Oscillation theorems for discrete symplectic systems with nonlinear dependence in spectral parameter

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Authors	ŠIMON HILSCHER Roman
Year of publication	2012
Type	Article in Periodical
Magazine / Source	Linear Algebra and Its Applications
MU Faculty or unit	Faculty of Science
Citation
Doi	http://dx.doi.org/10.1016/j.laa.2012.06.033
Field	General mathematics
Keywords	Discrete symplectic system; Oscillation theorem; Finite eigenvalue; Finite eigenfunction; Linear Hamiltonian system; Quadratic functional
Attached files	laa_dnlaosc_inpress.pdf
Description	In this paper we open a new direction in the study of discrete symplectic systems and Sturm-Liouville difference equations by introducing nonlinear dependence in the spectral parameter. We develop the notions of (finite) eigenvalues and (finite) eigenfunctions and their multiplicities, and prove the corresponding oscillation theorem for Dirichlet boundary conditions. The present theory generalizes several known results for discrete symplectic systems which depend linearly on the spectral parameter. Our results are new even for special discrete symplectic systems, namely for Sturm-Liouville difference equations, symmetric three-term recurrence equations, and linear Hamiltonian difference systems.
Related projects:	Oscillation and spectral theory of differential and difference systems Diferenční rovnice a dynamické rovnice na time scales III