Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

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.

share|improve this question
up vote 21 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;
    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 {
           current = *(it);
share|improve this answer
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

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(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

share|improve this answer

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
share|improve this answer
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


  • 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
share|improve this answer
Just a little point: O(nlog(n) + 2n) = O(nlog(n) + n) = O(n*log(n)) – andand Mar 11 '11 at 19:36
of course. but (altho not in theory) such differences are significant in practice – Bernd Elkemann Mar 11 '11 at 20:00
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! – Bernd Elkemann Mar 12 '11 at 14:34

jethro's answer contains an error. It should be

if (current.second > it->first){
    current.second = std::max(current.second, it->second);        
} else { 
share|improve this answer
yep, your are right – jethro Mar 11 '11 at 20:36
This does not provide an answer to the question. To critique or request clarification from an author, leave a comment below their post. - From Review – Martin Bonner Dec 29 '15 at 16:58
This should have been an edit to jethro's answer rather than its own answer. – Brian Dec 29 '15 at 17:15

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.