**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