Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have the ctlns list and I am trying to produce some visualization of the data

ctlns<-list(structure(list(level = 10, x = c(0.101666666666667, 0.06, 
0.0385714285714286, 0.035, 0.035, 0.035, 0.04, 0.0433333333333333, 
0.05, 0.0516666666666667, 0.06, 0.0606416584402764, 0.0606416584402764, 
0.0766666666666667, 0.0766666666666667, 0.0933333333333333, 0.0933333333333333, 
0.0975, 0.11, 0.110956351152526, 0.110956351152526, 0.135, 0.135
), y = c(0.01, 0.04125, 0.06, 0.11, 0.16, 0.21, 0.26, 0.31, 0.36, 
0.41, 0.458123195380173, 0.46, 0.51, 0.56, 0.61, 0.66, 0.71, 
0.76, 0.808123195380173, 0.81, 0.86, 0.91, 0.96)), .Names = c("level", 
"x", "y")))

Then I,

 plot(ctlns[[1]]$x,ctlns[[1]]$y, xlim=c(0,.21), ylim=c(0,1), lwd=2, type="l", col="darkred" )

And I get the plot enter image description here

I would like to smooth the upper part of the red curve (y>0.2) while maintaining some of the curved structure (y<0.2)

lines(lowess(ctlns[[1]]$x,ctlns[[1]]$y,f=2/3), lwd=2, col="darkblue")

does a fine job for the former part but deletes the lower part of the curve. I have the following questions:

  1. Why does this happen that?
  2. How can I preserve and smooth the lower part of the red curve? Or maybe combine curves/smooth lines?
  3. Ignoring the red curve, how can I instruct lowess based on the blue curve data to extrapolate the values till y=0?

EDIT after discussion with agstudy

Because of of the curved nature of the red line, I was thinking what I need is probably a not a function smoothing y~x but rather a graph function that connects the points x, y with some kind of curved line. The points should be connected in order they appear within their vectors (x[1] with y[1] and so on...)

enter image description here

Is this possible?

share|improve this question
Does lowess even work for double-valued functions? I'd be surprised if it did. Try swapping $x and $y , doing the fit, and then swapping back if desired. –  Carl Witthoft Jan 9 '13 at 14:03
Could you explain a bit more? –  ECII Jan 9 '13 at 14:09
Well, do you know the definition of a function, and surjective/injective types? Take a look at the wikipedia page. My point is that, for your data, y=f(x) is not single-valued, while x=g(y) is. –  Carl Witthoft Jan 9 '13 at 15:40
You are correct. Please see revised edit –  ECII Jan 9 '13 at 15:41

2 Answers 2

up vote 3 down vote accepted

You probably want to use the xspline function (or grid.xspline if using grid graphics).

plot( ctlns[[1]], type='l', col='red' )
xspline( ctlns[[1]], shape=1, border='blue' )

You can do some pre smoothing of the data which might help some as well:

tmp.x <- ctlns[[1]]$x
tmp.y <- ctlns[[1]]$y

tmp <- cumsum( c(TRUE, head(tmp.x,-1) != tail(tmp.x,-1) ) )

tmp2.x <- tapply( tmp.x, tmp, mean )
tmp2.y <- tapply( tmp.y, tmp, mean )

xspline( tmp2.x, tmp2.y, shape=1, border='green' )

or using loess for the smoothing:

fit <- loess( tmp.y ~ tmp.x+tmp )
tmp3.y <- tapply( fitted(fit), tmp, mean )
xspline( tmp2.x, tmp3.y, shape=1, border='orange' )
share|improve this answer
This is fantastic! Thanks a lot. Is there any way to smooth the upper part (y>0.2) a bit more as to resemble a straight line? –  ECII Jan 10 '13 at 18:17
@ECII, not easily using just xspline. I tried values of shape greater than 1 and some did smooth it a bit more, but there were also strange artifacts doing that (and the documentation says to only use values between -1 and 1). You can presmooth the data, see my edits above for one possibility. –  Greg Snow Jan 10 '13 at 18:43
Great. Thank you very much. Its exactly what I need. Do you mind explaining a bit your pre smoothing? –  ECII Jan 10 '13 at 19:00
The tmp vector just captures when x values that are next to each other in the vector also have the same value. So we just take the mean of the y-values for duplicated x's (but only neighboring duplicates). –  Greg Snow Jan 10 '13 at 19:03

to answer part 2 of your question:

            ctlns[[1]]$y[ctlns[[1]]$y<0.2]), lwd=2, col="darkblue")

For the first part of your question , I guess that the algorithm is designed to work on function (mathematical defintion of the term) it removes the duplicates on x.

Edit after OP comment!

for me this is good , at least that I use LOESS function in an optimal manner. If you want to join all parts you create a small line for points that create problem.

 ids <- duplicated(ctlns[[1]]$x) & ctlns[[1]]$y < 0.25
 lines(ctlns[[1]]$x[ids],ctlns[[1]]$y[ids], lwd=4, col="darkblue")

enter image description here

share|improve this answer
dude, you have to check your answers before submitting. Your revised answer still does not work (problems with syntax) –  ECII Jan 9 '13 at 15:05
@ECII tahnks!fixed! –  agstudy Jan 9 '13 at 15:07
Sorry for being bit harse but this looks bad plot(ctlns[[1]]$x,ctlns[[1]]$y, xlim=c(0,.21), ylim=c(0,1), lwd=2, col="darkred" );lines(lowess(ctlns[[1]]$x,ctlns[[1]]$y,f=2/3), lwd=2, col="darkblue");lines(lowess(ctlns[[1]]$x[ctlns[[1]]$y<0.2], ctlns[[1]]$y[ctlns[[1]]$y<0.2]), lwd=2, col="darkblue");ids <- duplicated(ctlns[[1]]$x) & ctlns[[1]]$y < 0.25; lines(ctlns[[1]]$x[ids],ctlns[[1]]$y[ids], lwd=4, col="darkblue") –  ECII Jan 9 '13 at 15:11
No no problem .But looks bad is subjective, isn'it? –  agstudy Jan 9 '13 at 15:14
Bad is subjective. But I think you understand what I am looking for. Anyway thanks for your time and effort. –  ECII Jan 9 '13 at 15:17

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.