# matlab: addressing of one index without sub2ind

This is very closely related to this other question, but that question wanted to avoid `sub2ind` because of performance concerns. I am more concerned about the "unelegance" of using `sub2ind`.

Let's suppose I want to create another MxN matrix which is all zeros except for one entry in each column that I want to assign from the corresponding entry in a vector, and choice of row in each column is based on another vector. For example:

``````z = zeros(10,4);
rchoice = [3 1 8 7];
newvals = [123 456 789 10];
% ??? I would like to set z(3,1)=123, z(1,2)=456, z(8,3)=789, z(7,4)=10
``````

I can use `sub2ind` to accomplish this (which I used in an answer to a closely related question):

``````z(sub2ind(size(z),rchoice,1:4)) = newvals
``````

but is there another alternative? Seems like logical addressing could be used in some way but I'm stumped, because in order to set the elements of a logical matrix to 1, you're dealing with the same element positions as in the matrix you actually want to address.

-

There's a much simpler way of doing it.

``````nCols=size(z,2);
z(rchoice,1:nCols)=diag(newvals);
``````
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clever you are, rewarded you shall be.... –  Jason S May 4 '11 at 20:58
does this actually create an NxN matrix, or is MATLAB smart enough to know what I mean? If I have 1000 values, does this work or does it run out of memory? –  Jason S May 4 '11 at 21:00
`diag` will create an `NxN` matrix. I didn't bother using sparse, as this was just a conceptual example. If you have a large number of values, you can use `spdiags(newvals',0,N,N)`. This only uses `N` elements, so won't run out of memory. –  yoda May 4 '11 at 21:04
hmm... I like the answer, and it solves the literal problem I posed, but it relies on the side-effects of being able to set other values to zero (rather than only changing other values), so I wouldn't be able to use it in other circumstances. –  Jason S May 4 '11 at 21:08
you can still do that as `dummy=z(...); dummy(1:N+1:N^2)=newvals; z(...)=dummy;` Here I've pulled the block out, replaced its diagonals and plugged it back in. This will involve an `NxN` matrix, so if you're dealing with supersized matrices, performance might be hit. But then again, this is only because you've tied our hands by not allowing `sub2ind`. So, perhaps in such large matrices, it's good to use Jonas' solution or use `sub2ind`. –  yoda May 4 '11 at 21:15
You can just add the number of rows in previous columns to `rchoice` to get the linear index directly.
``````nRows = size(z,1); %# in case you don't know this already