# How can I identify and summarize sets of data from matching groups in a dataframe?

Here is an example dataframe:

``````set.seed(0)
x1 <- c(1, 1, 1, 1, 1, 2, 2, 2, 2)
x2 <- c(1, 1, 0, 0, 0, 1, 1, 1, 1)
x3 <- c(1, 1, 2, 2, 4, 1, 1, 2, 1)
n  <- c(1, 1, 1, 5, 5, 1, 1, 1, 1)
y <- rnorm(9)

mydf <- data.frame(x1, x2, x3, n, y)
``````

What I would like to do is

1. identify rows with n=1 and which share identical values of (x1, x2, x3)
2. return a single row for each subset with y = mean(y) and n = length(y)
3. keep other rows the same.

for example, the new dataframe would be

``````x1 <- c(1,            1,    1,    1,    2,                 2)
x2 <- c(1,            0,    0,    0,    1,                 1)
x3 <- c(1,            2,    2,    4,    1,                 2)
n  <- c(2,            1,    5,    5,    3,                 1)
y  <- c(mean(y[1:2]), y[3], y[4], y[5], mean(y[c(6:7,9)]), y[8])

newdf <- data.frame(x1, x2, x3, n, y)
``````

I can figure this out with conditionals and loops, but I would prefer to learn more elegant way to do this.

-

By "identical values in other columns", I take it you mean that each subset is defined by the same value of `x1` in each of the rows of the subset, not that `x1` is equal to `x2`. Thanks for the example to see what you meant.

``````library("plyr")
``````

To get parts one and two

``````ddply(mydf[mydf\$n==1,], .(x1, x2, x3), summarise, n = length(y), y = mean(y))
``````

This can be `rbind`-ed with the part of `mydf` where `n!=1` to get what you said

``````rbind(
ddply(mydf[mydf\$n==1,], .(x1, x2, x3), summarise, n = length(y), y = mean(y)),
mydf[mydf\$n!=1,]
)
``````

This doesn't have the same order as you listed. If that is really important, you can add some auxiliary sorting variables.

``````mydf\$order = seq(length=nrow(mydf))
newdf <- rbind(
ddply(mydf[mydf\$n==1,], .(x1, x2, x3), summarise,
n = length(y), y = mean(y), order=min(order)),
mydf[mydf\$n!=1,]
)
newdf <- newdf[order(newdf\$order),]
newdf\$order <- NULL
``````
-
that works very nicely. thanks. sorry for the ambiguity. –  Abe Aug 29 '11 at 20:03