I kept banging away at this, but couldn't get it faster than the sortrows method. This exploits the fact that each pair of keys is unique, which I didn't mention above.

```
% This gives us unique rows of integers between one and 10000, sorted first
% by column 1 then 2.
x = unique(uint32(ceil(10000*rand(1e6,2))),'rows');
tic;
idx = zeros(size(x,1),1);
% Work out where each group of the second keys will start in the sorted output.
StartingPoints = cumsum([1;accumarray(x(:,2),1)]);
% Work out where each group of the first keys is in the input.
Ends = find([~all(diff(x(:,1),1,1)==0,2);true(1,1)]);
Starts = [1;Ends(1:(end-1))+1];
% Build the index.
for i = 1:size(Starts)
temp = x(Starts(i):Ends(i),2);
idx(StartingPoints(temp)) = Starts(i):Ends(i);
StartingPoints(temp) = StartingPoints(temp) + 1;
end
% Apply the index.
y = x(idx,:);
toc
tic;
z = sortrows(x,2);
toc
isequal(y,z)
```

Gives 0.21 seconds for my algorithm and 0.18 for the second (stable across different random seeds).

If anyone sees any further speed up (other than mex) please feel free to add.