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Let's say I have a list of numbers:

2,2,3,4,4

Split the numbers into N groups (3 groups here as an example):

A:2,3 sum:5

B:4   sum:4

C:2,4 sum:6

What I want is to minimize the group with the highest sum (6 here) - the group with the smallest sum (4 here).

Does anyone think of an algorithm to achieve this?


Another example:

7,7,8,8,8,9,9,10

The result should be as follows:

A:7,8,8 sum:23

B:7,8,9 sum:24

C:9,10  sum:19
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wouldn't the smallest group in the first example be 2? –  zaczap Feb 27 '09 at 16:27
    
I think he wants to minimize the difference between the highest sum and the lowest sum. He could use some brackets in his problem statement. –  Baltimark Feb 27 '09 at 16:29
    
ah, that makes more sense, thanks –  zaczap Feb 27 '09 at 16:30

3 Answers 3

up vote 5 down vote accepted

Unfortunately, this problem is NP hard. See references for multiprocessor scheduling or bin packing. You may also be able to find some useful approximation algorithms, if you're interested in that approach.

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Considering that even if N is two the problem is NP complete, I can give you a very bad algorithm.

http://mathworld.wolfram.com/NumberPartitioningProblem.html

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Zweiterlinde's suggestion to check out bin packing is the way to go.

I went ahead and posted this, having realized it was wrong after I had typed it all.

You want a greedy approach where the largest numbers are used first.

  1. sort the list to achieve an ordering
  2. Begin placing the largest numbers into groups -- as many as will fit to reach the first number
  3. Stop when max number of groups is reached
  4. Sort your groups by sum and repeat by adding the largest number to the smallest group, repeating until done.

This should get you: from 2,2,3,4,4 ...

group 1 (4): 4
group 2 (6): 4, 2
group 3 (5): 3, 2

and from 7,7,8,8,8,9,9,10 ...

group 1 (18): 10, 8
group 2 (24): 9, 8, 7
group 3 (24): 9, 8, 7

Though I guess the second example could be done as 19, 24, 23 which makes this wrong. Hmph.

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This breaks down when there are big gaps in the numbers. Consider splitting (10,1,1,1,1,1,1,1,1) into two groups. Your algorithm outputs (10,1,1,1,1),(1,1,1,1) while the correct answer is (10),(1,1,1,1,1,1,1,1). –  Welbog Feb 27 '09 at 16:34
    
yup. realized after i typed it all and figured I'd just send it out anyways –  Nerdling Feb 27 '09 at 16:35
    
Well, anyway, the problem is NP-complete so if your algorithm worked you'd be a million dollars richer. ;) –  Welbog Feb 27 '09 at 16:37
    
Yup! and out of a potential grad school thesis. However, dynamic programming would help here either way. –  Nerdling Feb 27 '09 at 16:38
    
My friend asked me this questsion. It seems easy at first glance, but actually it doesn't easy. –  Billy Feb 27 '09 at 16:42

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