# partial row-sums in multidimensional arrays

I have a question on how to apply R functions to multidimensional arrays.

For example, consider this operation, where I reduce an entry by the sum of other entries.

``````ppl["2012",,,,,1] <- ppl["2012",,,,,1]
- ppl["2012",,,,,2] - ppl["2012",,,,,3] - ppl["2012",,,,,4]
- ppl["2012",,,,,5] - ppl["2012",,,,,6] - ppl["2012",,,,,7]
- ppl["2012",,,,,8]
``````

While in this case subtracting individual values might be feasible, I would prefer a vector-oriented approach.

If I was familiar with multidimensional matrix algebra I could probably come up with the matrix that performs the necessary operation when applied, but this is too complex given the number of dimensions involved.

`sum(ppl["2012",,,,,2:8])` is not the correct solution, as `sum()` always returns scalars.

I could use loops that perform the necessary operations, but that contradicts the paradigm of vector-oriented programming.

Edit: And here is the solution to the original problem, based on Andrie's suggestion: `ppl[paste(i),land,,,,1] <- ppl[paste(i),land,,,,1] - apply(ppl[paste(i),land,,,,2:8],c(1,2,3),sum)`

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You need to use `apply` with `sum` to get what you want. However, as you did not provide an example with data, I am unable to give you the exact code. –  Henrik Apr 12 '11 at 13:50

EDITED

Here is an example of using `apply` and `sum` to return the sum computed across a multi-dimensional table:

``````mat <- array(1:27, dim=c(3, 3, 3))
``````

Let's say you'd like to compute the sum of the third dimension for each combination of the first two dimension.

Then the code to do this becomes:

``````apply(mat, c(1,2), sum)

[,1] [,2] [,3]
[1,]   30   39   48
[2,]   33   42   51
[3,]   36   45   54
``````
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Thanks for your answer! Indeed, those two sums are identical, but I do not want to subtract the total sum. Instead, I want to calculate for every year, every country, every household composition etc. the sum of values in the last dimension. –  mzuba Apr 12 '11 at 14:01
@Martin Zuba, thank you for your comment. I have modified my answer to reflect this. –  Andrie Apr 12 '11 at 14:09
Yes, that is what I need! Some sort of sum algorithm, that will return a result with one dimension less than that of the original set. Thanks a lot! –  mzuba Apr 12 '11 at 14:17