What is the difference between Gram-Smith QR decomposition procedure and qr.m function in Matlab?

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Osama Al-Shalali
Osama Al-Shalali le 28 Sep 2020
Commenté : Christine Tobler le 22 Oct 2020
Hi everyone!
I want to know what is the differnce between the Gram-Smith procedure and qr.m function in matlab. Why there is a fourth coulmn resulting from using qr.m function? The photo is attached for the Gram-Smith procedure .Any help will be so appreciated.
The code is
A=[1 -2 -1; 2 0 1; 2 -4 2;4 0 0];
[Q,R] = qr(A)
The result is
Q =
-0.2000 0.4000 0.8000 -0.4000
-0.4000 -0.2000 -0.4000 -0.8000
-0.4000 0.8000 -0.4000 0.2000
-0.8000 -0.4000 0.2000 0.4000
R =
-5.0000 2.0000 -1.0000
0 -4.0000 1.0000
0 0 -2.0000
0 0 0

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Réponse acceptée

Christine Tobler
Christine Tobler le 28 Sep 2020
MATLAB's QR decomposition is computed using Householder transformations, which is generally more numerically advantageous.
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f
f le 22 Oct 2020
Modifié(e) : f le 22 Oct 2020
Just a tiny detail: Matlab's qr does not ensure that det(Q)=1. The determinant of Q may be 1 or -1; it is data-dependent, since it is (-1)^(number_of_nontrivial_reflectors_used). So it cannot be used in a straightforward way to determine the sign of det(A).
Christine Tobler
Christine Tobler le 22 Oct 2020
Good point, det(R) will only tell you the absolute value of the original matrix, otherwise you would have to construct the complete Q matrix to compute the sign of its determinant.

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