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I have a data set of frequency samples (for example, bpm, or any other measure/time), taken at regular time intervals (say, every 5 minutes). I would like to find the smallest set of time intervals with the following properties:

  • The intervals cover the entire original data-set
  • No time interval has an average frequency below a given threshold

Are there any standard algorithms for figuring this sort of information out?

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This looks to me like the type of problem that has no algorithmic solution, and that can only be tackled by brute force. I may be wrong though. –  Philip Sheard Feb 27 '12 at 21:33
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Brute force is, if it helps arrive at a solution, a sound basis for a perfectly acceptable algorithmic solution. –  High Performance Mark Feb 27 '12 at 21:38
    
It could be worth it to try defining the terms "frequency sample" (is that a number or a vector?), "average frequency", "interval" (are the input intervals overlapping?), etc. It seems that some folks here have the domain knowledge and don't need these details, but you may get a broader set of responses if you make the question more approachable. E.g., I read the question a few times, but have no idea what you are asking. –  Igor ostrovsky Feb 27 '12 at 21:40
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1 Answer

up vote 3 down vote accepted

Unless I am mistaken:

  • If the average of the whole thing is above your threshold, then the single interval covering the entire set is the solution
  • If the average of the entire set is below your threshold, there is no solution.
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You are mistaken :) You can drive at an average speed of 120 km/h for an hour, by doing 240km in 30 minutes and then stopping. –  blueberryfields Feb 27 '12 at 22:21
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@blueberryfields: what would be the intervals then which work? [0,.5] would have an average of 240, but (.5,1] would have an average of 0, below any (positive) threshold. –  Xodarap Feb 28 '12 at 3:01
    
Right! The requirement to cover the original data-set forces that. –  blueberryfields Feb 28 '12 at 15:56
    
@blueberryfields: I don't think I understand your question. Can you give an example in which a single interval doesn't meet the requirements, but a set of spanning intervals does? –  Xodarap Feb 28 '12 at 16:09
    
Your answer is right for the question as I wrote it. The problem I'm looking at has more complexities, though, I'll have to think about it some more before I can frame the question properly. –  blueberryfields Feb 28 '12 at 16:27
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