AbstractIn 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
We consider discrete laplacians for iterated maps on the interval and examine their eigenvalues. We ...
The classical Prüfer transformation has proved to be a useful tool in the study of Sturm-Liouville t...
Recently, Bohner and Sun [9] introduced basic elements of a Weyl–Titchmarsh theory into the study of...
AbstractIn this paper we open a new direction in the study of discrete symplectic systems and Sturm–...
AbstractWe develop an analog of classical oscillation theory for discrete symplectic eigenvalue prob...
In this paper we consider problems that consist of symplectic difference systems depending on an eig...
We consider 2n x 2n symplectic difference systems together with associated discrete quadratic functi...
Abstract. We consider 2n × 2n symplectic difference systems together with associated discrete qua-dr...
An explicit characterization of all self-adjoint extensions of the minimal linear relation associate...
AbstractThis paper is concerned with the symplectic structure of discrete nonlinear Hamiltonian syst...
We consider the discrete right denite Sturm-Liouville problems with nonlinear eigenparameter depende...
In this work, we establish Weyl-Titchmarsh theory for symplectic difference systems. This paper exte...
AbstractThis paper is concerned with spectral problems for a class of discrete linear Hamiltonian sy...
For Sturm—Liouville eigenvalue problems on time scales with separated boundary conditions we give an...
In this paper we characterize the definiteness of the discrete symplectic system, study a nonhomogen...
We consider discrete laplacians for iterated maps on the interval and examine their eigenvalues. We ...
The classical Prüfer transformation has proved to be a useful tool in the study of Sturm-Liouville t...
Recently, Bohner and Sun [9] introduced basic elements of a Weyl–Titchmarsh theory into the study of...
AbstractIn this paper we open a new direction in the study of discrete symplectic systems and Sturm–...
AbstractWe develop an analog of classical oscillation theory for discrete symplectic eigenvalue prob...
In this paper we consider problems that consist of symplectic difference systems depending on an eig...
We consider 2n x 2n symplectic difference systems together with associated discrete quadratic functi...
Abstract. We consider 2n × 2n symplectic difference systems together with associated discrete qua-dr...
An explicit characterization of all self-adjoint extensions of the minimal linear relation associate...
AbstractThis paper is concerned with the symplectic structure of discrete nonlinear Hamiltonian syst...
We consider the discrete right denite Sturm-Liouville problems with nonlinear eigenparameter depende...
In this work, we establish Weyl-Titchmarsh theory for symplectic difference systems. This paper exte...
AbstractThis paper is concerned with spectral problems for a class of discrete linear Hamiltonian sy...
For Sturm—Liouville eigenvalue problems on time scales with separated boundary conditions we give an...
In this paper we characterize the definiteness of the discrete symplectic system, study a nonhomogen...
We consider discrete laplacians for iterated maps on the interval and examine their eigenvalues. We ...
The classical Prüfer transformation has proved to be a useful tool in the study of Sturm-Liouville t...
Recently, Bohner and Sun [9] introduced basic elements of a Weyl–Titchmarsh theory into the study of...