# Is bsxfun usable with sparse matrices

I want to a element-by-element binary operation apply to large logical vectors. The content of these vectors is manly false, so for performance considerations it better to work with sparse matrices. If i do so the resulting matrix is not correct.

Examble

``````A = logical([0;1;0;0]);
B = logical([0 0 1 1]);

C = bsxfun(@and,A,B)
``````

In this case C is

`````` C =
0     0     0     0
0     0     1     1
0     0     0     0
0     0     0     0
``````

If i use sparse matrices C is

`````` C = full(bsxfun(@and,sparse(A),sparse(B)))
C =
0     0     0     0
1     1     1     1
0     0     0     0
0     0     0     0
``````

Which is obviously wrong.

Did i oversee something or is this a Matlab bug.

-

I can reproduce this so it certainly seems to be a MATLAB bug. Especially considering that:

``````C = full(bsxfun(@times,sparse(A),sparse(B)))

C =

0     0     0     0
0     0     1     1
0     0     0     0
0     0     0     0
``````

So, I would report it to The Mathworks.

However, in this particular case, I can't help feeling that `bsxfun` with sparse matrices isn't going to be the most efficient. Consider the following:

``````A = sparse(logical([0;1;0;0]));
B = sparse(logical([0 0 1 1]));

C_bsxfun = bsxfun(@and,full(A),full(B));

[i j] = ndgrid(find(A), find(B));
C_sparse = sparse(i, j, true, numel(A), numel(B));

isequal(C_bsxfun, full(C_sparse))
``````
-
Yes i think also it is a Bug, i found out that `C = full(bsxfun(@and,double(sparse(A)),double(sparse(B))))` will also work. -- Thank you for your tip with ndgird I didn't know this function. –  Tobias Heß Dec 8 '11 at 13:22
There's also `meshgrid` which is very similar. –  Nzbuu Dec 8 '11 at 13:28
I think that's a bug. –  Sam Roberts Dec 8 '11 at 14:10
Appears to be fixed in R2012a –  Nzbuu Jun 27 '13 at 17:22