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I have a bunch of keys that each have an unlikeliness variable. I want to randomly choose one of these keys, yet I want it to be more unlikely for unlikely (key, values) to be chosen than a less unlikely (a more likely) object. I am wondering if you would have any suggestions, preferably an existing python module that I could use, else I will need to make it myself.

I have checked out the random module; it does not seem to provide this.

I have to make such choices many millions of times for 1000 different sets of objects each containing 2,455 objects. Each set will exchange objects among each other so the random chooser needs to be dynamic. With 1000 sets of 2,433 objects, that is 2,433 million objects; low memory consumption is crucial. And since these choices are not the bulk of the algorithm, I need this process to be quite fast; CPU-time is limited.



Ok, I tried to consider your suggestions wisely, but time is so limited...

I looked at the binary search tree approach and it seems too risky (complex and complicated). The other suggestions all resemble the ActiveState recipe. I took it and modified it a little in the hope of making more efficient:

def windex(dict, sum, max):
    '''an attempt to make a random.choose() function that makes
    weighted choices accepts a dictionary with the item_key and
    certainty_value as a pair like:
    >>> x = [('one', 20), ('two', 2), ('three', 50)], the
    maximum certainty value (max) and the sum of all certainties.'''
    n = random.uniform(0, 1)
    sum = max*len(list)-sum 
    for key, certainty in dict.iteritems():
        weight = float(max-certainty)/sum
        if n < weight:
        n = n - weight
    return key

I am hoping to get an efficiency gain from dynamically maintaining the sum of certainties and the maximum certainty. Any further suggestions are welcome. You guys saves me so much time and effort, while increasing my effectiveness, it is crazy. Thx! Thx! Thx!


I decided to make it more efficient by letting it choose more choices at once. This will result in an acceptable loss in precision in my algo for it is dynamic in nature. Anyway, here is what I have now:

def weightedChoices(dict, sum, max, choices=10):
    '''an attempt to make a random.choose() function that makes
    weighted choices accepts a dictionary with the item_key and
    certainty_value as a pair like:
    >>> x = [('one', 20), ('two', 2), ('three', 50)], the
    maximum certainty value (max) and the sum of all certainties.'''
    list = [random.uniform(0, 1) for i in range(choices)]
    (n, list) = relavate(list.sort())
    keys = []
    sum = max*len(list)-sum 
    for key, certainty in dict.iteritems():
        weight = float(max-certainty)/sum
        if n < weight:
            if list: (n, list) = relavate(list)
            else: break
        n = n - weight
    return keys
def relavate(list):
    min = list[0]
    new = [l - min for l in list[1:]]
    return (min, new)

I haven't tried it out yet. If you have any comments/suggestions, please do not hesitate. Thx!


I have been working all day on a task-tailored version of Rex Logan's answer. Instead of a 2 arrays of objects and weights, it is actually a special dictionary class; which makes things quite complex since Rex's code generates a random index... I also coded a test case that kind of resembles what will happen in my algo (but I can't really know until I try!). The basic principle is: the more a key is randomly generated often, the more unlikely it will be generated again:

