# Covariance between two matricies in MATLAB

I have two matricies, X and Y, with each column representing multiple realizations of a random variable;

``````X = [x_11  x_21  .... x_n1
x_12  x_22  .... x_n2
.     .    ....  .
.     .    ....  .
x_1m  x_2m  .... x_nm]
``````

And where Y is a function of X: Y = f(X)

``````Y = [y_11  y_21  .... y_n1
y_12  y_22  .... y_n2
.     .    ....  .
.     .    ....  .
y_1m  y_2m  .... y_nm]
``````

I want to find the covariance matrix between the variables x_n and y_n;

``````E{(X - E{Y}) * (Y - E{Y})^H}
``````

Where ()^H denotes the Hermitian Transpose of the vector

In matlab, when I run `cov(X,Y)` on the matricies, (each 1000 trials of 20 variables) I only get a 2x2 matrix back, which leads me to believe that it is treating each matrix as a single "variable" somehow. If I concatenate the two matricies and call `cov` on the result:

``````cov( [X Y] )
``````

I get a 40x40 matrix, with the result of `cov( X )` in the top left, the result of `cov( Y )` in the bottom right, and the matrix I want in the top right and bottom left, but is there a way to calculate this without having to resort to this?

Thanks

-

`cov(X,Y)` is equivalent to `cov([x(:) y(:)])`. But `[x(:) y(:)]` is 20000 by 2 for you, and `cov()` treats rows as observations and columns as dimensions, so you get a 2 by 2 covariance matrix.
``````bsxfun(@minus,x,mean(x))'*bsxfun(@minus,y,mean(y))/(size(x,1)-1)
If you have an older version of matlab that doesn't support `bsxfun()`, just use `repmat()`.