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")
```