weighted interval scheduling with minimum number of job requirement

The question is i have classic weighted interval scheduling problem but there is a extra requirement. This requirement is, from the given jobs, some number of job must be done.

I already solve it with bruteforce. But i need more efficient solution. I solve classic weighted scheduling problem with dynamic programming.But with this constraint i can not. Do you have any suggestions. Thanks in advice.

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what does the input mean? the first line is the number of jobs that have to be completed, what's `2 6 50`? – vlad Jan 10 '13 at 21:19
sorry for the lack of information. I update the question. – mustad Jan 10 '13 at 21:34

just add one more dimension based on classic scheduling problem

that dimension gives the number of jobs has been done so far

eg.

f[i][j] means at time i, with j jobs been done, what the maximum profit is

f[i][j] can decide f[job_end_time[k]][j+1] given that job_start_time[k]>=i

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Well, I don't see how this problem is very different from the classic Weighted Interval Scheduling. If "must be done" jobs do not overlap (and if they are then you have ill-defined problem - how to select between two overlapping "must be done" jobs?), then you simply need a way to make their relative weights stand out of the rest of jobs.

You can traverse your jobs in O(n), and find the maximum weight. Then for "must be done" jobs you need to add that maximum to their weights. That will ensure that they will be selected over any other jobs, since their relative weights will be definitely higher than the non-prioritized jobs.

As I said the only problem is when "must be done" jobs overlap. As in that case you will end with some must job not selected (since you will have to select one must job over the other).

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