Dear all,

in my code above I calculated the derivative like so:

deriv0 = Differences[mfts];   (* quick and dirty method! *)

and yes - maybe this is a bit too quick and dirty! But TimeSeries has a lot of nice properties to offer: E.g. "PathFunction" gives an InterpolatingFunction, from which easily the derivative can be calculated:

Plot[mfts["PathFunction"]'[t], {t, mfts["FirstTime"], mfts["LastTime"]}, ImageSize -> Large, GridLines -> Automatic]

Here the abscissa is in terms of AbsoluteTime, i.e. the number of seconds starting from 01.01.1900. Consequently the unit of the derivative is (unit of your data)/seconds.

This then can be resampled (here e.g. in 3-day-interval) and converted back into a TimeSeries for further smoothing:

sampleDates = DateRange[FromAbsoluteTime@mfts["FirstTime"], FromAbsoluteTime@mfts["LastTime"], Quantity[3, "Days"]];
deriv = TimeSeries[{#, mfts["PathFunction"]'[AbsoluteTime@#]} & /@ sampleDates];
derivSmooth = MeanFilter[deriv, Quantity[4, "Weeks"]];
DateListPlot[{deriv, derivSmooth}, ImageSize -> Large, GridLines -> Automatic, PlotStyle -> {Green, Red}]

This definitely is a cleaner solution. Regards -- Henrik

Thanks Henrik. I had not learned the MeanFilter[] yet. It will likely help me in my next project.

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would work?

Thanks, I will try with some different values.

Crossposted here.