Your search keyword '"complex jacobi matrix"' showing total 8 results

1. On bounded complex Jacobi matrices and related moment problems in the complex plane

Author

Sergey M. Zagorodnyuk

Subjects

complex jacobi matrix, moment problem, orthogonal polynomials, linear functional, Mathematics, QA1-939

Abstract

In this paper we consider the following moment problem: find a positive Borel measure μ on ℂ subject to conditions ∫ zn dμ = sn, n∈ℤ+, where sn are prescribed complex numbers (moments). This moment problem may be viewed (informally) as an extension of the Stieltjes and Hamburger moment problems to the complex plane. A criterion for the moment problem for the existence of a compactly supported solution is given. In particular, such moment problems appear naturally in the domain of complex Jacobi matrices. For every bounded complex Jacobi matrix its associated functional S has the following integral representation: S(p) = ∫ℂ p(z) dμ, with a positive Borel measure μ in the complex plane. An interrelation of the associated to the complex Jacobi matrix operator A0, acting in l2 on finitely supported vectors, and the multiplication by z operator in L2μ is discussed.

Published

2023

2. ON BOUNDED COMPLEX JACOBI MATRICES AND RELATED MOMENT PROBLEMS IN THE COMPLEX PLANE.

Author

Zagorodnyuk, Sergey M.

Subjects

*JACOBI operators, *COMPLEX matrices, *COMPLEX numbers, *INTEGRAL representations, *BOREL sets, *ORTHOGONAL polynomials

Abstract

In this paper we consider the following moment problem: find a positive Borel measure μ on C subject to conditions ∫ zndμ = sn, n ∈ Z+, where sn are prescribed complex numbers (moments). This moment problem may be viewed (informally) as an extension of the Stieltjes and Hamburger moment problems to the complex plane. A criterion for the moment problem for the existence of a compactly supported solution is given. In particular, such moment problems appear naturally in the domain of complex Jacobi matrices. For every bounded complex Jacobi matrix its associated functional S has the following integral representation: S(p) = ∫ C p(z)dμ, with a positive Borel measure μ in the complex plane. An interrelation of the associated to the complex Jacobi matrix operator A0, acting in l² on finitely supported vectors, and the multiplication by z operator in L² μ is discussed. [ABSTRACT FROM AUTHOR]

Published

2023

3. Spectral Properties of Some Complex Jacobi Matrices.

Author

Świderski, Grzegorz

Abstract

We study spectral properties of bounded and unbounded complex Jacobi matrices. In particular, we formulate conditions assuring that the spectrum of the studied operators is continuous on some subsets of the complex plane and we provide uniform asymptotics of their generalised eigenvectors. We illustrate our results by considering complex perturbations of real Jacobi matrices belonging to several classes: asymptotically periodic, periodically modulated and the blend of these two. Moreover, we provide conditions implying existence of a unique closed extension. The method of the proof is based on the analysis of a generalisation of shifted Turán determinants to the complex setting. [ABSTRACT FROM AUTHOR]

Published

2020

4. Asymptotics of the discrete spectrum for complex Jacobi matrices

Author

Maria Malejki

Subjects

tridiagonal matrix, complex Jacobi matrix, discrete spectrum, eigenvalue, asymptotic formula, unbounded operator, Riesz projection, Applied mathematics. Quantitative methods, T57-57.97

Abstract

The spectral properties and the asymptotic behaviour of the discrete spectrum for a special class of infinite tridiagonal matrices are given. We derive the asymptotic formulae for eigenvalues of unbounded complex Jacobi matrices acting in \(l^2(\mathbb{N})\).

