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I'm performing matrix inversion using Householder transformations acting on an augmented matrix. Currently I can only perform accurate inversions for matrix dimensions up to 4x4. After this A*A^-1 != I precisely and I think it's due to back substitution.

Is there a better way to go about this?

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In general, you're always going to be subject to the limitations of floating-point arithmetic. So in general, that identity will never hold, regardless of the algorithm you use. –  Oliver Charlesworth Oct 26 '11 at 23:44
    
What datatype are your matrices? Can you use longer floating types to maintain accuracy longer? –  sarnold Oct 26 '11 at 23:45
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If you need highly accurate results, you shouldn't use floating point types at all. –  titaniumdecoy Oct 26 '11 at 23:53
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Why is this better than LU decomposition with pivoting? –  duffymo Oct 26 '11 at 23:54
    
I never said it was better, duffymo. I was asking if there was a better way. I'll take a look at LU decamp with pivoting. Thanks. –  nick_name Oct 26 '11 at 23:56

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It turns out that the 'Householder reflection with back-substitution' method is viable. When verifying that a row has zeros in the proper locations to be part of a matrix in row-echelon form, it is important to compare both the real and imaginary components of a matrix entry to zero, rather than their magnitude.

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