This survey article contains various aspects of the direct and inverse spectral problem for twodimensional Hamiltonian systems, that is, two dimensional canonical systems of homogeneous differential equations of the form Jy'(x) = -zH(x)y(x); x ∈ [0;L); 0 < L ≤ ∞; z ∈ C; with a real non-negative definite matrix function H ≥ 0 and a signature matrix J, and with a standard boundary condition of the form y1(0+) = 0. Additionally it is assumed that Weyl's limit point case prevails at L. In this case the spectrum of the canonical system is determined by its Titchmarsh-Weyl coefficient Q which is a Nevanlinna function, that is, a function which maps the upper complex half-plane analytically into itself. In this article an outline of the Titchmarsh...
The main purpose of this paper is to develop Titchmarsh- Weyl theory of canonical systems. To this e...
This note concerns an eigenvalue problem for a Hamiltonian system of ordinary differential equations...
We study two-dimensional Hamiltonian systems of the form (•) y'(x) = zJH(x)y(x); x ∈ [s-; s+), where...
This survey article contains various aspects of the direct and inverse spectral problem for twodimen...
Part I of this paper deals with two-dimensional canonical systems $y'(x)=yJH(x)y(x)$, $x\in(a,b)$, w...
For a two-dimensional canonical system $y'(t)=zJH(t)y(t)$ on some interval $(a,b)$ whose Hamiltonian...
We establish the Weyl-Titchmarsh theory for singular linear Hamiltonian dynamic systems on a time sc...
The two-dimensional Hamiltonian system (*) y'(x)=zJH(x)y(x), x∈(a,b), where the Hamiltonian H take...
In this note we study inverse spectral problems for canonical Hamiltonian systems, which encompass a...
This note concerns an eigenvalue problem for a Hamiltonian system of ordinary differential equations...
For a two-dimensional canonical system y'(t)=zJH(t)y(t) on the half-line (0, ∞) whose Hamiltonian H ...
AbstractWe develop the basic theory of matrix-valued Weyl–Titchmarsh M-functions and the associated ...
We investigate two-dimensional canonical systems $y'=zJHy$ on an interval, with positive semi-defini...
We consider (2×2)-Hamiltonian systems of the form $y'(x) = zJH(x)y(x)$, $x \in [s−, s+)$. If a syste...
AbstractThis paper is concerned with establishing the Weyl–Titchmarsh theory for a class of discrete...
The main purpose of this paper is to develop Titchmarsh- Weyl theory of canonical systems. To this e...
This note concerns an eigenvalue problem for a Hamiltonian system of ordinary differential equations...
We study two-dimensional Hamiltonian systems of the form (•) y'(x) = zJH(x)y(x); x ∈ [s-; s+), where...
This survey article contains various aspects of the direct and inverse spectral problem for twodimen...
Part I of this paper deals with two-dimensional canonical systems $y'(x)=yJH(x)y(x)$, $x\in(a,b)$, w...
For a two-dimensional canonical system $y'(t)=zJH(t)y(t)$ on some interval $(a,b)$ whose Hamiltonian...
We establish the Weyl-Titchmarsh theory for singular linear Hamiltonian dynamic systems on a time sc...
The two-dimensional Hamiltonian system (*) y'(x)=zJH(x)y(x), x∈(a,b), where the Hamiltonian H take...
In this note we study inverse spectral problems for canonical Hamiltonian systems, which encompass a...
This note concerns an eigenvalue problem for a Hamiltonian system of ordinary differential equations...
For a two-dimensional canonical system y'(t)=zJH(t)y(t) on the half-line (0, ∞) whose Hamiltonian H ...
AbstractWe develop the basic theory of matrix-valued Weyl–Titchmarsh M-functions and the associated ...
We investigate two-dimensional canonical systems $y'=zJHy$ on an interval, with positive semi-defini...
We consider (2×2)-Hamiltonian systems of the form $y'(x) = zJH(x)y(x)$, $x \in [s−, s+)$. If a syste...
AbstractThis paper is concerned with establishing the Weyl–Titchmarsh theory for a class of discrete...
The main purpose of this paper is to develop Titchmarsh- Weyl theory of canonical systems. To this e...
This note concerns an eigenvalue problem for a Hamiltonian system of ordinary differential equations...
We study two-dimensional Hamiltonian systems of the form (•) y'(x) = zJH(x)y(x); x ∈ [s-; s+), where...