I have two vectors,
x is a vector where each entry represents a month for a period of several years, so I have (let's say) 10 years of data, then
length(x) = 120 and so on.
(I have used the "posix.ct" command so they really are "months" in that sense, but couldn't I just have
x as a numerical vector like
c(1:n) or something, since I already know which month and which year a certain element of
c(1:n) corresponds to? i.e if
x = c(1:n), I know that
x is february of the second year and so on..)
y is a vector where each elements is an observation of a particular variable at a certain month. So the observed data is grouped like this (january,0.123), (february,2.125) and so on. I have two vectors for the months;
x1 = seq(as.POSIXct("YYYY-MM-DD", tz="GMT"), as.POSIXct("YYYY-MM-DD", tz="GMT"), by="month") x2 = c(1:length(x1))
What I want to do is to run ksmooth:
plot(x1,y) smooth = ksmooth(x2,y,"normal") lines(smooth)
The reason that I use x1 in the plot() command is that I don't know how to otherwise get the x-axis in time.
R should automatically find a decent smoothing parameter when I haven't specified anything. The result is that ksmooth$y is equal to the input vector y! Also, a vertical bar is produced in the plot. If I replace
x1 in the code above,
ksmooth$y is NA for all values except for the first and last, which equal those of the input
So i try some bandwidths:
h = 0.1: now
smooth$y = y, as before. A vertical bar is produced (it is the same color as I specified in the
lines() command, so it must have to do with the
h = 10: get some non-strange results for smooth$y, however, a vertical bar is produced as before.
Then, I tried the crazy idea of very large bandwidths;
h = 1e+06: This produced nothing when I used
x2 as in the code above. When I changed
x1 however, I get some good results. For
h = 1e+09 (that's huge!!) I get a very nice result. (I get a curve that fits the data and looks nice)
h = 1e+09, is that reasonable? in all the examples I have looked h is something betweeen 0.1 and 10, give or take. heard something about a rule of thumb: h should equal n^(-1/5) where n is the number of data points.