quasieigen

Quasieigen is a term used in mathematics and physics to denote objects that closely resemble eigenvalues and eigenvectors but are not exact solutions to an eigenvalue problem. It typically arises when a system is perturbed, discretized, or otherwise difficult to solve exactly, and one seeks robust approximations to the spectral data of a linear operator.

Formally, for a linear operator A on a finite-dimensional inner product space, a pair (λ, x) with

Quasieigenpairs are central in numerical linear algebra, where they arise in methods such as the Ritz method:

The ε-pseudospectrum of an operator is the set of λ for which (A − λI) is nearly singular,

In physics, the notion appears as quasi-eigenstates or quasi-energy levels, used to describe resonance-like or metastable

See also: eigenvalue, Ritz values, perturbation theory, pseudospectrum.