The other answers are all good approaches. However, there are a few other options in R that haven't been mentioned, including
approx, which may give better fits or faster performance.
The advantages are more easily demonstrated with an alternate dataset:
sigmoid <- function(x)
Here is the data overlaid with the sigmoid curve that generated it:
This sort of data is common when looking at a binary behavior among a population. For example, this might be a plot of whether or not a customer purchased something (a binary 1/0 on the y-axis) versus the amount of time they spent on the site (x-axis).
A large number of points are used to better demonstrate the performance differences of these functions.
smooth.spline all produce gibberish on a dataset like this with any set of parameters I have tried, perhaps due to their tendency to map to every point, which does not work for noisy data.
approx functions all produce usable results, although just barely for
approx. This is the code for each using lightly optimized parameters:
loessFit <- loess(y~x, dat, span = 0.6)
loessFit <- data.frame(x=loessFit$x,y=loessFit$fitted)
loessFit <- loessFit[order(loessFit$x),]
approxFit <- approx(dat,n = 15)
lowessFit <-data.frame(lowess(dat,f = .6,iter=1))
And the results:
As you can see,
lowess produces a near perfect fit to the original generating curve.
Loess is close, but experiences a strange deviation at both tails.
Although your dataset will be very different, I have found that other datasets perform similarly, with both
lowess capable of producing good results. The differences become more significant when you look at benchmarks:
> microbenchmark::microbenchmark(loess(y~x, dat, span = 0.6),approx(dat,n = 20),lowess(dat,f = .6,iter=1),times=20)
expr min lq mean median uq max neval cld
loess(y ~ x, dat, span = 0.6) 153.034810 154.450750 156.794257 156.004357 159.23183 163.117746 20 c
approx(dat, n = 20) 1.297685 1.346773 1.689133 1.441823 1.86018 4.281735 20 a
lowess(dat, f = 0.6, iter = 1) 9.637583 10.085613 11.270911 11.350722 12.33046 12.495343 20 b
Loess is extremely slow, taking 100x as long as
Lowess produces better results than
approx, while still running fairly quickly (15x faster than loess).
Loess also becomes increasingly bogged down as the number of points increases, becoming unusable around 50,000.
EDIT: Additional research shows that
loess gives better fits for certain datasets. If you are dealing with a small dataset or performance is not a consideration, try both functions and compare the results.