About: Normal eigenvalue

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In mathematics, specifically in spectral theory, an eigenvalue of a closed linear operator is called normal if the space admits a decomposition into a direct sum of a finite-dimensional generalized eigenspace and an invariant subspace where has a bounded inverse.The set of normal eigenvalues coincides with the discrete spectrum.

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  • In mathematics, specifically in spectral theory, an eigenvalue of a closed linear operator is called normal if the space admits a decomposition into a direct sum of a finite-dimensional generalized eigenspace and an invariant subspace where has a bounded inverse.The set of normal eigenvalues coincides with the discrete spectrum. (en)
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  • In mathematics, specifically in spectral theory, an eigenvalue of a closed linear operator is called normal if the space admits a decomposition into a direct sum of a finite-dimensional generalized eigenspace and an invariant subspace where has a bounded inverse.The set of normal eigenvalues coincides with the discrete spectrum. (en)
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  • Normal eigenvalue (en)
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