- 30,000 data points - each data point is a measurement of type float - each measurement is associated with a date - each date has only one measurement - no dates are without measurements - the data comes in the form of a text file: 30,000 lines in this form: - YYYY-MM-DD I,F (e.g. 1977-02-08 20.74) - measurement appearing in the source file are already sorted by date
- a time-interval T with boundaries (s,e) /* start, end */ - (s - e = 14 days) the time-interval *must* be 2 weeks - define min as the lowest value in the interval T - define max as the greatest value in the interval T - the chosen T needs to have the greatest distance btwn max and min of all possible Ts - break ties among intervals T by choosing the most recent (with the greatest s value) - the chosen T must consider all jumps in the 14 days, not just the values @ s and e - if the overall "variance" in the interval is great but the jump |max-min| is not the greatest in absolute value, T is not the right choice, even if it's an "exciting" interval
I am asking:
- which algorithm to employ, considering algorithms are not my specialty - which data structure to use to keep track of the subtotals
- an answer in pseudo code would be preferred, "prose" is fine if pressured for time - an answer in Python would be... splendid :)
If you want, you can generate "dummy" data and run your proposed algorithm as a test or I could share the actual data.
I am not concerned with performance so much here apart from wanting to know the fastest way to do this so as to learn how to apply the right solution and the correct algorithm.
I think I can "prove" correctness with even the simplest iterative algorithm because the dataset is small given today's computers.
So far, I am "traversing and carrying along 14 vectors of 14 measurements", if you could teach me how to do this incrementally with sub-sums, that would be really appreciated.