AbstractWe consider a linear Hamiltonian Difference System for the so-called singular case so that discrete Sturm–Liouville Equations of higher order are included in our theory. We introduce the concepts of focal points for matrix-valued and generalized zeros for vector-valued solutions of the system and define disconjugacy for linear Hamiltonian Difference Systems. We prove a Reid Roundabout Theorem which gives conditions equivalent to positive definiteness of a certain discrete quadratic functional, among them the strengthened Jacobi's Condition and a condition on a certain Riccati Difference Equation. The key to this theorem is a discrete version of Picone's Identity. Furthermore, for the sake of generalization of our theorem, we introdu...
This paper is concerned with the characterizations of the Friedrichs extension for a class of singul...
We consider symplectic difference systems, which contain as special cases linear Hamiltonian differe...
This dissertation is both a literature survey and a presentation of new and independent results. The...
We consider a linear Hamiltonian Difference System for the so-called singular case so that discrete ...
AbstractWe consider a linear Hamiltonian Difference System for the so-called singular case so that d...
We derive a Reid roundabout Theorem for Sturm-liouville Difference Equations of higher order by appl...
AbstractIn this paper we study the linear Hamiltonian difference system Δy(t) = B(t) y(t + 1) + c(t)...
AbstractWe give a formulation of generalized zeros and (n, n) disconjugacy for even order formally s...
AbstractIn a series of papers starting with a 1959 paper in J. Math. & Mechanics [1], W. T. Reid pre...
In a series of papers starting with a 1959 paper in J. Math. & Mechanics [1], W. T. Reid presented S...
AbstractThis paper introduces general discrete linear Hamiltonian eigenvalue problems and characteri...
Various systems and equations equivalent to discrete matrix and vector Hamiltonian systems are discu...
. We study a system of difference equations which, like Hamilton's equations, preserves the sta...
This paper relates disconjugacy of linear Hamiltonian difference systems (LHdS) (and hence positive ...
AbstractThe main result of the paper is a Sturmian-type separation theorem for the recessive solutio...
This paper is concerned with the characterizations of the Friedrichs extension for a class of singul...
We consider symplectic difference systems, which contain as special cases linear Hamiltonian differe...
This dissertation is both a literature survey and a presentation of new and independent results. The...
We consider a linear Hamiltonian Difference System for the so-called singular case so that discrete ...
AbstractWe consider a linear Hamiltonian Difference System for the so-called singular case so that d...
We derive a Reid roundabout Theorem for Sturm-liouville Difference Equations of higher order by appl...
AbstractIn this paper we study the linear Hamiltonian difference system Δy(t) = B(t) y(t + 1) + c(t)...
AbstractWe give a formulation of generalized zeros and (n, n) disconjugacy for even order formally s...
AbstractIn a series of papers starting with a 1959 paper in J. Math. & Mechanics [1], W. T. Reid pre...
In a series of papers starting with a 1959 paper in J. Math. & Mechanics [1], W. T. Reid presented S...
AbstractThis paper introduces general discrete linear Hamiltonian eigenvalue problems and characteri...
Various systems and equations equivalent to discrete matrix and vector Hamiltonian systems are discu...
. We study a system of difference equations which, like Hamilton's equations, preserves the sta...
This paper relates disconjugacy of linear Hamiltonian difference systems (LHdS) (and hence positive ...
AbstractThe main result of the paper is a Sturmian-type separation theorem for the recessive solutio...
This paper is concerned with the characterizations of the Friedrichs extension for a class of singul...
We consider symplectic difference systems, which contain as special cases linear Hamiltonian differe...
This dissertation is both a literature survey and a presentation of new and independent results. The...