import random, time
import psyco

class ProbDict():
    Modified version of Rex Logans RandomObject class. The more a key is randomly
    chosen, the more unlikely it will further be randomly chosen. 
    def __init__(self,keys_weights_values={}):
        self._effort = 0.15
        self._fails = 0
    def __iter__(self):
        return self.next()
    def __getitem__(self, key):
        return self._kw[key]
    def __setitem__(self, key, value):
        self.append(key, value)
    def __len__(self):
        return self._len
    def next(self):
        while key:
            yield key
            key = self._key()
    def __contains__(self, key):
        return key in self._kw
    def items(self):
        return self._kw.items()
    def pop(self, key):  
            (w, value) = self._kw.pop(key)
            self._len -=1
            if w == self._seniorW:
                self._seniors -= 1
                if not self._seniors:
                    #costly but unlikely:
            return [w, value]
        except KeyError:
            return None
    def popitem(self):
        return self.pop(self._key())
    def values(self):
        values = []
        for key in self._keys:
            except KeyError:
        return values
    def weights(self):
        weights = []
        for key in self._keys:
            except KeyError:
        return weights
    def keys(self, imperfect=False):
        if imperfect: return self._keys
        return self._kw.keys()
    def append(self, key, value=None):
        if key not in self._kw:
            self._len +=1
            self._kw[key] = [0, value]
    def _key(self):
        for i in range(int(self._effort*self._len)):
            ri=random.randint(0,self._len-1) #choose a random object
            rkey = self._keys[ri]
                w = self._kw[rkey][0]
                if rx >= w: # test to see if that is the value we want
                    w += 1
                    self._kw[rkey][0] = w
                    return rkey
            except KeyError:
        # if you do not find one after 100 tries then just get a random one
        self._fails += 1 #for confirming effectiveness only
        for key in self._keys:
            if key in self._kw:
                w = self._kw[key][0] + 1
                self._kw[key][0] = w
                return key
        return None
    def _findSeniors(self):
        '''this function finds the seniors, counts them and assess their age. It
        is costly but unlikely.'''
        seniorW = 0
        seniors = 0
        for w in self._kw.itervalues():
            if w >= seniorW:
                if w == seniorW:
                    seniors += 1
                    seniorsW = w
                    seniors = 1
        self._seniors = seniors
        self._seniorW = seniorW
    def _warnSeniors(self, w):
        #a weight can only be incremented...good
        if w >= self._seniorW:
            if w == self._seniorW:
                self._seniors = 1
                self._seniorW = w
def test():
    #test code
    iterations = 200000
    size = 2500
    nextkey = size 

    pd = ProbDict(dict([(i,[0,i]) for i in xrange(size)]))
    start = time.clock()
    for i in xrange(iterations):
        if random.randint(0,1+pd._seniorW-w):
            #the heavier the object, the more unlikely it will be removed
        probAppend = float(500+(size-len(pd)))/1000
        if random.uniform(0,1) < probAppend:
    print (time.clock()-start)*1000/iterations, "msecs / iteration with", pd._fails, "failures /", iterations, "iterations"
    weights = pd.weights()
    print "avg weight:", float(sum(weights))/pd._len, max(weights), pd._seniorW, pd._seniors, len(pd), len(weights)
    print weights

Any comments are still welcome. @Darius: your binary trees are too complex and complicated for me; and I do not think its leafs can be removed efficiently... Thx all

share|improve this question
It would be easier to give a more precise answer if you could say exactly how the probability should depend on the "conviction". –  David Z Feb 8 '09 at 20:04
How often do you exchange objects? About as often as you make random choices? Much less often? Much more? What distribution of probabilities? (A few different probabilities, many, or arbitrary?) These determine what an efficient solution might look like. –  Darius Bacon Feb 8 '09 at 20:30
@Darius: In the beginning their will be almost as much object exchanges as their are random choices; with time their will be less exchanges and more choices. The distribution of probabilities will depend on the group; I do not know. This is a clustering algo. –  Nicholas Leonard Feb 8 '09 at 21:25
Most of the complexity in the binary search method in PHP that you worry about is in the binary search function itself; Python has that in its standard library (the bisect module). –  Darius Bacon Feb 9 '09 at 0:55
@Darius: yes, yet I still fear it for I do not understand it and I have never used it. And I wonder if it is really worth it? How would you implement it? –  Nicholas Leonard Feb 9 '09 at 1:02

12 Answers 12

up vote 23 down vote accepted

This activestate recipe gives an easy-to-follow approach, specifically the version in the comments that doesn't require you to pre-normalize your weights:

import random

def weighted_choice(items):
    """items is a list of tuples in the form (item, weight)"""
    weight_total = sum((item[1] for item in items))
    n = random.uniform(0, weight_total)
    for item, weight in items:
        if n < weight:
            return item
        n = n - weight
    return item

This will be slow if you have a large list of items. A binary search would probably be better in that case... but would also be more complicated to write, for little gain if you have a small sample size. Here's an example of the binary search approach in python if you want to follow that route.

(I'd recommend doing some quick performance testing of both methods on your dataset. The performance of different approaches to this sort of algorithm is often a bit unintuitive.)

Edit: I took my own advice, since I was curious, and did a few tests.

