# How to connect points with curved and smooth lines

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

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...)

Is this possible?

-
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

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' )
``````
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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:

``````lines(lowess(ctlns[[1]]\$x[ctlns[[1]]\$y<0.2],
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")
``````

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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