Computing Matrix-Matrix Addition using QR and/or SVD
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Apologies if this sounds like an uninformed question but I was wondering if there are theoretical results that talk about the following problem:
Suppose we have two 
matrices 
and 
with 
and they can be written as the following via QR decomposition:
matrices and with and they can be written as the following via QR decomposition:
and 
Is there a way we can get the QR decomposition of the matrix 
without explicitly adding 
and 
together and by only using the individual QR decomposition of both 
and 
. Specifically, I want to know if there are theoretical results that either talk about the feasibility of this algorithmically or if not? provide a justification of why it cannot be done. Also, can the same be said about the SVD of 
?
without explicitly adding and together and by only using the individual QR decomposition of both and . Specifically, I want to know if there are theoretical results that either talk about the feasibility of this algorithmically or if not? provide a justification of why it cannot be done. Also, can the same be said about the SVD of ?4 件のコメント
Jan
2021 年 7 月 4 日
This question has no relation to Matlab.
Tarek Hajj Shehadi
2021 年 7 月 4 日
編集済み: Tarek Hajj Shehadi
2021 年 7 月 4 日
I don't think I see how that would help you. Let's take the simple case where,
A=e*eye(2);
B=1/e*eye(2);
The QR decomposition of A+B is
Q=eye(2);
R=(e+1/e)*eye(2);
How do you use this to deal with the the case where (e+1/e) absorbs to 1/e in double float precision?
Tarek Hajj Shehadi
2021 年 7 月 5 日
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