# Randomly selecting an element from a weighted list

I have a list of 100,000 objects. Every list element has a "weight" associated with it that is a positive int from 1 to N.

What is the most efficient way to select a random element from the list? I want the behavior that my distribution of randomly chosen elements is the same as the distribution of weights in the list.

For example, if I have a list L = {1,1,2,5}, I want the 4th element to be selected 5/9ths of the time, on average.

Assume inserts and deletes are common on this list, so any approach using "integral area tables" would need to be updated often - hoping there is a solution with O(1) runtime and O(1) extra memory required.

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Possible repeat of stackoverflow.com/questions/2140787/… –  user470379 Dec 22 '10 at 16:46
@user470379 This is different as the weights are 1, 2, ..., N. –  marcog Dec 22 '10 at 16:53
@user470379, I believe the requirement to support insertion and deletion distinguishes it. –  jonderry Dec 22 '10 at 16:55
@marcog No they aren't: L = {1,1,2,5}, I want the 4th element to be selected 5/9ths of the time. –  Alin Purcaru Dec 22 '10 at 16:56
@Alin I think you might be right. @John Can you confirm? Removing my answer for now. –  marcog Dec 22 '10 at 17:00

You can use an augmented binary search tree to store the elements, along with the sum of the weights in each subtree. This lets you insert and delete elements and weights however you want. Both sampling and updates require O(lg n) time per operation, and space usage is O(n).

Sampling is accomplished by generating a random integer in [1, S], where S is the sum of all weights (S is stored at the root of the tree), and performing binary search using the weight-sums stored for each subtree.

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+1: Something very similar: stackoverflow.com/questions/3120035/indexing-count-of-buckets/…. Hope the explanation there will clarify the answer better here. –  Aryabhatta Dec 22 '10 at 20:00

A solution that runs in O(n) would be to start out with selecting the first element. Then for each following element either keep the element you have or replace it with the next one. Let w be the sum of all weights for elements considered so far. Then keep the old one with probability w/(w+x) and choose the new one with p=x/(w+x), where x is the weight of the next element.

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Yeah, that's what I do now. I feel like there should be some clever optimization to avoid looking at all the elements every time. 100,000 is a lot. –  John Shedletsky Dec 22 '10 at 16:49
For example, you could keep the list sorted, and then on lookup you could jump multiple elements ahead in certain cases. Or establish a system of partitions, or something. –  John Shedletsky Dec 22 '10 at 16:50

I really like jonderry's solution but I'm wondering if this problem needs a structure as complex as the augmented binary search tree. What if we kept two arrays, one with the input weights, say a={1,1,2,5} and one with the cumulative weights (very similar idea to jonderry's solution) which would be b={1,2,4,9}. Now generate a random number in [1 9] (say x) and binary search for it in the cumulative sum array. The location i where b[i]<=x and b[i-1]>x is noted and a[i] is returned. So, if the random number were 3, we would get i=3, and a[3]=2 would be returned. This ensures the same complexity as the augmented tree solution with an easier implementation.

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You need BSTs because the question requires the ability to add and remove elements, in addition to sampling them. –  jonderry Dec 27 '10 at 18:05
Ah, didn't notice that at all - nice solution! –  kyun Dec 29 '10 at 6:58

If you know the sum of weights (in your case, 9) AND you use a random-access data structure (list implies O(n) access time), then it can be done fast:

1) select a random element (O(1)). Since there is `1/num_elems` chance for an element to be selected at this step, it allows us to use the `num_elems*` boost for step 2), thus accelerating the algorithm.

2) compute its expected probability: `num_elems * (weight/total_weight)`

3) take a random number in range 0..1, and if it's lesser than expected probability, you have the output. If not, repeat from step 1)

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@downvoter: can you at least explain yourself? –  ruslik Dec 22 '10 at 22:25
I am not the downvoter, but the problem is that the product in step 2) can be greater than 1. That overflow means that high weight elements won't be returned as often as they should. –  antonakos Dec 24 '10 at 7:08
@antonakos: yes, but this can be solved. The good part of this algorithm is that it could be faster than O(log(n)). –  ruslik Dec 24 '10 at 14:01
It's O(N). Big O means "worst case". –  John Shedletsky Dec 27 '10 at 0:07