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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.

share|improve this question
    
Please use set.seed to make the data reproducible. –  Roland Jan 17 '14 at 22:28
1  
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

2 Answers 2

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
) 
share|improve this answer
    
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
share|improve this answer
    
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

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