AbstractWe develop direct and inverse spectral analysis for finite and semi-infinite non-self-adjoint Jacobi matrices with a rank-one imaginary part. It is shown that given a set of n not necessarily distinct nonreal numbers in the open upper (lower) half-plane uniquely determines an n×n Jacobi matrix with a rank-one imaginary part having those numbers as its eigenvalues counting algebraic multiplicity. Algorithms of reconstruction for such finite Jacobi matrices are presented. A new model complementing the well-known Livsic triangular model for bounded linear operators with a rank-one imaginary part is obtained. It turns out that the model operator is a non-self-adjoint Jacobi matrix. We show that any bounded, prime, non-self-adjoint linea...
We show that a unique Jacobi matrix can be reconstructed from two types of mixed data: 1. its two ei...
Abstract. We describe some spectral representations for a class of non-self-adjoint banded Jacobi-ty...
AbstractIt is shown that a n×n Jacobi matrix is uniquely determined by its n eigenvalues and by the ...
AbstractWe develop direct and inverse spectral analysis for finite and semi-infinite non-self-adjoin...
Complex Jacobi matrices play an important role in the study of asymptotics and zero distribution of...
AbstractComplex Jacobi matrices play an important role in the study of asymptotics and zero distribu...
We perform the spectral analysis of a family of Jacobi operators J(α) depending on a complex paramet...
We consider semi-infinite Jacobi matrices with discrete spectrum. We prove that the Jacobi operator ...
AbstractIt is shown that if two infinite Jacobi matrices of type D have the same spectrum {λi}∞1 and...
This work deals with various finite algorithms that solve two special Structured Inverse Eigenvalue ...
AbstractA function f with simple and nice algebraic properties is defined on a subset of the space o...
AbstractThe main issue we address in the present paper are the new models for completely nonunitary ...
We investigate the problem of approximation of eigenvalues of some self-adjoint operator in the Hilb...
Tyt. z nagłówka.Bibliogr. s. 885-887.We describe some spectral representations for a class of non-se...
To the memory of A. Ya. Povzner Abstract. In this article we will introduce and investigate some gen...
We show that a unique Jacobi matrix can be reconstructed from two types of mixed data: 1. its two ei...
Abstract. We describe some spectral representations for a class of non-self-adjoint banded Jacobi-ty...
AbstractIt is shown that a n×n Jacobi matrix is uniquely determined by its n eigenvalues and by the ...
AbstractWe develop direct and inverse spectral analysis for finite and semi-infinite non-self-adjoin...
Complex Jacobi matrices play an important role in the study of asymptotics and zero distribution of...
AbstractComplex Jacobi matrices play an important role in the study of asymptotics and zero distribu...
We perform the spectral analysis of a family of Jacobi operators J(α) depending on a complex paramet...
We consider semi-infinite Jacobi matrices with discrete spectrum. We prove that the Jacobi operator ...
AbstractIt is shown that if two infinite Jacobi matrices of type D have the same spectrum {λi}∞1 and...
This work deals with various finite algorithms that solve two special Structured Inverse Eigenvalue ...
AbstractA function f with simple and nice algebraic properties is defined on a subset of the space o...
AbstractThe main issue we address in the present paper are the new models for completely nonunitary ...
We investigate the problem of approximation of eigenvalues of some self-adjoint operator in the Hilb...
Tyt. z nagłówka.Bibliogr. s. 885-887.We describe some spectral representations for a class of non-se...
To the memory of A. Ya. Povzner Abstract. In this article we will introduce and investigate some gen...
We show that a unique Jacobi matrix can be reconstructed from two types of mixed data: 1. its two ei...
Abstract. We describe some spectral representations for a class of non-self-adjoint banded Jacobi-ty...
AbstractIt is shown that a n×n Jacobi matrix is uniquely determined by its n eigenvalues and by the ...