# Extract confidence interval values from ACF correlogram

In R, we can run an ACF correlogram of time series and the confidence interval bands will be plotted in light blue. But when I pull the structure of ACF object, I cannot find these values. Does anyone know how to extract the values of the confidence interval bands?

e.g.

List of 6
$acf : num [1:27, 1, 1] 1 0.06453 -0.06354 0.00213 -0.01324 ...$ type  : chr "correlation"
$n.used: int 501$ lag   : num [1:27, 1, 1] 0 1 2 3 4 5 6 7 8 9 ...
$series: chr "tser[i:(i + 500)]"$ snames: NULL
- attr(*, "class")= chr "acf"


I've had a look at the function and I can't see an easy way to extract the confidence interval. The region is calculated in the plot.acf function. To see this function, use

getS3method("plot", "acf")


In this function, there is a variable clim, this is the one you are after. The easiest way is to copy plot.acf to myplot.acf, but return the clim value.

• thanks for that. It doesn't look like too easy of a task, but if I can't find any other way... I will have to try to modify the code. Any quick posts on how exactly to modify would be appreciated.
– pat
Commented Jan 11, 2013 at 0:13
• @pat Just comment out the return statements and instead return clim Commented Jan 11, 2013 at 19:02
• This should be accepted as the answer. Here is code to pull function: dump("plot.acf",file = "function_dump_plot_acf.txt", envir=asNamespace("stats")). Also one need to replace invisible() with return(clim) Commented Oct 30, 2017 at 18:20
• It would be useful if someone edited this answer to clearly show the code suggested by user1700890,including where to replace invisible() and what does the return(clim)? Commented Nov 30, 2020 at 8:28

I know this question is super old but if anyone does want the confidence interval values it's just the z-value of the confidence level divided by the sqrt of the number of observations used. In the plot.acf function this is calculated here:

clim0 <- if (with.ci)
qnorm((1 + ci)/2)/sqrt(x$n.used)  where with.ci is a logical value indicating if the user wants to plot the confidence intervals or not and ci is the desired confidence level (e.g. .95, .9, etc...) EDIT: This is the confidence interval if you assume the lagged values are white noise, if this isn't the case there is a correction you can apply clim <- clim0 * sqrt(cumsum(c(1, 2 * x$acf[-1, i, j]^2)))


• The question might be super old, but this answer is super helpful too! So the confidence intervals are simply $\pm \frac{z_{a/2}}{\sqrt{n}}$, where $a$ is the significance level and $n$ the size of the data. Commented Oct 22, 2020 at 16:39

Okay, so you have a series X, and you use the builtin stats::acf function to compute the autocorrelation function values. To have a concrete example:

X     <- c(seq(20,10,-1),seq(1,20))
X_ACF <- acf(X) # by default the same as acf(X, ci.type="white")


You'll get a plot with confidence intervals at a constant value acf(X, ci.type="white") (for the default white-noise null hypothesis) or nonconstant value acf(X, ci.type="ma") (for a moving average assumption). See documentation for plot.acf for info on the difference.

However, counterintuitively, the data for confidence intervals in those plots are not included in the object returned by acf(). But, you can still get them yourself pretty easily. To answer your question directly, here is a function to get these confidence intervals from an "acf" object (inspired by @csgillespie's suggestion):


get_clim <- function(x, ci=0.95, ci.type="white"){
#' Gets confidence limit data from acf object x
if (!ci.type %in% c("white", "ma")) stop('ci.type must be "white" or "ma"')
if (class(x) != "acf") stop('pass in object of class "acf"')
clim0 <- qnorm((1 + ci)/2) / sqrt(x$n.used) if (ci.type == "ma") { clim <- clim0 * sqrt(cumsum(c(1, 2 * x$acf[-1]^2)))
return(clim[-length(clim)])
} else {
return(clim0)
}
}


Use it like

get_clim(X_ACF, ci.type = "white") # returns a single ci limit value (ci is plus or minus this value)

[1] 0.3520199

get_clim(X_ACF, ci.type = "ma")    # returns a list of values, one per value of X_ACF$acf   [1] 0.3520199 0.5589558 0.6672833 0.7277000 0.7583282 0.7702831 0.7724234 0.7726377 0.7778812 0.7935320 [11] 0.8225467 0.8650100 0.9061862 0.9443976  Now, to show that this worked, and since it may be useful, here's a function which makes ggplot2 plots corresponding to the default base R plots above. library(ggplot2) theme_set(theme_minimal()) ggplot_acf <- function( x, ci=0.95, ci.type="white", ci.col = "blue"){ #' Replicates plot.acf() but using ggplot by default instead of base R plot #' x must be an object of class "acf" such as that outputted by acf() #' ci.type must be "white" or "ma" if (!ci.type %in% c("white", "ma")) stop('ci.type must be "white" or "ma"') if (class(x) != "acf") stop('pass in object of class "acf"') with.ci <- ci > 0 && x$type != "covariance"
with.ci.ma <- with.ci && ci.type == "ma" && x$type == "correlation" if(with.ci.ma && x$lag[1L, 1L, 1L] != 0L) {
warning("can use ci.type=\"ma\" only if first lag is 0")
with.ci.ma <- FALSE
}
clim <- get_clim(x, ci=ci, ci.type=ci.type)
df <- data.frame(lag = x$lag, acf=x$acf)
p <- ggplot(df, aes(x=lag)) +
geom_linerange(aes(ymax=acf, ymin=0)) +
labs(y="ACF", x="Lag")
if (with.ci) {
if (ci.type == "white") {
p <- p +
geom_hline(yintercept = 0-clim, lty = 2, col = ci.col) +
geom_hline(yintercept = 0+clim, lty = 2, col = ci.col)
} else if (with.ci.ma && ci.type == "ma") { # ci.type="ma" not allowed for pacf
dfclim <- df[-1,]
dfclim\$clim <- clim
p <- p +
geom_line(data = dfclim, aes(y = 0-clim), lty = 2, col = ci.col) +
geom_line(data = dfclim, aes(y = 0+clim), lty = 2, col = ci.col)
}
}
return(p)
}


To check that this is working, lets plot the resulting ggplot objects next to their corresponding base R plots made by plot.acf.

library(patchwork)
p11 <- ggplot_acf(X_ACF, ci.type="white") + labs(subtitle="ggplot version")
p12 <- wrap_elements(panel=~plot(X_ACF, ci.type="white"))  + labs(subtitle="base R version")

old_par <- par(mar = c(0,0,0,0), bg = NA)
(p11+p12)
par(old_par)

p21 <- ggplot_acf(X_ACF, ci.type="ma") + labs(subtitle="ggplot version")
p22 <- wrap_elements(panel=~plot(X_ACF, ci.type="ma")) + labs(subtitle="base R version")

old_par <- par(mar = c(0,0,0,0), bg = NA)
(p21+p22)
par(old_par)


• the function I made is inspired by @csgillespie 's suggestion to look in the source code for plot.acf, and I tried to keep it agnostic as to what kind of confidence interval you want, reflecting the assumption you have as your null hypothesis, as @matt-mills mentioned in their answer. Commented Feb 7, 2023 at 4:25
• You can also use this to make Partial ACF plots like ggplot_acf(pacf(X)). Commented Feb 7, 2023 at 4:38