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I went through many solutions for that problem, but could not find a reliable automated one. Please find below a detailed self-suficient description.

These are the data: data.txt

x y
1 1
2 2
3 3
4 2
5 1

Plotting as a scatter plot:


You will see a peak, my question is now: assuming I am happy with the linear interpolation, what is the width at half maximum of that "curve"? So for which values x0 of x I have f(x0)=max(y)/2, where f is the linear interpolation. I tried with approxfun and some kernel density, but I do not want to smooth my data.

Any input is very welcome.

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having two '4' values in your x data is evil. –  Bathsheba Sep 16 '13 at 11:20
@Bathsheba I am guessing OP means 5. –  nograpes Sep 16 '13 at 11:27
@nograpes: I'd hope so as it doesn't fit well with 'inverse'. –  Bathsheba Sep 16 '13 at 11:34
Ups, you are right, that should be a 5 –  Xavier Prudent Sep 16 '13 at 11:35
I'd be tempted to create a new pair of data: xfine<-seq(1,5,by=.01) and yfine from using predict on xfine ; then something like xfine[which(abs(yfine-mean(y))< .02)] :-) –  Carl Witthoft Sep 16 '13 at 13:33

1 Answer 1

There are probably a lot of better ways of doing this, but here is one solution. It would be easier if we knew how you did the interpolation in the first place.

# Extend your line for testing

# Split into linear segments.

# Calculate desired value

# Loop through and find value
for(i in 1:(length(seg.points)-1)) {
  if ((val>=start & val<=end) | (val<=start & val >=end)) {
    slope=(end-start)/(seg.points[i+1] - seg.points[i])
    res<-c(res,seg.points[i] + ((val - start) / slope))
# [1] 2.5 3.5 6.5
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Thanks for that fast answer! In the first place I simply used the type="l" option, then expressfun(). I will try your solution and let you know. –  Xavier Prudent Sep 16 '13 at 12:29

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