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Finding inv(A) for Ax=b system

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Asif Arshid
Asif Arshid el 27 de Jul. de 2017
Comentada: M.Shaarawy el 20 de Mayo de 2019
I tried 3 methods to solve the system for inv(A), where A is highly sparse matrix spy(A) is given below:
1) pinv(A)......... Matlab solve it in 190 sec without any warnings.
2) A\b............. Matlab took only 10 sec but gives warning "Matrix is singular to working precision"
3) [L,U]=lu(A); inv(L)*inv(U) .......... Matlab took 50 sec but give the same warning as in 2nd method.
Is there anyway, I can get inv(A) without warnings.
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Jan
Jan el 27 de Jul. de 2017
Editada: Jan el 27 de Jul. de 2017
@Asif Arshid: What is your question? You observed that the slash operator has a different sensitivity to detect near to singular matrices than lu and inv(L)*inv(U). What is the condition number of the matrix? Do you think that slash is to pessimistic or the lu method too sloppy? Or are you surprised by the speed of the slash operator?
Asif Arshid
Asif Arshid el 27 de Jul. de 2017
@Stephen: I tried "mldivide", but its gives warning of "Matrix is singular to working precision".
@Jan: my question is, I need to solve my system for "x" in less time than "pinv" (190 sec). The condition number is 4.7167e+17.

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Star Strider
Star Strider el 27 de Jul. de 2017
Use the lsqr (link) or similar function to solve sparse matrix problems.
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Star Strider
Star Strider el 27 de Jul. de 2017
@Walter — Thank you.
M.Shaarawy
M.Shaarawy el 20 de Mayo de 2019
Is there regularized parameterized trust region sub problem (RPTRS) in MATLAB to solve this kind of problem?

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