Pseudospectrum

In mathematics, the pseudospectrum of an operator is a set containing the spectrum of the operator and the numbers that are "almost" eigenvalues. Knowledge of the pseudospectrum can be particularly useful for understanding non-normal operators and their eigenfunctions.

The ε-pseudospectrum of a matrix A consists of all eigenvalues of matrices which are ε-close to A:^[1]

${\displaystyle {\mathrm{\Lambda }}_{ϵ}(A)=\{\lambda \in ℂ\mid \mathrm{\exists }x\in {ℂ}^n\setminus \{0\},\mathrm{\exists }E\in {ℂ}^{n\times n}:(A+E)x=\lambda x,\Vert E\Vert \le ϵ\}.}$

Numerical algorithms which calculate the eigenvalues of a matrix give only approximate results due to rounding and other errors. These errors can be described with the matrix E.

More generally, for Banach spaces ${\displaystyle X,Y}$ and operators ${\displaystyle A:X\to Y}$ , one can define the ${\displaystyle ϵ}$-pseudospectrum of ${\displaystyle A}$ (typically denoted by ${\displaystyle {\text{sp}}_{ϵ}(A)}$) in the following way

${\displaystyle {\text{sp}}_{ϵ}(A)=\{\lambda \in ℂ\mid \Vert (A-\lambda I{)}^{-1}\Vert \ge 1/ϵ\}.}$

where we use the convention that ${\displaystyle \Vert (A-\lambda I{)}^{-1}\Vert =\mathrm{\infty }}$ if ${\displaystyle A-\lambda I}$ is not invertible.^[2]

Template:Reflist

• Lloyd N. Trefethen and Mark Embree: "Spectra And Pseudospectra: The Behavior of Nonnormal Matrices And Operators", Princeton Univ. Press, Template:ISBN (2005).

• Pseudospectra Gateway by Embree and Trefethen

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