Symplectic difference systems: oscillation theory and hyperbolic Prüfer transformation

Symplectic Difference Systems: Oscillation Theory and Hyperbolic Prüfer Transformation

Oscillation Theorems for Symplectic Difference Systems

We consider symplectic difference systems involving a spectral parameter, together with the Dirichlet boundary conditions. The main result of the paper is a discrete version of the so-called oscillation theorem which relates the number of finite eigenvalues less than a given number to the number of focal points of the principal solution of the symplectic system. In two recent papers the same pr...

Oscillation and Spectral Theory for for Symplectic Difference Systems with Separated Boundary Conditions

We consider symplectic difference systems involving a spectral parameter together with general separated boundary conditions. We establish the so-called oscillation theorem which relates the number of finite eigenvalues less than or equal to a given number to the number of focal points of a certain conjoined basis of the symplectic system. Then we prove Rayleigh’s principle for the variational ...

Weyl-Titchmarsh theory for symplectic difference systems

In this work, we establish Weyl–Titchmarsh theory for symplectic difference systems. This paper extends classical Weyl–Titchmarsh theory and provides a foundation for studying spectral theory of symplectic difference systems. 2010 Elsevier Inc. All rights reserved.

Oscillation of Symplectic Dynamic Systems

We investigate oscillatory properties of a perturbed symplectic dynamic system on a time scale that is unbounded above. The unperturbed system is supposed to be nonoscillatory, and we give conditions on the perturbation matrix, which guarantee that the perturbed system becomes oscillatory. Examples illustrating the general results are given as well.