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I need to do rolling medians..(running medians) in R of 3 and 7 and plot them. I know that using smooth(x,"3R") iterates until it converges. But I want to do running medians of 7 to compare, which I am entering as for my variable:

xR7 <- rollmedian(x,7)
Age # at Age
0   558
1   513
2   582
3   604
4   584
5   566
6   562
7   524
8   529
9   430
10  497

How do I know when it converges? Is there a test?

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1 Answer 1

Repeated smoothing with medians will progressively eat away at both ends of x until it vanishes. You need some convention to assign values to the running medians at the ends. One way is "copying on": just replicate the first valid value back to the beginning and the last valid value on to the end.

One way to check for convegence--a fairly severe one, but probably safe in this context--is to stop only when successive iterations are exactly the same. Use identical.

This leads to the following procedure:

library(zoo)

rollmedianR <- function(x, k=3) {
  n <- length(x)
  k.low <- floor((k+1)/2)
  k.high <- n + 1 - k.low
  repeat {
    y <- rollmedian(x, k, na.pad=TRUE)
    y[1:k.low] <- y[k.low]; y[k.high:n] <- y[k.high]
    if (identical(x, y)) break
    x <- y
  }
  return(y)
}

As a test, let's compare it to smooth on some random data:

set.seed(17)
x <- sin(seq(0, 2*pi, 2*pi/1000)) + rnorm(1001, 0.25)
0 >= var((smooth(x,"3R") - rollmedianR(x, 3)), rep(0.0, length(x)))

1 TRUE

Because there's no variation in the differences of the two results, they agree. Good. (By the way, this variance test would work well inside rollmedianR to check for convergence in place of identical: it is more robust to floating point errors. In principle this is not a concern for medians, because no numerical changes are occurring--values are just being copies around--but in other applications having such robustness is crucial.)

A plot can show what a long running median does:

plot(x, col="Gray", cex=0.8)
lines(rollmedianR(x,37), lwd=2, col="Red")

Plot of data and a running median

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