There are two reasons that the results don't match:
1) When the matrix is not full-rank, the QR-based solver in decomposition only uses the upper left triangle of the R matrix returned from QR. I have replicated this in output x3 in the code below.
2) The matrix Q in decomposition is stored in a more compact format (Householder reflectors) than the one returned by the QR function. This results in some differences on the level of round-off error.
load post.mat
x1 = decomposition(CA,'qr')\b_f;
[qq2,rr2,pp2] = qr(CA);
x2= pp2 * (rr2\(qq2'*b_f));
norm(x1 - x2)
rk = 44;
m = size(CA, 1);
nrhs = size(b_f, 2);
[qq2,rr2,pp2] = qr(CA);
x3 = pp2 * [(rr2(1:rk, 1:rk)\(qq2(:, 1:rk)'*b_f)); zeros(m-rk, nrhs)];
norm(x1 - x3)
