Is there a more efficient way to find all combinations of 10 items in 10% increments?

I have 10 currencies I am analysing, and I want to find all possible combinations of these currencies in 10% increments. For example:

10% of A, 20% of B...etc


The constraints are as follows:

The total has to sum to 100% There can be any amount of each currency between 0% and 100%, so a combination of 100% of A is valid

At the moment my code looks like this:

for element in itertools.product(*curr_arr):
if round(sum(element),1)==1:
comb_input.append(list(element))


Where curr_arr is essentially an array as follows:

  [0,0.1,0.2,0.3,0.4,0.5,0.6,0.7,0.8,0.9,1.0]


This approach is very slow because it looks at all combinations then extracts the ones that sum to one. Is there a more efficient way to do this and speed up my code?

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If possible, work with percentage (10, 20, 30, …) instead of floats (0.1, 0.2, 0.3, …). These floats don't really sum to 1.0.: 0.3+0.3+0.3+0.1 returns 0.99999999999999989 – eumiro Mar 29 '12 at 7:50

5 Answers

This is ugly, but it is fast:

combinations = []
for a in xrange(11):
for b in xrange(11-a):
for c in xrange(11-a-b):
for d in xrange(11-a-b-c):
for e in xrange(11-a-b-c-d):
for f in xrange(11-a-b-c-d-e):
for g in xrange(11-a-b-c-d-e-f):
for h in xrange(11-a-b-c-d-e-f-g):
for i in xrange(11-a-b-c-d-e-f-g-h):
j = 10-a-b-c-d-e-f-g-h-i
combinations.append((a,b,c,d,e,f,g,h,i,j))
print len(combinations)


This gives you all your 92378 combinations in less than 0.2 sec.

Note that it returns the integer values between 0 and 10 which have to be multiplied by 10 to get percentages.

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I've just tried this with range instead of xrange and each row appears to sum to 11, or 110%. Should it be xrange(10)? – Mandeep Mar 29 '12 at 9:03
@Mandeep - no, it was the 11 -> 10 in the line where j is calculated. Sorry for that. Fixed now. The 11 in the xranges is correct. – eumiro Mar 29 '12 at 9:07
ok thanks, let me just try that – Mandeep Mar 29 '12 at 9:12
Thanks this solution worked for me – Mandeep Mar 29 '12 at 11:35

Not really, your problem is basically the Subset sum problem (given a set of integers, find those that sum to k) and that problem is NP-Complete. And that means your chances of finding a significantly better algorithm than you have now are very small.

I'd recommend writing this part of the code in C as a Python extension (see Extending and Embedding the Python Interpreter) and call that function from your Python code. That should give you a decent speed improvement.

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Ok thanks, I guess the fastest way to solve this is to run the code once to find all combinations. Export it to excel and filter then ones that sum to 100%, then re-import those combinations each time I run the analysis – Mandeep Mar 29 '12 at 8:08
@Mandeep - you don't want to export 10**10 data entries to excel… – eumiro Mar 29 '12 at 8:25

How about finding all combinations which give 100% and then find all permutations of those combinations? I was unable to run your example, so I am not sure how it compares in terms of speed.

import itertools

curr_arr = [0, 10, 20, 30, 40, 50, 60, 70, 80, 90, 100]

comb_input = [a for a in itertools.combinations_with_replacement(curr_arr, 10) if sum(a) == 100]
comb_input = [set(itertools.permutations(a)) for a in comb_input]

finish = []
for a in comb_input:
finish += list(a)

print len(finish)

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for currencyA, currencyB, currencyC, currencyD, currencyE, currencyF, currencyG, currencyH, currencyI, currencyJ in itertools.permutations(range(0,101,10)):
# you now have varying percentages of each currency
# if sum of the currencies == 100
# do whatever!

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It is possible to generate directly the combinations that sum to 100 %, without filtering. Using my answer to a previous question:

comb_input = [[x/10.0 for x in y] for y in lists_with_sum(10, 10)]

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