ON PROJECTIONAL ORTHOGONAL BASIS OF A LINEAR NON-SELF -ADJOINT OPERATOR
Ключевые слова:
Linear non-self-adjoint operator, real spectrum, basis, root vectors, completeness, theory of electric signals, plasma theory, discrete operator, invariant subspaces, root subspaces, completely continuous operator, eigenvectors and associated vectors, internal symmetry, projection, resolvent.Аннотация
In this paper we study spectral properties of a linear non-self-adjoint operator with an internal
symmetry of the form:
;∗ܮܳ ൌܳ ܮ ,ܲ∗ܮ ൌ ܮܲ
where ܲ∗ ൌ ܲ, ܳ∗ ൌ ܳ are orthogonal projections, ܮ ∗is an operator, adjoint to the operator ܮ in the Hilbert space ܪ .
It is shown that a spectrum of such operator is real. In the case of a discrete operator, with a complete system of
eigenvectors and associated vectors, the projections of eigenvalues and associated vectors of the operator L and its
adjoint operator form an orthonormal basis. A class of Sturm-Liouville operators with such symmetry is found,
moreover, it is found that the characteristic function of such an operator factorizes. An illustrative example is
provided.