the same weight)... –  Adriano Repetti Aug 2 '12 at 11:24
4  
System.Random is a perfectly good random number generator for this purpose. Of course it is only a pseudorandom number generator, but that is not an issue in this case. –  Ruud v A Aug 2 '12 at 11:33
1  
@Adriano did you read my previous comment? With another algorithm I was able to get the expected distribution when picking a single card 10 000 times. The pseudo random generator of .NET is NOT the issue here. –  Gabriel Aug 3 '12 at 1:58
show 6 more comments

3 Answers

up vote 3 down vote accepted

There are two minor bugs in the program. First, the range of the random number should be exactly equal to the total weight of all the items:

int gas = random.Next(heap[1].TotalWeight);

Second, change both places where it says gas > to say gas >=.

(The original Python code is OK because gas is a floating-point number, so the difference between > and >= is negligible. That code was written to accept either integer or floating-point weights.)

Update: OK, you made the recommended changes in your code. I think that code is correct now!

share|improve this answer
    
In fact I spoke too fast, it's working flawlessly when I pick one card only. As soon as I pick multiple cards (3 for example with the given set) I get the following result: Card 1: 18.30 % (10.00 % expected), Card 2: 30.20 % (30.00 % expected), Card 3: 32.25 % (50.00 % expected), Card 4: 19.25 % (10.00 % expected) –  Gabriel Aug 7 '12 at 3:52
    
@Gabriel I don't think your expectations are right for picking multiple cards. In each trial you're picking 3 cards without replacement, right? So it is impossible for card 3 to account for 50% of the picks! –  Jason Orendorff Aug 7 '12 at 23:50
1  
When you pick multiple cards without replacement, the probabilities change as you go. Once you remove the first card, the probability of picking that card again goes to 0, and the probability of picking the remaining cards goes up. If you pick 3 of those 4 cards, without replacement, I would expect you to get Card 3 about 96.6% of the time. But since it is only one of the three cards you picked, it only makes up 32.2% of your total picks. Note that this is very close to what you observed! –  Jason Orendorff Aug 8 '12 at 0:15
    
Thank you it makes complete sense. I tried with a few different samples and pick count and the result seem satisfying :) –  Gabriel Aug 8 '12 at 4:04
add comment

As some people have mentioned in the comments, create a list of the cards in the exact proportion that you want:

var deck = new List<Card>();

cards.ForEach(c => 
{
    for(int i = 0; i < c.AttributionRate; i++)
    {
         deck.Add(c);
    }
}

Shuffle:

deck = deck.OrderBy(c => Guid.NewGuid()).ToList();

And pick x cards:

var hand = deck.Take(x)

Of course this only works if AttributionRate is an int. Otherwise, you would have to tinker with the deck generation a bit.

I get the following results for 10,000 runs taking 5 at a time:

Card 1: 9.932% 
Card 2: 30.15% 
Card 3: 49.854% 
Card 4: 10.064% 

Another result:

Card 1: 10.024%
Card 2: 30.034%
Card 3: 50.034% 
Card 4: 9.908% 

EDIT:

I've braved the bitwise operations and I have taken a look at your code. After adding a generous amount of barbecue sauce on my fried brain, I noticed a few things:

First, Random.Next(min,max) will include min in the random pool, but not max. This is the reason for the higher than expected probability for Card 1.

After doing that change, I implemented your code and it appears to be working when you draw 1 card.

Card 1: 10.4%  
Card 2: 32.2% 
Card 3: 48.4% 
Card 4: 9.0% 

Card 1: 7.5%
Card 2: 28.1%
Card 3: 50.0% 
Card 4: 14.4% 

HOWEVER, your code will not work when you draw more than 1 card because of this statement:

heap[i].Weight = 0;

That line, and the recalculation loop after that, essentially removes all instances of the drawn card from the heap. If you happen to draw four cards, then the percentage becomes 25% for all cards since you're basically drawing all 4 cards. The algorithm, as it is, is not completely applicable to your case.

I suspect you would have to recreate the heap every time you draw a card, but I doubt it would still perform as well. If I were to work on this though, I would just generate 4 distinct random numbers from 1 to heap[1].TotalWeight and get the 4 corresponding cards from there, although the random number generation in this case might become unpredictable (rerolling) and thus inefficient.

share|improve this answer
    
your code is working so I'm considering accepting this is as an answer. But it's 6 times slower than the code I posted and I'm quite sure the difference will even be bigger once I start to work with real data. –  Gabriel Aug 6 '12 at 4:35
    
I didn't know performance is a consideration. The Guid.NewGuid() part may be the culprit and you may get a better result generating random decimals here instead. I'm not 100% sure of that, though. –  rikitikitik Aug 6 '12 at 4:52
    
Yes it did, reduced the computing time by a bit more than 40%, still way slower than the original solution though. The answer I copied my code from was upvoted 28 times so I suppose it's working as advertised. I don't understand how my code can be so wrong. –  Gabriel Aug 6 '12 at 5:01
1  
I tried to see where your code went wrong, but bitwise operations fry my brain to a nice crisp ;) –  rikitikitik Aug 6 '12 at 5:11
    
I'm afraid I worded my question poorly: once a card is picked you can't pick it again (this is what I meant by sample without replacement). Even though your original answer respected completely the weight it was also getting duplicate cards which doesn't match with my requirements. –  Gabriel Aug 7 '12 at 4:23
add comment

You could do this:

Card GetCard(List<Card> cards)
{
  int total = 0;
  foreach (Card c in cards)
  {
    total += AttributionRate;
  }

  int index = Random.Next(0, total - 1);
  foreach(Card c in cards)
  {
    index -= c.AttributionRate;
    if (index < 0)
    {
      return c;
    }
  }
}

Card PopCard(List<Card> cards)
{
  Card c = GetCard(cards);
  cards.Remove(c);
}

In theory this should work.

share|improve this answer
    
I didn't check his code but I guess the big big problem is not HOW you "extract" the card but the way you generate the pseudo-random number. Built-in generator is far from optimal. –  Adriano Repetti Aug 2 '12 at 11:23
    
Here are the results I get with your solution: Card 1: 0.00 % (10.00 % expected), Card 2: 0.00 % (30.00 % expected), Card 3: 0.00 % (50.00 % expected), Card 4: 100.00 % (10.00 % expected). This problem is not as trivial as it seems, please refer to the link question (stackoverflow.com/a/2149533/57369) to gain more insight. –  Gabriel Aug 3 '12 at 2:20
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