Published

2014

5. Complex Jacobi matrices generated by Darboux transformations.

Author

Bailey, Rachel and Derevyagin, Maxim

Subjects

*JACOBI operators, *COMPLEX matrices, *DARBOUX transformations, *MATRIX pencils, *ORTHOGONAL polynomials, *COMPLEX numbers

Abstract

In this paper, we study complex Jacobi matrices obtained by the Christoffel and Geronimus transformations at a nonreal complex number, including the properties of the corresponding sequences of orthogonal polynomials. We also present some invariant and semi-invariant properties of Jacobi matrices under such transformations. For instance, we show that a Nevai class is invariant under the transformations in question, which is not true in general, and that the ratio asymptotic still holds outside the spectrum of the corresponding symmetric complex Jacobi matrix but the spectrum could include one extra point. In principal, these transformations can be iterated and, for example, we demonstrate how Geronimus transformations can lead to R I I -recurrence relations, which in turn are related to orthogonal rational functions and pencils of Jacobi matrices. [ABSTRACT FROM AUTHOR]

Published

2023

6. ASYMPTOTICS OF THE DISCRETE SPECTRUM FOR COMPLEX JACOBI MATRICES.

Author

Malejki, Maria

Subjects

*JACOBI series, *MATRICES (Mathematics), *MATHEMATICAL formulas, *MATHEMATICAL analysis, *ALGEBRA

Abstract

The spectral properties and the asymptotic behaviour of the discrete spectrum for a special class of infinite tridiagonal matrices are given. We derive the asymptotic formulae for eigenvalues of unbounded complex Jacobi matrices acting in l² (∕). [ABSTRACT FROM AUTHOR]

Published

2014

7. Spectral Properties of Some Complex Jacobi Matrices

Author

Grzegorz Świderski

Subjects

Pure mathematics, Complex Jacobi matrix, Generalised eigenvectors, 010103 numerical & computational mathematics, 01 natural sciences, Continuous spectrum, Mathematics - Spectral Theory, FOS: Mathematics, 0101 mathematics, Spectral Theory (math.SP), 47B36 [Primary], Eigenvalues and eigenvectors, Mathematics, Algebra and Number Theory, Science & Technology, 010102 general mathematics, Spectrum (functional analysis), Spectral properties, Extension (predicate logic), Primary: 47B36, DISCRETE SPECTRUM, Bounded function, Physical Sciences, Complex plane, Asymptotics, Analysis

Abstract

We study spectral properties of bounded and unbounded complex Jacobi matrices. In particular, we formulate conditions assuring that the spectrum of the studied operators is continuous on some subsets of the complex plane and we provide uniform asymptotics of their generalised eigenvectors. We illustrate our results by considering complex perturbations of real Jacobi matrices belonging to several classes: asymptotically periodic, periodically modulated and the blend of these two. Moreover, we provide conditions implying existence of a unique closed extension. The method of the proof is based on the analysis of a generalisation of shifted Tur\'an determinants to the complex setting., Comment: 16 pages

Published

2020

8. Complex Jacobi matrices

Author

Bernhard Beckermann

Subjects

Complex Jacobi matrix, Jacobi operator, Applied Mathematics, Numerical analysis, Jacobi method, System of linear equations, Resolvent convergence, Formal orthogonal polynomials, Algebra, Computational Mathematics, symbols.namesake, Convergence of J-fractions, Jacobi eigenvalue algorithm, Jacobi rotation, Orthogonal polynomials, symbols, Jacobi polynomials, Applied mathematics, Difference operator, Padé approximation, Mathematics

Abstract

Complex Jacobi matrices play an important role in the study of asymptotics and zero distribution of formal orthogonal polynomials (FOPs). The latter are essential tools in several fields of numerical analysis, for instance in the context of iterative methods for solving large systems of linear equations, or in the study of Padé approximation and Jacobi continued fractions. In this paper we present some known and some new results on FOPs in terms of spectral properties of the underlying (infinite) Jacobi matrix, with a special emphasis to unbounded recurrence coefficients. Here we recover several classical results for real Jacobi matrices. The inverse problem of characterizing properties of the Jacobi operator in terms of FOPs and other solutions of a given three-term recurrence is also investigated. This enables us to give results on the approximation of the resolvent by inverses of finite sections, with applications to the convergence of Padé approximants.

Published

2001