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# How to pick an item by its probability?

I have a list of items. Each of these items has its own probability.

Can anyone suggest an algorithm to pick an item based on its probability?

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So with each item store a number that marks its relative probability, for example if you have 3 items one should be twice as likely to be selected as either of the other two then your list will have:

`````` [{A,1},{B,1},{C,2}]
``````

Then sum the numbers of the list (i.e. 4 in our case). Now generate a random number and choose that index. int index = rand.nextInt(4); return the number such that the index is in the correct range.

Java code:

``````class Item {
int relativeProb;
String name;

//Getters Setters and Constructor
}

...

class RandomSelector {
List<Item> items = new List();
Random rand = new Random();
int totalSum = 0;

RandomSelector() {
for(Item item : items) {
totalSum = totalSum + item.relativeProb;
}
}

public Item getRandom() {

int index = rand.nextInt(totalSum);
int sum = 0;
int i=0;
while(sum < index ) {
sum = sum + items.get(i++).relativeProb;
}
return items.get(Math.max(0,i-1));
}
}
``````
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thanks Usman. but I wonder should I take i-th item or (i-1)th item ? I mean items.get(i-1) instead of items.get(i) – Ruzanna Feb 17 '12 at 16:05
i-1 good point. – Usman Ismail Feb 17 '12 at 16:25
Here `p` is any random number so how can we say that most probability item get selected first .. eg:`[{A,10},{B,20}]` so how can you we say that suppose in first iteration `p=2` so `2<=10` is true and first item `{A,10}` is getting selected first even though second item have more probabilty – U2Answer Sep 4 '14 at 12:00
p is a random number from 0 to "Sum of all weights" so in your example there is a 10/30 = 1/3 chance of p being an number from 0-9 and there is a 20/30 = 2/3 change of p being a number from 10-29. Hence the chance of getting B is still twice as likely as getting A – Usman Ismail Sep 4 '14 at 14:40
Hey great answer but you have to be carefull! The function nextInt(...) returns a value from 0 (inclusive) to totalSum (exclusive). (See docs.oracle.com/javase/7/docs/api/java/util/…). So if 0 is picked (index = 0), you will get an IndexOutOfBoundsException, because you try to access items.get(-1), since you skip the while loop entirely and i = 0. Therefore you should return items.get(Math.max(0, i-1)). – TehQuila Nov 28 '14 at 14:48
1. Generate a uniformly distributed random number.
2. Iterate through your list until the cumulative probability of the visited elements is greater than the random number

Sample code:

``````double p = Math.random();
double cumulativeProbability = 0.0;
for (Item item : items) {
cumulativeProbability += item.probability();
if (p <= cumulativeProbability) {
return item;
}
}
``````
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nice & lightweight – myro Apr 25 '12 at 11:22
Here `p` is any random number so how can we say that most probability item get selected first .. eg:`[{A,10},{B,20}]` so how can you we say that suppose in first iteration `p=2` so `2<=10` is true and first item `{A,10}` is getting selected first even though second item have more probabilty – U2Answer Sep 4 '14 at 11:58
@U2Answer, This algorithm requires the probabilities to be normalized (divided by the sum of all probabilities). By doing that you ensure that Σp_i=1 and then a random number between 0 and 1 will do the trick. – aioobe Jan 11 at 10:21
The order of the items in the list doesn't matter, because the value of `r` is a uniformly distributed random number, which means that the probability `r` be a certain value is equal to all other values `r` may be. Thus the items in the list are not "favored" and it doesn't matter where they are in the list. – matthaeus Feb 5 at 14:51

pretend that we have the following list

``````Item A 25%
Item B 15%
Item C 35%
Item D 5%
Item E 20%
``````

Lets pretend that all the probabilities are integers, and assign each item a "range" that calculated as follows.

``````Start - Sum of probability of all items before
End - Start + own probability
``````

The new numbers are as follows

``````Item A 0 to 25
Item B 26 to 40
Item C 41 to 75
Item D 76 to 80
Item E 81 to 100
``````

Now pick a random number from 0 to 100. Lets say that you pick 32. 32 falls in Item B's range.

mj

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This faster than @Brent's answer for selection, but it would take up way too much memory if say, the ranges were from 0 to a million. – Stanislav Palatnik Jul 16 '14 at 17:39
Probabilities doesn't have to be percentages. We can just pick a random number between 0 to sum of the numbers. – WVrock Nov 15 '14 at 17:01

You can try the Roulette Wheel Selection.