I compared four approaches:

*The weighted_choice function above.*

A binary-search choice function like so:

def weighted_choice_bisect(items):
    added_weights = []
    last_sum = 0

    for item, weight in items:
        last_sum += weight

    return items[bisect.bisect(added_weights, random.random() * last_sum)][0]

A compiling version of 1:

def weighted_choice_compile(items):
    """returns a function that fetches a random item from items

    items is a list of tuples in the form (item, weight)"""
    weight_total = sum((item[1] for item in items))
    def choice(uniform = random.uniform):
        n = uniform(0, weight_total)
        for item, weight in items:
            if n < weight:
                return item
            n = n - weight
        return item
    return choice

A compiling version of 2:

def weighted_choice_bisect_compile(items):
    """Returns a function that makes a weighted random choice from items."""
    added_weights = []
    last_sum = 0

    for item, weight in items:
        last_sum += weight

    def choice(rnd=random.random, bis=bisect.bisect):
        return items[bis(added_weights, rnd() * last_sum)][0]
    return choice

I then built a big list of choices like so:

choices = [(random.choice("abcdefg"), random.uniform(0,50)) for i in xrange(2500)]

And an excessively simple profiling function:

def profiler(f, n, *args, **kwargs):
    start = time.time()
    for i in xrange(n):
        f(*args, **kwargs)
    return time.time() - start

The results:

(Seconds taken for 1,000 calls to the function.)

  • Simple uncompiled: 0.918624162674
  • Binary uncompiled: 1.01497793198
  • Simple compiled: 0.287325024605
  • Binary compiled: 0.00327413797379

The "compiled" results include the average time taken to compile the choice function once. (I timed 1,000 compiles, then divided that time by 1,000, and added the result to the choice function time.)

So: if you have a list of items+weights which change very rarely, the binary compiled method is by far the fastest.

share|improve this answer
I do not understand why the latter functions compile (compiled) while the initials do not (uncompiled). Could you explain or direct me to some info on this? Thx a lot! –  Nicholas Leonard Feb 9 '09 at 15:18
"compile" isn't exactly the correct word, honestly -- it's the "Factory Pattern". Those functions are pre-calculating as much work as possible, then returning a new function (a "closure") that can do just the choosing part. –  David Feb 9 '09 at 20:11
simple but works great! –  Coc B. Apr 27 '12 at 5:08

In comments on the original post, Nicholas Leonard suggests that both the exchanging and the sampling need to be fast. Here's an idea for that case; I haven't tried it.

If only sampling had to be fast, we could use an array of the values together with the running sum of their probabilities, and do a binary search on the running sum (with key being a uniform random number) -- an O(log(n)) operation. But an exchange would require updating all of the running-sum values appearing after the entries exchanged -- an O(n) operation. (Could you choose to exchange only items near the end of their lists? I'll assume not.)

So let's aim for O(log(n)) in both operations. Instead of an array, keep a binary tree for each set to sample from. A leaf holds the sample value and its (unnormalized) probability. A branch node holds the total probability of its children.

To sample, generate a uniform random number x between 0 and the total probability of the root, and descend the tree. At each branch, choose the left child if the left child has total probability <= x. Else subtract the left child's probability from x and go right. Return the leaf value you reach.

To exchange, remove the leaf from its tree and adjust the branches that lead down to it (decreasing their total probability, and cutting out any single-child branch nodes). Insert the leaf into the destination tree: you have a choice of where to put it, so keep it balanced. Picking a random child at each level is probably good enough -- that's where I'd start. Increase each parent node's probability, back up to the root.

Now both sampling and exchange are O(log(n)) on average. (If you need guaranteed balance, a simple way is to add another field to the branch nodes holding the count of leaves in the whole subtree. When adding a leaf, at each level pick the child with fewer leaves. This leaves the possibility of a tree getting unbalanced solely by deletions; this can't be a problem if there's reasonably even traffic between the sets, but if it is, then choose rotations during deletion using the leaf-count information on each node in your traversal.)

