# Algorithm for partitioning 1-dimensional space

I two sets of intervals that correspond to the same 1-dimensional (linear) space. Here is a rough visual--in reality, there are many more intervals and they are much more spread out, but this gives the basic idea.

Each of these intervals contains information, and I am writing a program to compare the information in one set of intervals (the red) to the information contained in the other set (the blue).

Here is my problem. I would like to partition the space into n chunks such that there is roughly an equal amount of comparison work to be done in each chunk (the amount of work depends on the number of intervals in that portion of the space). Also, the partition should not split any red or blue interval across two chunks.

So the input is two sets of intervals, and the desired output is a partition of the space such that

• the intervals are (roughly) equally distributed across each element of the partition
• no interval overlaps with multiple partition elements

Can anyone suggest an approach or an algorithm for doing this?

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@Daniel: Is it expensive for you to scan the entire space once before beginning comparison, in order to build a comparison list? Also, are you guaranteed to have an equal number of red and blue intervals? Is there any way to identify the sequence of an interval by examining it (e.g. sequence number encoded in a header or something)? –  Eric J. Apr 1 '11 at 3:19
It is likely that there will not be an equal number of intervals. A quick initial scan of the linear space will probably be required and will not be expensive. I can store pointers to "interval" objects (objects with start and end coordinates) in multiple data structures if necessary, although it would be too memory intensive to store much more than that. An interval tree and a dynamic array came to mind first, but I'm trying to figure out how I can use them... –  Daniel Standage Apr 1 '11 at 3:34
@Daniel - Am I missing something, or can't you just create a list of pointer pairs with a quick scan, then partition that list for processing? –  Eric J. Apr 1 '11 at 3:44
There is not necessarily any solution, since you're only allowed to "snip" the space into segments at points that are not covered by either a red or a blue interval. E.g. if the intervals are arranged like the bricks in 2 rows of brickwork, there will be no such points. (Also you don't say whether or not the intervals are guaranteed not to overlapping within their respective sets, but my counterexample holds even if they don't.) –  j_random_hacker Apr 1 '11 at 5:13
It is not clear what depends the workload of a chunk - you say the number of comparison, which depends on the intervalls. But which intervalls, the ones from set 1 or from set 2, or from both? If it would depend just on one of them the distribution of the intervalls in would be interresting. –  flolo Apr 1 '11 at 7:50