solving linear system with decomposition(A,'qr') and qr(A) produce different results

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load post.mat
x1 = decomposition(CA,'qr')\b_f;
Warning: Rank deficient, rank = 44, tol = 1.470347e-01.
[qq2,rr2,pp2] = qr(CA);
x2= pp2 * (rr2\(qq2'*b_f));
Warning: Matrix is close to singular or badly scaled. Results may be inaccurate. RCOND = 3.100607e-25.
[qq3,rr3,pp3] = qr(CA,"econ","vector");
x3(pp3,:) = rr3\(qq3'*b_f);
Warning: Matrix is close to singular or badly scaled. Results may be inaccurate. RCOND = 3.100607e-25.
any(x1-x2~=0)
ans = 1x3 logical array
1 1 1
any(x3-x2~=0)
ans = 1x3 logical array
0 0 0
I know that the CA matrix is ill-conditioned. But that doesn't explain the difference in solution, right?
Also, solving the system using decomposition(CA,'lu') and lu(CA) produce the same results. So why not the 'qr' pair?

Risposta accettata

Christine Tobler
Christine Tobler il 24 Lug 2024
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;
Warning: Rank deficient, rank = 44, tol = 1.470347e-01.
[qq2,rr2,pp2] = qr(CA);
x2= pp2 * (rr2\(qq2'*b_f));
Warning: Matrix is close to singular or badly scaled. Results may be inaccurate. RCOND = 3.100607e-25.
norm(x1 - x2)
ans = 4.3604e+09
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)
ans = 1.2555e-13
  2 Commenti
Qiang Li
Qiang Li il 24 Lug 2024
Hi Christine,
I used the 'RankTolerance' option of decomposition, and compared the results. Is the 0.0024 difference coming from your second point? Thanks.
load post.mat
min(svd(CA))
ans = 3.2181e-12
x1 = decomposition(CA,'qr','RankTolerance',1e-12)\b_f;
rk = 60;
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)];
Warning: Matrix is close to singular or badly scaled. Results may be inaccurate. RCOND = 3.100607e-25.
norm(x1 - x3)
ans = 0.0024
Christine Tobler
Christine Tobler il 24 Lug 2024
Yes, it's initially coming from point (2). This is amplified by the fact that matrix CA is ill-conditioned (max / min singular value is about 3e24), which means that the full matrix R is also ill-conditioned, and so the application of R\(Q'*b) takes a small difference in Q'*b and amplifies it a lot.
While RankTolerance=1e-12 doesn't seem particularly tiny, this is an absolute tolerance (not scaled by the maximum singular value of A), meaning it corresponds to about 1e-25 in relative terms.
load post.mat
max(svd(CA))
ans = 1.1161e+13
min(svd(CA))
ans = 3.2181e-12
cond(CA)
ans = 3.4681e+24
[qq2,rr2,pp2] = qr(CA);
cond(rr2)
ans = 3.4532e+24

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