Update: On request, here's a basic implementation. Haven't tuned it at all. Usage:

>>> t1 = build_tree([('one', 20), ('two', 2), ('three', 50)])
>>> t1
Branch(Leaf(20, 'one'), Branch(Leaf(2, 'two'), Leaf(50, 'three')))
>>> t1.sample()
Leaf(50, 'three')
>>> t1.sample()
Leaf(20, 'one')
>>> t2 = build_tree([('four', 10), ('five', 30)])
>>> t1a, t2a = transfer(t1, t2)
>>> t1a
Branch(Leaf(20, 'one'), Leaf(2, 'two'))
>>> t2a
Branch(Leaf(10, 'four'), Branch(Leaf(30, 'five'), Leaf(50, 'three')))


import random

def build_tree(pairs):
    tree = Empty()
    for value, weight in pairs:
        tree = tree.add(Leaf(weight, value))
    return tree

def transfer(from_tree, to_tree):
    """Given a nonempty tree and a target, move a leaf from the former to
    the latter. Return the two updated trees."""
    leaf, from_tree1 = from_tree.extract()
    return from_tree1, to_tree.add(leaf)

class Tree:
    def add(self, leaf):
        "Return a new tree holding my leaves plus the given leaf."
    def sample(self):
        "Pick one of my leaves at random in proportion to its weight."
        return self.sampling(random.uniform(0, self.weight))
    def extract(self):
        """Pick one of my leaves and return it along with a new tree
        holding my leaves minus that one leaf."""
        return self.extracting(random.uniform(0, self.weight))        

class Empty(Tree):
    weight = 0
    def __repr__(self):
        return 'Empty()'
    def add(self, leaf):
        return leaf
    def sampling(self, weight):
        raise Exception("You can't sample an empty tree")
    def extracting(self, weight):
        raise Exception("You can't extract from an empty tree")

class Leaf(Tree):
    def __init__(self, weight, value):
        self.weight = weight
        self.value = value
    def __repr__(self):
        return 'Leaf(%r, %r)' % (self.weight, self.value)
    def add(self, leaf):
        return Branch(self, leaf)
    def sampling(self, weight):
        return self
    def extracting(self, weight):
        return self, Empty()

def combine(left, right):
    if isinstance(left, Empty): return right
    if isinstance(right, Empty): return left
    return Branch(left, right)

class Branch(Tree):
    def __init__(self, left, right):
        self.weight = left.weight + right.weight
        self.left = left
        self.right = right
    def __repr__(self):
        return 'Branch(%r, %r)' % (self.left, self.right)
    def add(self, leaf):
        # Adding to a random branch as a clumsy way to keep an
        # approximately balanced tree.
        if random.random() < 0.5:
            return combine(self.left.add(leaf), self.right)
        return combine(self.left, self.right.add(leaf))
    def sampling(self, weight):
        if weight < self.left.weight:
            return self.left.sampling(weight)
        return self.right.sampling(weight - self.left.weight)
    def extracting(self, weight):
        if weight < self.left.weight:
            leaf, left1 = self.left.extracting(weight)
            return leaf, combine(left1, self.right)
        leaf, right1 = self.right.extracting(weight - self.left.weight)
        return leaf, combine(self.left, right1)

Update 2: In answering another problem, Jason Orendorff points out that the binary trees can be kept perfectly balanced by representing them in an array just like the classical heap structure. (This saves the space spent on pointers, too.) See my comments to that answer for how to adapt his code to this problem.

share|improve this answer
Awesome! But since you understand it best, could you implement it? Thanks –  Nicholas Leonard Feb 9 '09 at 2:16
Wow...You are quite persistent. I will try to integrate your method to my algo. –  Nicholas Leonard Feb 9 '09 at 4:55
While a random choice needs to be made, how does one remove a specific leaf? for a leaf needs to be removed from one and added to another only when the extracted choice is processed and assessed as tranferable... You really seem to be a master of trees though! –  Nicholas Leonard Feb 9 '09 at 5:03
If you complete this, I would not be surprised that your algo finds itself in a cookbook or in the next python dist... –  Nicholas Leonard Feb 9 '09 at 5:07
If you're already holding onto a leaf and want to transfer that particular one, you need the path back to the root. There are a couple different ways to do this: 1) Have each node hold a backpointer to its parent. Then you need to update backpointers whenever you change a tree. . . –  Darius Bacon Feb 9 '09 at 19:17

