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I have a problem of probability algorithm

The goal is obtain a list which contains three items. as the FinalList

There has Four source lists.

ALIST, BLIST, CLIST, DLIST

There are all Unknown length. They contains unique elements

( In fact, there are all empty at the program beginning, get from redis sorted list. when running, there growing )

Choose items form this source lists. pick up random items to generate the FinalList

Ensure The Following Requirements

In the FinalList,

  • probability of ALIST's item appeared is 43%
  • probability of BLIST's item appeared is 37%
  • probability of CLIST's item appeared is 19%
  • probability of DLIST's item appeared is 1%

I have written some code, but this just for the four lists are have a lots of elements.

from random import choice

final_list = []
slot = []

a_picked_times = 0

while a_picked_times < 43:
    item = choice(ALIST)
    ALIST.remove(item)

    if item in already_picked_list:
        continue

    slot.append(item)
    a_picked_times += 1


b_picked_times = 0

while b_picked_times < 37:
    ...

SOME CODE SIMILAR

# now slot is a list which contains 100 elements, 
# in slot, there are 43 elements of ALIST'items, 37 of B, 19 of C, 1 of D

for i in range(3):
    final_list.append( choice(slot) )

So, this can ensure the probability requirements. BUT only under the condition: this Four lists have a lots of elements.

list.remove( item ) that will not remove all elements in list, so we will correct pick up items with the needs times.

when A, B, C, D empty OR not enough elements, How could ensure the probability requirements?

A, B, C, D list are all get from redis sorted list. Or some solution with redis ?

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3 Answers 3

It might make more sense to (for each element) pick a number between 1 and 100 and then select a source list based on that.

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As I understand it, you're generating lists of random sizes, then you want to choose 3 with the given probability. If my understanding is correct, then you need to simply generate a uniform variate on [0,1] with random.uniform(0., 1.).

Then simply partition the 0..1 interval into the appropriate lengths:

import random

for i in range(3):
    r = random.uniform(0., 1.)
    if r < .43:
        final_list.append(random.choice(ALIST))
    elif r < .43 + .37:
        final_list.append(random.choice(BLIST))
    elif r < .43 + .37 + .19:
        final_list.append(random.choice(CLIST))
    else:
        final_list.append(random.choice(DLIST))

Choosing from the lists should be easy, since you just pick an index.

Note that this is equivalent to Ofir's answer, but may or may not appeal to you more.

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1  
I think you mean random.choose. Incidentally, if there were more than four lists, this could be done a bit more compactly using numpy.cumsum and bisect (though this solution is great as it is). –  David Robinson Aug 25 '12 at 16:39
    
@DavidRobinson Right you are (actually random.choice), corrected. –  Codie CodeMonkey Aug 25 '12 at 16:43

So from what I can gather, your code is removing exactly 43 ALIST elements, 37 BLIST elements, etc.

A better solution would be to construct your final_list by using the given probabilities. This will also take into account when your other lists are empty.

ALIST_PROB = 0.43
BLIST_PROB = ALIST_PROB + 0.37
CLIST_PROB = BLIST_PROB + 0.19
DLIST_PROB = CLIST_PROV + 0.01

while len(final_list) < 3:

    #generate a random number
    rand = random.random()        

    if rand <= ALIST_PROB:
        element = getEl(ALIST)
    elif rand <= BLIST_PROB:
        element = getEl(BLIST)
    elif rand <= CLIST_PROB:
        element = getEl(CLIST)
    elif rand <= DLIST_PROB:
        element = getEl(DLIST)

    if not element == None:
        final_list.append(element)

def getEl(list):
    try:
        element = random.choice(list)
    except IndexError:
        element = None
    return element
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Thanks, this is almost meets my needs –  Yueyoum Aug 26 '12 at 4:38
    
@Yueyoum what is missing? –  Phil Aug 26 '12 at 5:24
    
I wanna ensure the probability requirements even the source list are not enough elements. But, It seems that difficult, Or impossible –  Yueyoum Aug 27 '12 at 1:41

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