First, add all the probabilities, then scale all the probabilities in the scale of 1, by dividing each one by the sum. Suppose the probabilities are `A(0.4), B(0.3), C(0.25) and D(0.05)`. Then you can generate a random floating-point number in the range [0, 1]. Now you can decide like this:

``````random number between 0.00 and 0.40 -> pick A
between 0.40 and 0.70 -> pick B
between 0.70 and 0.95 -> pick C
between 0.95 and 1.00 -> pick D
``````

You can also do it with random integers - say you generate a random integer between 0 to 99 (inclusive), then you can make decision like the above.

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(+1) It bothers me that this algorithm almost always seems to be described in terms of GAs (your link on Wikipedia and see here also). The weighted roulette wheel algorithm has all kinds of uses that have nothing to do with GAs (such as this very question). – Michael McGowan Feb 17 '12 at 15:16
Yeah, that's weird. I also learned it's name while studying GAs, but I used the technique much before that for some other reason. – 0605002 Feb 17 '12 at 15:18

My method is pretty simple. Generate a random number. Now since the probabilities of your items are known,simply iterate through the sorted list of probability and pick the item whose probability is lesser than the randomly generated number.

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Algorithm described in @Ushman's, @Brent's and @kaushaya's answers is implemented in Apache commons-math library.

Take a look at EnumeratedDistribution class (groovy code follows):

``````def probabilities = [
new Pair<String, Double>("one", 25),
new Pair<String, Double>("two", 30),
new Pair<String, Double>("three", 45)]
def distribution = new EnumeratedDistribution<String>(probabilities)
println distribution.sample() // here you get one of your values
``````

Note that sum of probabilities doesn't need to be equal to 1 or 100 - it will be normalized automatically.

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Brent's answer is good, but it doesn't account for the possibility of erroneously choosing an item with a probability of 0 in cases where p = 0. That's easy enough to handle by checking the probability (or perhaps not adding the item in the first place):

``````double p = Math.random();
double cumulativeProbability = 0.0;
for (Item item : items) {
cumulativeProbability += item.probability();
if (p <= cumulativeProbability && item.probability() != 0) {
return item;
}
}
``````
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I don't think you need to worry about the case where the item probability is zero. You should either have already exited the loop or you would continue over as the cumulative probability wouldn't have changed. – rrs Apr 29 '14 at 14:23

A slow but simple way to do it is to have every member to pick a random number based on its probability and pick the one with highest value.

Analogy:

Imagine 1 of 3 people needs to be chosen but they have different probabilities. You give them die with different amount of faces. First person's dice has 4 face, 2nd person's 6, and the third person's 8. They roll their die and the one with the biggest number wins.

Lets say we have the following list:

`[{A,50},{B,100},{C,200}]`

Pseudocode:

`````` A.value = random(0 to 50);
B.value = random(0 to 100);
C.value = random (0 to 200);
``````

We pick the one with the highest value.

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Why is this down voted? I would appreciate an explanation. – WVrock Aug 2 '15 at 11:45
Ingenious! I like it. – Siddhartha Oct 1 '15 at 5:12

You could use the Julia code:

``````function selrnd(a::Vector{Int})
c = a[:]
sumc = c[1]
for i=2:length(c)
sumc += c[i]
c[i] += c[i-1]
end
r = rand()*sumc
for i=1:length(c)
if r <= c[i]
return i
end
end
end
``````

This function returns the index of an item efficiently.

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