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Suppose we have a set x of N values {x_i; i=1,...,N} and a set of some associated probabilities {w_i; i=1,...,N}.

We want to get from the set x, a new set x^ of N values {x^_i; i=1,...,N} by choosing each value x_i from the setx according to the probability w_i. How do we code that (i.e. a pseudo code algorithm, that can be translated to any language).

EDIT: python code:

def resample(self,x,w):
    N = len(w)
    new_x = empty(N)
    c = cumsum(w)

    for i in range(N):
        r = random()
        for j in range(N):
            if( j == N-1 ):
                new_x[i] = x[j]
                if( (c[j] <= r) and (r < c[j+1]) ):
                    new_x[i] = x[j+1]

    new_w = ones(N,dtype=float)/N
    return new_x, new_w
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what's the relationship between x_i and w_i? What do you mean "according to the probability w_i"? –  Hans Z Jun 12 '12 at 13:50
related: stackoverflow.com/questions/352670/… –  Nate Kohl Jun 12 '12 at 13:53
@user995434 Regardless of whether or not it's homework, questions on SO are meant to show effort on the part of the asker. SO is not a place to get people to do it all for you, whether 'it' is homework or not. All you have said is 'I need this'. –  Lattyware Jun 12 '12 at 14:16
@NateKohl I've added a python code, can you check if it is correct ? –  shn Jun 12 '12 at 15:03

3 Answers 3

up vote 3 down vote accepted

You can call a function which gives you a random number between 0 and 1.
If the probabilities are w_1 = 0.2, w_2 = 0.5, w_3 = 0.3, you can:
Choose x_1 if you got a number between 0 and 0.2
Choose x_2 if you got a number between 0.2 and 0.7
Choose x_3 otherwise.

More generally, choose x_n if w_1 + ... + w_(n-1) <= random number < w_1 + ... + w_(n-1) + w_n

That's not the whole pseudocode, just an explanation of its most problematic part, but I think it should be enough if you have a basic understanding of your problem.

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That's great, thanks. –  shn Jun 12 '12 at 14:33
I've added a python code, can you check if it is correct according to what you explained ? –  shn Jun 12 '12 at 15:01

I think the best option is preprocessing the probability set and then getting a random value.

Let me explain what I mean:

First you create a new set, for example h_i in which you place the accumulated probability of each object.


The last element is of course 1. (but if it is not (you have missing cases) it still works.

Now you generate a random number 0≤r≤1 and lookup the first element whose h is greater than r.

For example if you get 0.56 you choose C because 0.9(h_C) > 0.56 and 0.5(h_B) ≤ 0.56

This operation can be expensive on arrays but if you choose a binary search tree for the storage of the set h_i you can get very good results.

That is if you want to choose lots of random values over the same probability set. If the set is constantly changing I would use another approach.

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I've added a python code, can you check if it is correct according to what you explained ? –  shn Jun 12 '12 at 15:02
# import the random library
import random

# define the input data
X = ["A","B","C","D"]
w = [0.2,0.3,0.4,0.1]

# size of the new sample
n = 10

# empy list to store the result
Xp = []

# the actual code
while len(Xp) < n:
    random_choice = random.choice(w)
    if random_choice >= random.random():

# have a look


['C', 'C', 'C', 'B', 'D', 'B', 'A', 'D', 'A', 'B']

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