# Initializing a matrix with a certain value in matlab

I have this matrix A of size 100x100. Now I have another vector Z=(1,24,5,80...) which has 100 elements. it is a column vector with 100 elements. Now for each row of the matrix A, I want its A(i,j) element to be 1 where i is the row from 1:100 and j is the column which is given by Z

So the elements that should be 1 should be 1,1 2,24 3,5 4,80 and so on

I know I can do it using a loop. But is there a direct simple way I mean one liner?

-

One way to do it is to convert the values in `Z` to absolute indices in `A` using `sub2ind`, and then use vector indexing:

``````idx = sub2ind(size(A), 1:numel(Z), Z);
A(idx) = 1;
``````

or simply in a one-liner:

``````A(sub2ind(size(A), 1:numel(Z), Z)) = 1;
``````
-

A matrix that has 100 non-zero elements out of 10000 (so only 1% non-zero) in total is best stored as sparse. Use the capability of matlab.

``````A = sparse(1:100,Z,1,100,100);
``````

This is a nice, clean one-linear, that results in a matrix that will be stored more efficiently that a full matrix. It can still be used for matrix multiplies, and will be more efficient at that too. For example...

``````Z = randperm(100);
A = sparse(1:100,Z,1,100,100);

whos A

Name        Size             Bytes  Class     Attributes
A         100x100             2408  double    sparse
``````

This is a reduction in memory of almost 40 to 1. And, while the matrix is actually rather small as these things go, it is still faster to use it as sparse.

``````B = rand(100);
timeit(@() B*A)
ans =
4.5717e-05

Af = full(A);
timeit(@() B*Af)
ans =
7.4452e-05
``````

Had A been 1000x1000, the savings would have been even more significant.

If your goal is a full matrix, then you can use full to convert it to a full matrix, or accumarray is an option. And if you want to insert values into an existing array, then use sub2ind.

-
+1 because it's easier and faster, guess I'll delete mine answer now :p – Gunther Struyf Nov 7 '12 at 22:24
+1: Forgot about `sparse`. Edit: surprisingly though, I timed `sub2ind` against `full(sparse(...))` for a 1000x1000 matrix, and `sub2ind` was faster by almost a factor of 20. Can you explain that? – Eitan T Nov 7 '12 at 22:36
also timed it, `sub2ind` is 5 times slower for me. Did you take into account the creation of `A` ie: `A=zeros(numel(Z))`? This is needed, otherwise indexing into it is of no use.. – Gunther Struyf Nov 7 '12 at 22:48
@GuntherStruyf I didn't. Okay, now `sub2ind` is about the same order of magnitude (~95%), but still consistently faster than `full(sparse(...))`. What am I missing? – Eitan T Nov 7 '12 at 23:04
By the way, I just noticed that this solution is forcing the elements not included in `Z` to be zero. This is not required by the question and might possibly miss the OP's goal. It may just be that the OP wants to set certain elements in `A` to 1, while the rest of the elements remain unchanged. – Eitan T Nov 7 '12 at 23:10