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Is there any quantitative technique available for estimating the magnitude of different curves.
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Hello everyone, I have a question regarding time series data. Is there any quantitative technique available for estimating the magnitude of different curves. I have attached a figure for better understanding. By visual inspection, we can see that Time Series 2 and Time Series 4 have less variation in the data as compare to the other three curves. We should not consider the dc offset. Please help me in finding the right technique to quantify these time series data.
Thanks in advance, Irtaza
4 Comments
Jan
on 24 Oct 2017
@Syed: You mean the half range? Then it is called "half range", for obvious reasons.
Answers (1)
Jan
on 24 Oct 2017
It depends on what you call "magnitude" or "variation". Perhaps:
Range = max(x) - min(x); % This is called "Range"
Int = sum(abs(gradient(x))); % Accumulated absolute derivatives
StdDev = std(x); % Standard deviation
Variance = var(x); % Variance
FFT might be costly, but very useful. "Thousands" sounds like a work for parts of a second only.
3 Comments
Jan
on 24 Oct 2017
@Syed: This is a really vague question. "Is there any other way?" Yes, of course there is. There are many ways. But as my trivial answers above show already: It would not be efficient if we post dozens of different method, when you are looking for something different. So it is your turn to specify, what you exactly want. Maybe spikes matter, maybe only the low frequencies of the signal. Maybe a phase shift is of interest, or not. Maybe similar wave forms matter, but the absolute scaling should be ignored. I could expand this list for the next 20 lines.
What do you need exactly?
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