# Iterative random weighted choice

I'm trying to figure out a way to iterativly select random values from an array, based on their weights. I'm going to use the example from here, but bear with me- this is a slightly different question. Here is a class representing a broker:

``````public class Broker
{
public string Name = string.Empty;
public int Weight = 0;

public Broker(string n, int w)
{
this.Name = n;
this.Weight = w;
}
}
``````

Now, I have an array of brokers, and I want to randomly select a broker such that the probablity of Broker a to be selected equals a.Weight divided by the sum of all weights in the array.

The change here is that I want to do this n times, where n is the size of the array. So we can work with the numbers a little bit before starting (it's not gonna take less than O(n)). Also please note that the weights are of the same order of magnitude as n.

Here are the directions I thought of so far

1. Build an array with a size that is the sum of all weights, and place each Broker a a.weights times in the array - then randomize a number between 0 and the size of the new array. The problem here - as mentioned, the weights are O(n), thus this is a O(n^2) algorithm.
2. I found a way (which some might consider trivial) of solving this in O(nlog(n)). I assign each Broker the partial sum of weights, from the first and up to the previous broker. Then I draw a number from 0 to sum of weights, and find the broker with binary search. I could also have achieved this with balanced binary search trees.

Does anyone know of a better (i.e. O(n), or even O(log(log(n)))) solution? Or otherwise - can anyone prove we can't do it faster then O(nlog(n))?

-
How do you think your first soln is O(n^2). May be space complexity.. –  Karthikeyan Jul 21 at 18:20
Hum ! You have to be careful because your are not measuring the complexity of a deterministic algorithm. In particular, you are using random number which are computationally not free to get. In other word, to give a precise answer to that question, we need to agree on a model of random computations. For example, I would consider that getting n bits at random is a O(n) algorithm. Do you agree with that hypothesis ? –  hivert Jul 21 at 18:24
@Karthikeyan If he uses a data structure with O(1) access and delete in O(1) amortized (for example, a Java ArrayList), then picking and deleting n random elements will be in O(n), so it'll be less than the O(n^2) needed for the construction of that array. –  G. Bach Jul 21 at 18:24
possible duplicate of Data structure for loaded dice? –  David Eisenstat Jul 21 at 18:27
@hivert Let's assume that getting a random (log(n)-length) word takes O(1) time, just like every other word operation in the standard unit-cost RAM model. –  David Eisenstat Jul 22 at 1:16