I suggest you port this PHP implementation of weighted random to Python. In particular, the binary-search-based second algorithm helps address your speed concerns.

share|improve this answer

I would use this recipe . You will need to add a weight to your objects, but that is just a simple ratio and put them in a list of tuples (object, conviction/(sum of convictions)). This should be easy to do using a list comprehension.

share|improve this answer
very good stuff, thx –  Nicholas Leonard Feb 8 '09 at 20:25

Here is a classic way to do it, in pseudocode, where random.random() gives you a random float from 0 to 1.

let z = sum of all the convictions
let choice = random.random() * z 
iterate through your objects:
    choice = choice - the current object's conviction
    if choice <= 0, return this object
return the last object

For an example: imagine you have two objects, one with weight 2, another with weight 4. You generate a number from 0 to 6. If choice is between 0 and 2, which will happen with 2/6 = 1/3 probability, then it will get subtracted by 2 and the first object is chosen. If choice is between 2 and 6, which will happen with 4/6 = 2/3 probability, then the first subtraction will still have choice being > 0, and the second subtraction will make the 2nd object get chosen.

share|improve this answer

You want to give each object a weight. The bigger the weight the more likely it will happen. More precisely probx =weight/sum_all_weights.

Then generate a random number in the range 0 to sum_all_weights and map it to each object.

This code allows you to generate a random index and it is mapped when the object is created for speed. If all of your sets of objects have the same distribution then you can get by with only one RandomIndex object.

import random

class RandomIndex:
    def __init__(self, wlist):
        for n in range(self._rsize+1):
            if n == s:

    def i(self):
        return self._m[rn]


wx=[1,10,100,1000] #weight list


for i in range(1000):
    cnt[ri.i()] +=1  #keep track of number of times each index was generated

share|improve this answer

The simplest thing to do is to use random.choice (which uses a uniform distribution) and vary the frequency of occurrence on the object in the source collection.

>>> random.choice([1, 2, 3, 4])

... vs:

>>> random.choice([1, 1, 1, 1, 2, 2, 2, 3, 3, 4])

So your objects could have a base occurrence rate (n) and between 1 and n objects are added to the source collection as a function of the conviction rate. This method is really simple; however, it can have significant overhead if the number of distinct objects is large or the conviction rate needs to be very fine grained.

Alternatively, if you generate more that one random number using a uniform distribution and sum them, numbers occurring near the mean are more probable that those occurring near the extremes (think of rolling two dice and the probability of getting 7 versus 12 or 2). You can then order the objects by conviction rate and generate a number using multiple die rolls which you use to calculate and index into the objects. Use numbers near the mean to index low conviction objects and numbers near the extremes to index high conviction items. You can vary the precise probability that a given object will be selected by changing the "number of sides" and number of your "dice" (it may be simpler to put the objects into buckets and use dice with a small number of sides rather than trying to associate each object with a specific result):

>>> die = lambda sides : random.randint(1, sides)
>>> die(6)
>>> die(6) + die(6) + die(6)
share|improve this answer
Thanks I was just considering that right now. The problem is that it would take up to much RAM-memory. I am still trying to implement something more efficient. The other thing to keep in mind is that these probabilities will vary. –  Nicholas Leonard Feb 8 '09 at 20:03
Wait. I just noticed you create the table on the fly. That is pretty sweet. It seems more viable. Yet I now wonder how much CPU-time it would take to do this millions of times for sets containing 2,433 objects? –  Nicholas Leonard Feb 8 '09 at 20:06

A very easy and simple way of doing this is to set weights for each of the values, and it wouldn't require much memory.

You could probably use a hash/dictionary to do this.

