Sorry to take a while, busy week. Neither are wrong. You'll notice that the only difference in the outputs is that the sparse version puts all the rows with nonzero diagonals at the top of the matrix, while the full version leaves them in place. Thus, to get the nonzero pattern you want from the sparse matrix, do something like this
R = qr(A); % A is sparse
[I, J, S] = find(R); % Dismantle R
pivots = accumarray(I, J, [], @min); % Find min col in each nz row
I = pivots(I); % Translate the rows
R = sparse(I, J, S, size(Rs, 1), size(Rs, 2));
The matrices should be now be the same up the the signs of the rows. You can probably do this slightly more efficiently, but it should do the trick, avoiding full matrices.
