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I use this code:
b=inv(A'*A)*A'*y;
Matlab gives warning. never use inv to solve linear system
How can I fix it?

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Walter Roberson
Walter Roberson am 28 Jul. 2019

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b=inv(A'*A)*A'*y;
Multiply both sides on the left by A'*A :
(A'*A) * b = (A'*A) * inv(A'*A) * A' * y
and for any invertable matrix, X * inv(X) is the identity matrix so (A'*A) * inv(A'*A) cancels out to identity, so
(A'*A) * b = A' * y
Multiply both sides on the left by inv(A'):
inv(A') * A' * A * b = inv(A') * A' * y
and inv(A') * A' cancels to the identity on both sides, so
A * b = y
Multiply by inv(A) on the left on both sides:
inv(A) * A * b = inv(A) * y
inverse cancels to identity, so
b = inv(A) * y
Now use the \ operator:
b = A \ y;
The above mathematics might not strictly apply if A is not a square matrix.

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NA
NA am 28 Jul. 2019
It means that instead of using
b=inv(A'*A)*A'*y;
I should use
b=A\y
Walter Roberson
Walter Roberson am 28 Jul. 2019
Yup.
NA
NA am 28 Jul. 2019
so if I have this
di=sum((r*inv(sig)).*r,2);
should be change to
di=sum((r/(sig)).*r,2);
Is it correct?
Walter Roberson
Walter Roberson am 28 Jul. 2019
That looks strange to me, seeing as it has both a matrix multiply by r ( * operator) and an element-by-element multiplication by r ( .* operator) . But if the * and .* are both correct, then yes, r/sig .* r
NA
NA am 1 Aug. 2019
I have this
RR = WW - HH * inv(HH' * WWInv * HH) * HH';
Can I change it to this one?
RR = WW - HH * (HH' * WWInv * HH)\ HH';
Walter Roberson
Walter Roberson am 2 Aug. 2019
Yes, but you should be questioning why you are doing that.
Provided that HH and WWInv are square matrices, then
inv(HH' * WWInv * HH)
equals
inv(HH)*inv(WWInv) * inv(HH')
You then right-multiply by HH' so
inv(HH)*inv(WWInv) * inv(HH') * HH'
and you group the last two together and the inv(HH') will cancel the HH, leaving
inv(HH)*inv(WWInv)
The name suggests that inv(WWInv) would probably be an existing variable named WW, so you could probably instead be using
RR = WW - HH \ WW
NA
NA am 2 Aug. 2019
Thank you. But
RR = WW - HH * inv(HH' * WWInv * HH) * HH';
RR = WW - HH *inv(HH)*inv(WWInv)
RR = 0
Walter Roberson
Walter Roberson am 2 Aug. 2019
Yes, I missed the HH pre-multiplier, but Yes, that logic appears correct. If you try it with actual random matrices, you will find that RR is 0 to within round-off error (e.g., for rand(15,15) all of the entries come out with absolute value less than 1E-13

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