What you'll want to do is to have the random number, x, multiplied and summed over the entire set of things you want selected, and divide that result over the number of objects in your set.


objectSet = [(object1, weight1), ..., (objectN, weightN)]
sum = 0
rand = random()
for obj, weight in objectSet
    sum = sum+weight*rand
choice = objectSet[floor(sum/objectSet.size())]

EDIT: I just thought of how slow my code would be with very large sets (it's O(n)). The following pseudo-code is O(log(n)), and is basically using a binary search.

objectSet = [(object1, weight1), ..., (objectN, weightN)]
sort objectSet from less to greater according to weights
choice = random() * N # where N is the number of objects in objectSet
do a binary search until you have just one answer

There are implementations of binary search in Python all over the 'net, so no need repeating here.

share|improve this answer

Here's a better answer for a special probability distribution, the one Rex Logan's answer seems to be geared at. The distribution is like this: each object has an integer weight between 0 and 100, and its probability is in proportion to its weight. Since that's the currently accepted answer, I guess this is worth thinking about.

So keep an array of 101 bins. Each bin holds a list of all of the objects with its particular weight. Each bin also knows the total weight of all its objects.

To sample: pick a bin at random in proportion to its total weight. (Use one of the standard recipes for this -- linear or binary search.) Then pick an object from the bin uniformly at random.

To transfer an object: remove it from its bin, put it in its bin in the target, and update both bins' weights. (If you're using binary search for sampling, you must also update the running sums that uses. This is still reasonably fast since there aren't many bins.)

share|improve this answer
Sounds good. But the devil is too often in the details... –  Nicholas Leonard Feb 9 '09 at 23:18
@Darius my distribution is just a weighted distributions like yours. I had to force the weights to a max which I chose to be 100.0 note the weights are floats not ints. I used a Markov chain to do a recursive approach so that the weights are decoupled from each other. –  uɐƃoן xǝᴚ Feb 10 '09 at 0:04
OK -- I misunderstood. –  Darius Bacon Feb 10 '09 at 2:01

I was needed in faster functions, for non very large numbers. So here it is, in Visual C++:

#undef _DEBUG // disable linking with python25_d.dll
#include <Python.h>
#include <malloc.h>
#include <stdlib.h>

static PyObject* dieroll(PyObject *, PyObject *args)
    PyObject *list;
    if (!PyArg_ParseTuple(args, "O:decompress", &list))
        return NULL;

    if (!PyList_Check(list)) 
        return PyErr_Format(PyExc_TypeError, "list of numbers expected ('%s' given)", list->ob_type->tp_name), NULL;

    int size = PyList_Size(list);

    if (size < 1)
        return PyErr_Format(PyExc_TypeError, "got empty list"), NULL;

    long *array = (long*)alloca(size*sizeof(long));

    long sum = 0;
    for (int i = 0; i < size; i++) {
        PyObject *o = PyList_GetItem(list, i);

        if (!PyInt_Check(o))
            return PyErr_Format(PyExc_TypeError, "list of ints expected ('%s' found)", o->ob_type->tp_name), NULL;
        long n = PyInt_AsLong(o);
        if (n == -1 && PyErr_Occurred())
            return NULL;
        if (n < 0)
            return PyErr_Format(PyExc_TypeError, "list of positive ints expected (negative found)"), NULL;

        sum += n; //NOTE: integer overflow
        array[i] = sum;

    if (sum <= 0)
        return PyErr_Format(PyExc_TypeError, "sum of numbers is not positive"), NULL;

    int r = rand() * (sum-1) / RAND_MAX; //NOTE: rand() may be too small (0x7fff).    rand() * sum may result in integer overlow.

    assert(array[size-1] == sum);
    assert(r < sum && r < array[size-1]);
    for (int i = 0; i < size; ++i)
        if (r < array[i])
            return PyInt_FromLong(i);
    return PyErr_Format(PyExc_TypeError, "internal error."), NULL;

static PyMethodDef module_methods[] = 
    {"dieroll", (PyCFunction)dieroll, METH_VARARGS, "random index, beased on weights" },
    {NULL}  /* Sentinel */

PyMODINIT_FUNC initdieroll(void) 
    PyObject *module = Py_InitModule3("dieroll", module_methods, "dieroll");
    if (module == NULL)
share|improve this answer

About 3 years later...

If you use numpy, perhaps the simplest option is to use np.random.choice, which takes a list of possible values, and an optional sequence of probabilities associated with each value:

import numpy as np

values = ('A', 'B', 'C', 'D')
weights = (0.5, 0.1, 0.2, 0.2)

print ''.join(np.random.choice(values, size=60, replace=True, p=weights))
share|improve this answer

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