A quick look and I couldn't turn up any functions, though this isn't a fact by any means.

However, working it out from scratch, and assuming you mean a matrix such as:

```
% x=1 x=2 x=3
P = [ 0.1 0.2 0.1 % y = 1
0.1 0.1 0.2 % y = 2
0.0 0.0 0.2 ] % y = 3
```

And you mean that this describes the joint discrete distribution (joint probability mass function). That is, the entry at `(X,Y)`

contains the probability of `(X,Y)`

occurring.

I'm also assuming by your use of `N`

in mathematical notation means the natural numbers. If so, then you can use the following code.

Mean:

```
meanX = sum(P,1) * (1:size(P,2))';
meanY = sum(P,2)' * (1:size(P,1))';
```

For the central moment `K,L`

(`K`

correspnding to `X`

and `L`

corresponding to `Y`

):

```
[X,Y] = meshgrid(1:size(P,2),1:size(P,1));
integrandXY_KL = (X - meanX).^K .* (Y-meanY).^L .* P;
momentXY_KL = sum(integrandXY_KL(:));
```

And you can generalize it further if the values of X are arbitrary (and not just natural numbers) as follows. If `Xvals = [ 1 2 4 ]`

and `Yvals = [ 4 5 6 ]`

. All of the above still works, you just replace all occurences of `1:size(P,2)`

with `Xvals`

and all occurences of `1:size(P,1)`

with `Yvals`

.