# Maximum sum of the range non-overlapping intervals in a list of Intervals

You are given a list of intervals. You have to design an algorithm to find the sequence of non-overlapping intervals so that the sum of the range of intervals is maximum.

For Example:
If given intervals are:

``````["06:00","08:30"],
["09:00","11:00"],
["08:00","09:00"],
["09:00","11:30"],
["10:30","14:00"],
["12:00","14:00"]
``````

Range is maximized when three intervals

``````[“06:00”, “08:30”],
[“09:00”, “11:30”],
[“12:00”, “14:00”],
``````

are chosen.

Therefore, the answer is 420 (minutes).

• Are you sure this is dynamic programming? – smk Aug 15 '13 at 21:26
• no.. I am not sure.. – Black_Hat Aug 15 '13 at 21:27
• This is the classic weighted activity selection problem. – Kunal Aug 16 '13 at 10:11
• Shouldnt your answer be 420 minutes? if those three are the selected intervals – smk Aug 20 '13 at 21:59

This is a standard interval scheduling problem.
It can be solved by using dynamic programming.

Algorithm
Let there be `n` intervals. `sum[i]` stores maximum sum of interval up to interval `i` in sorted interval array. The algorithm is as follows

``````Sort the intervals in order of their end timings.
sum[0] = 0
For interval i from 1 to n in sorted array
j = interval in 1 to i-1 whose endtime is less than beginning time of interval i.
If j exist, then sum[i] = max(sum[j]+duration[i],sum[i-1])
else sum[i] = max(duration[i],sum[i-1])
``````

The iteration goes for `n` steps and in each step, `j` can be found using binary search, i.e. in `log n` time. Hence algorithm takes `O(n log n)` time.

• have you checked it? Is it giving you the correct ans?? – Black_Hat Aug 16 '13 at 8:34
• Yeah, I have implemented it a lot and I don't think its a very difficult one to understand. – Shashwat Kumar Aug 16 '13 at 10:18
``````public int longestNonOverLappingTI(TimeInterval[] tis){
Arrays.sort(tis);
int[] mt = new int[tis.length];
mt[0] = tis[0].getTime();
for(int j=1;j<tis.length;j++){
for(int i=0;i<j;i++){
int x = tis[j].overlaps(tis[i])?tis[j].getTime():mt[i] + tis[j].getTime();
mt[j]  = Math.max(x,mt[j]);
}
}

return getMax(mt);
}

public class TimeInterval implements Comparable <TimeInterval> {
public int start;
public int end;
public TimeInterval(int start,int end){
this.start = start;
this.end = end;

}

public boolean overlaps(TimeInterval that){
return !(that.end < this.start || this.end < that.start);
}

public int getTime(){
return end - start;
}
@Override
public int compareTo(TimeInterval timeInterval) {
if(this.end < timeInterval.end)
return -1;
else if( this.end > timeInterval.end)
return 1;
else{
//end timeIntervals are same
if(this.start < timeInterval.start)
return -1;
else if(this.start > timeInterval.start)
return 1;
else
return 0;
}

}

}
``````

Heres the working code. Basically this runs in O(n^2) because of the two for loops. But as Shashwat said there are ways to make it run in O(n lg n)

• I don't think so – Black_Hat Aug 16 '13 at 8:42
• Why do you feel so? – smk Aug 16 '13 at 19:19