# 3D array -> apply -> 3D array

It seems `apply` will not re-assemble 3D arrays when operating on just one margin. Consider:

`````` arr <- array(
runif(2*4*3),
dim=c(2, 4, 3),
dimnames=list(a=paste0("a", 1:2), b=paste0("b", 1:4), c=paste0("c", 1:3))
)
# , , c = c1
#
#     b
# a           b1        b2        b3        b4
#   a1 0.7321399 0.8851802 0.2469866 0.9307044
#   a2 0.5896138 0.6183046 0.7732842 0.6652637
#
# , , c = c2
#     b
# a           b1        b2        b3         b4
#   a1 0.5894680 0.7839048 0.3854357 0.56555024
#   a2 0.6158995 0.6530224 0.8401427 0.04044974
#
# , , c = c3
#     b
# a           b1        b2         b3        b4
#   a1 0.3500653 0.7052743 0.42487635 0.5689287
#   a2 0.4097346 0.4527939 0.07192528 0.8638655
``````

Now, make a 4 x 4 matrix to shuffle columns around in each of `arr[, , i]`, and use `apply` to matrix multiply each `a*b` sub-matrix in `arr` to re-order their columns. The important point is that the result of each `apply` iteration is a matrix

``````cols.shuf.mx <- matrix(c(0,1,0,0,1,0,0,0,0,0,0,1,0,0,1,0), ncol=4)
apply(arr, 3, `%*%`, cols.shuf.mx)
#         c
#             c1         c2         c3
# [1,] 0.8851802 0.78390483 0.70527431
# [2,] 0.6183046 0.65302236 0.45279387
# [3,] 0.7321399 0.58946800 0.35006532
# [4,] 0.5896138 0.61589947 0.40973463
# [5,] 0.9307044 0.56555024 0.56892870
# [6,] 0.6652637 0.04044974 0.86386552
# [7,] 0.2469866 0.38543569 0.42487635
# [8,] 0.7732842 0.84014275 0.07192528
``````

Whereas, I expected the result to be:

``````# , , c = c1
#
# a            1         2         3         4
#   a1 0.8851802 0.7321399 0.9307044 0.2469866
#   a2 0.6183046 0.5896138 0.6652637 0.7732842
#
# , , c = c2
#
# a            1         2          3         4
#   a1 0.7839048 0.5894680 0.56555024 0.3854357
#   a2 0.6530224 0.6158995 0.04044974 0.8401427
#
# , , c = c3
#
# a            1         2         3          4
#   a1 0.7052743 0.3500653 0.5689287 0.42487635
#   a2 0.4527939 0.4097346 0.8638655 0.07192528
``````

I can get the expected result with `plyr::aaply` with:

``````aperm(aaply(arr, 3, `%*%`, cols.shuf.mx), c(2, 3, 1))
``````

but was wondering if there is a simple base way to achieve this result (i.e. am I missing something obvious here to get the desired outcome).

I realize what occurs here is what is documented (`If each call to FUN returns a vector of length n, then apply returns an array of dimension c(n, dim(X)[MARGIN]) if n > 1`), but it still seems weird to me that if a function returns an object with dimensions they are basically ignored.

-
Please use `set.seed` to make the data reproducible. –  Roland Jan 17 '14 at 22:28
Why not simply use `res <- apply(arr, 3, `%*%`, cols.shuf.mx); attributes(res) <- attributes(arr)`? I think this could be done purely with matrix algebra. –  Roland Jan 17 '14 at 22:43
@Roland, that works in this particular case, but what if my right operand to `%*%` was not square (i.e. result matrix not the same as input)? Good idea though. Also, sorry about `set.seed`, but it didn't seem relevant in this case since all that matters is structure. –  BrodieG Jan 17 '14 at 23:04

Here is a less than fantastic solution that requires foreknowledge of the dimensions of the function result matrix:

``````vapply(
1:dim(arr)[3],
function(x, y) arr[,,x] %*% y,
FUN.VALUE=arr[,,1],
y=cols.shuf.mx
)
``````
-
I like it. I looked at `vapply` as well but didn't follow through. –  BondedDust Jan 18 '14 at 1:34

If you read the help page for `apply`, it basically agrees with your first sentence. It is set up with a particular design and you would need to construct a new function to do something differently. BTW: This gives you the same result much more simply than that `aperm(aaply(...))` rigamarole:

``````arr[ , c(2,1,4,3)  , ]
#-------------------------
, , c = c1

b
a           b2        b1        b4        b3
a1 0.4089769 0.2875775 0.5281055 0.9404673
a2 0.8830174 0.7883051 0.8924190 0.0455565

, , c = c2

b
a           b2        b1        b4        b3
a1 0.9568333 0.5514350 0.1029247 0.6775706
a2 0.4533342 0.4566147 0.8998250 0.5726334

, , c = c3

b
a           b2         b1        b4        b3
a1 0.3279207 0.24608773 0.6405068 0.8895393
a2 0.9545036 0.04205953 0.9942698 0.6928034
``````
-
The rigamarole was just to illustrate an `apply` that returns dimensioned vectors. This solution only works for the particular example, but not for the general problem (the `aperm(aaply(...))` works for the general problem). And yes, I read the docs (see last paragraph of Q), but it seems like a very odd design decision to ignore the dimensions of the result. –  BrodieG Jan 18 '14 at 1:10