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Diagonalizable matrices are dense in C^nxn. What this means for floating point calculations is that rounding error makes matrices diagonalizable --- the result for eig(A) is eig(Ap) where |A - Ap| <= floating point error and Ap is diagonalizable. Standard numerical algorithms that compute eigenvalues will give such results. Eigenvalues of a real matrix ...


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If A were not diagonalizable, the vectors in P would be linearly dependent. However, due to numerical errors they might be just very close to being linearly dependent. For instance, consider P = array([[1, 0],[1, 0.001]]) let Pm1 = inv(P) Then P * Pm1 - eye(2) would be far from zero [[ 0. 0.] [-1000. 0.]] Always look at the condition ...


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You can use SymPy. It has a function is_diagonalizable. It checks if the matrix is diagonalisable.


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Summary As of R version 3.2.1 (World-Famous Astronaut) diag() has received an update. The discussion moved to r-devel where it was noted that c() strips non-name attributes and may have been why it was placed there. While some people worried that removing c() would cause unknown issues on matrix-like objects, Peter Dalgaard found that, "The only case where ...



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