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I have a list of randomly ordered unique closed-end ranges R0...Rn-1 where

Ri = [r1i, r2i] (r1i <= r2i)

Subsequently some of the ranges overlap (partially or completely) and hence require merging.

My question is, what are the best-of-breed algorithms or techniques used for merging such ranges. Examples of such algorithms or links to libraries that perform such a merging operation would be great.

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5 Answers 5

up vote 18 down vote accepted

What you need to do is:

  1. Sort items lexicographically where range key is [r_start,r_end]

  2. Iterate the sorted list and check if current item overlaps with next. If it does extend current item to be r[i].start,r[i+1].end, and goto next item. If it doesn't overlap add current to result list and move to next item.

Here is sample code:

    vector<pair<int, int> > ranges;
    vector<pair<int, int> > result;
    sort(ranges.begin(),ranges.end());
    vector<pair<int, int> >::iterator it = ranges.begin();
    pair<int,int> current = *(it)++;
    while (it != ranges.end()){
       if (current.second > it->first){ // you might want to change it to >=
           current.second = std::max(current.second, it->second); 
       } else {
           result.push_back(current);
           current = *(it);
       }
       it++;
    }
    result.push_back(current);
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1  
Would the overall complexity of this approach be O(nlogn) {Essentially sort-complexity + 1 linear scan of N} ? –  Rikardo Koder Mar 11 '11 at 18:23
    
Yes, it would be O(nlogn) –  jethro Mar 11 '11 at 18:26
    
Depending on the size of the space the values fit in, it may be much more efficient to use a radix sort rather than quick sort. Radix sort is O(kn) where k is the size of the key space. –  BeMasher May 11 '13 at 11:52
    
How does your algorithm handle cases, when the r[i].end + 1 == r[i+1].start? - Actually, this ranges can be merged too. –  abyss.7 Nov 10 '13 at 16:36
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Boost.Icl might be of use for you.

The library offers a few templates that you may use in your situation:

  • interval_set — Implements a set as a set of intervals - merging adjoining intervals.
  • separate_interval_set — Implements a set as a set of intervals - leaving adjoining intervals separate
  • split_interval_set — implements a set as a set of intervals - on insertion overlapping intervals are split

There is an example for merging intervals with the library :

interval<Time>::type night_and_day(Time(monday,   20,00), Time(tuesday,  20,00));
interval<Time>::type day_and_night(Time(tuesday,   7,00), Time(wednesday, 7,00));
interval<Time>::type  next_morning(Time(wednesday, 7,00), Time(wednesday,10,00));
interval<Time>::type  next_evening(Time(wednesday,18,00), Time(wednesday,21,00));

// An interval set of type interval_set joins intervals that that overlap or touch each other.
interval_set<Time> joinedTimes;
joinedTimes.insert(night_and_day);
joinedTimes.insert(day_and_night); //overlapping in 'day' [07:00, 20.00)
joinedTimes.insert(next_morning);  //touching
joinedTimes.insert(next_evening);  //disjoint

cout << "Joined times  :" << joinedTimes << endl;

and the output of this algorithm:

Joined times  :[mon:20:00,wed:10:00)[wed:18:00,wed:21:00)

And here about complexity of their algorithms:

Time Complexity of Addition

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A simple algorithm would be:

  • Sort the ranges by starting values
  • Iterate over the ranges from beginning to end, and whenever you find a range that overlaps with the next one, merge them
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Instead of sorting, could a std::priority_queue be used = sort of like sweep-line approach? –  Rikardo Koder Mar 11 '11 at 18:22
    
Since you just want to walk over them from lowest to biggest a std::priority_queue should work, but I don't think it would be faster/... than just sorting. After all you walk over all items in order, so you end up with them being sorted. –  sth Mar 11 '11 at 18:29
    
@Rikardo a priority queue is only helpful when items arrive over time. If you have all of them, just sort them. Best-of-breed priority queue and sort are both O(nlogn) (priority queue is n insertions with O(logn) per insertion), but sort performs better and has less overhead. –  Jim Balter Mar 12 '11 at 11:45
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O(n*log(n)+2n):

  • Make a mapping of r1_i -> r2_i,
  • QuickSort upon the r1_i's,
  • go through the list to select for each r1_i-value the largest r2_i-value,
  • with that r2_i-value you can skip over all subsequent r1_i's that are smaller than r2_i
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Just a little point: O(n*log(n) + 2n) = O(n*log(n) + n) = O(n*log(n)) –  andand Mar 11 '11 at 19:36
3  
of course. but (altho not in theory) such differences are significant in practice –  eznme Mar 11 '11 at 20:00
1  
It's meaningless to say there's a difference in practice, because big-O is a theoretically defined notion and by its definition, O(nlogn+2n) = O(nlogn). –  Jim Balter Mar 12 '11 at 11:29
    
Consider that quicksort is O(nlogn) but that could mean that its O(nlogn+40n) making your algorithm actually O(nlogn+42n) ... = O(nlogn). –  Jim Balter Mar 12 '11 at 11:35
    
@Jim Balter: I agreed with andand that there is no difference in theory! And no it's not meaningless to say "there's a difference in practice". In practice practice is everything and big-oh's that make no difference in theory can totally ruin you! –  eznme Mar 12 '11 at 14:34
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jethro's answer contains an error. It should be

if (current.second > it->first){
    current.second = std::max(current.second, it->second);        
} else { 
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yep, your are right –  jethro Mar 11 '11 at 20:36
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