# get the i-th combination of arrays of numbers

I know there are many similar questions, and I have read them for hours. But none of them seems to meet my requirement.

My problem:

given n int arrays, and each of them has the form

``````array_i[] = {0, 1,...,count_i-1}, i = 0,1,...,n-1.
``````

We choose one number of each array to make a combination, and the number of such combinations is

``````count_0*count_1*...*count_{n-1}
``````

For example

``````array_0 = {0,1}
array_1 = {0,1,2}
array_2 = {0,1}
``````

the 2*3*2 = 12 combinations are

`````` 0| 0 0 0
1| 0 0 1
2| 0 1 0
3| 0 1 1
4| 0 2 0
5| 0 2 1
6| 1 0 0
7| 1 0 1
8| 1 1 0
9| 1 1 1
10| 1 2 0
11| 1 2 1
``````

I want to get the i-th combination (e.g. the 9-th combination is `{1,1,1}`) and get it efficiently. I've tried the idea of base-n conversion, something like this Permutation for numbers in C. But it's not efficient since the base has to be the largest `count_i`, which might be unnecessary. I've also thought about the idea of using different bases for each bit, but it's tricky to get the relation right.

Any suggestions are truly welcome.

-

The main difference from your link (Permutation for numbers in C) is that 49^i becomes a product of count_j's:

``````index_0 = ( i / sub_0 ) % count_0
index_1 = ( i / sub_1 ) % count_1
...
``````

where you precomputed

``````sub_0 = count_1*count_2*...*count_{n-1}
sub_1 = count_2*count_3*...*count_{n-1}
...
``````

In your example with counts = 2,3,2, we have sub=6,2,1, hence for i=9 index=1,1,1

-
but applying your method to my example, prod_0 = 2, prod_1 = 1, and the indices for the 9-th combination are index_0 = 9%2 = 1, 9%1 = 0? –  linusz Jun 1 '13 at 16:04
Redefine your arrays to run from 0 to count-1; otherwise your expression for the total number of combinations is wrong. Then count_i becomes the number of elements in array_i. Then in your example counts are 2,3,2. –  Joachim Wuttke Jun 1 '13 at 16:08
Yes you are right. But now prod_0 = 6, prod_1 = 2, and the indices for the 9-th combination are index_0 = 9%6 = 3, 9%2 = 1? –  linusz Jun 1 '13 at 16:11
Now it should be correct. Nice problem. –  Joachim Wuttke Jun 1 '13 at 16:35
Thank you. It's really neat. –  linusz Jun 1 '13 at 17:06