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?
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? 


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:
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:



Sample code:



pretend that we have the following list
Lets pretend that all the probabilities are integers, and assign each item a "range" that calculated as follows.
The new numbers are as follows
Now pick a random number from 0 to 100. Lets say that you pick 32. 32 falls in Item B's range. mj 


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
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. 


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. For more details,read my answer here. 


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):



Algorithm described in @Ushman's, @Brent's and @kaushaya's answers is implemented in Apache commonsmath library. Take a look at EnumeratedDistribution class (groovy code follows):
Note that sum of probabilities doesn't need to be equal to 1 or 100  it will be normalized automatically. 

