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Is there an easy way to calculate the derivative of non-liner functions that are give by data?

for example:

x = 1 / c(1000:1)

y = x^-1.5
ycs = cumsum(y)

plot (x, ycs, log="xy")

How can I calculate the derivative function from the function given by ´x´ and ´ycs´?

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What exactly is your desired result in this example? – danas.zuokas Jun 18 '12 at 10:37
All the answers assume that you do not actually know the underlying type of function. If you knew the model, you could simply do non-linear regression. – Roland Jun 18 '12 at 11:32
up vote 6 down vote accepted

Was also going to suggest an example of a smoothed spline fit followed by prediction of the derivative. In this case, the results are very similar to the diff calculation described by @dbaupp:

spl <- smooth.spline(x, y=ycs)
pred <- predict(spl)

plot (x, ycs, log="xy")
lines(pred, col=2) <- diff(ycs)/diff(x) <- predict(spl, deriv=1)

lines($y, col=2)
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The derivative of a function is dy/dx, which can be approximated by Δy/Δx, that is, "change in y over change in x". This can be written in R as <- diff(ycs)/diff(x)

and now contains an approximation to the derivative of the function at each x: however it is a vector of length 999, so you will need to shorten x (i.e. use x[1:999] or x[2:1000]) when doing any analysis or plotting.

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Generating derivatives from raw data is risky unless you are very careful. Not for nothing is this process known as "error multiplier." Unless you know the noise content of your data and take some action (e.g. spline) to remove the noise prior to differentiation, you may well end up with a scary curve indeed.

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