About: Spectral abscissa

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In mathematics, the spectral abscissa of a matrix or a bounded linear operator is the greatest real part of the matrix's spectrum (its set of eigenvalues). It is sometimes denoted . As a transformation , the spectral abscissa maps a square matrix onto its largest real eigenvalue.

Property	Value
dbo:abstract	In mathematics, the spectral abscissa of a matrix or a bounded linear operator is the greatest real part of the matrix's spectrum (its set of eigenvalues). It is sometimes denoted . As a transformation , the spectral abscissa maps a square matrix onto its largest real eigenvalue. (en)
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rdfs:comment	In mathematics, the spectral abscissa of a matrix or a bounded linear operator is the greatest real part of the matrix's spectrum (its set of eigenvalues). It is sometimes denoted . As a transformation , the spectral abscissa maps a square matrix onto its largest real eigenvalue. (en)
rdfs:label	Spectral abscissa (en)
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