This is an interesting question because I think the optimal solution is different for the mean than it is for the other sample statistics.

I've provided a simulation example below that you can work through.

First, choose some arbitrary parameters and simulate some data:

```
%#Set some arbitrary parameters
T = 100; N = 5;
WindowLength = 10;
%#Simulate some data
X = randn(T, N);
```

For the mean, use `filter`

to obtain a moving average:

```
MeanMA = filter(ones(1, WindowLength) / WindowLength, 1, X);
MeanMA(1:WindowLength-1, :) = nan;
```

I had originally thought to solve this problem using `conv`

as follows:

```
MeanMA = nan(T, N);
for n = 1:N
MeanMA(WindowLength:T, n) = conv(X(:, n), ones(WindowLength, 1), 'valid');
end
MeanMA = (1/WindowLength) * MeanMA;
```

But as @PhilGoddard pointed out in the comments, the `filter`

approach avoids the need for the loop.

Also note that I've chosen to make the dates in the output matrix correspond to the dates in `X`

so in later work you can use the same subscripts for both. Thus, the first `WindowLength-1`

observations in `MeanMA`

will be `nan`

.

For the variance, I can't see how to use either `filter`

or `conv`

or even a running sum to make things more efficient, so instead I perform the calculation manually at each iteration:

```
VarianceMA = nan(T, N);
for t = WindowLength:T
VarianceMA(t, :) = var(X(t-WindowLength+1:t, :));
end
```

We could speed things up slightly by exploiting the fact that we have already calculated the mean moving average. Simply replace the within loop line in the above with:

```
VarianceMA(t, :) = (1/(WindowLength-1)) * sum((bsxfun(@minus, X(t-WindowLength+1:t, :), MeanMA(t, :))).^2);
```

However, I doubt this will make much difference.

If anyone else can see a clever way to use `filter`

or `conv`

to get the moving window variance I'd be very interested to see it.

I leave the case of skewness and kurtosis to the OP, since they are essentially just the same as the variance example, but with the appropriate function.

A final point: if you were converting the above into a general function, you could pass in an anonymous function as one of the arguments, then you would have a moving average routine that works for arbitrary choice of transformations.

Final, final point: For a sequence of window lengths, simply loop over the entire code block for each window length.