AbstractWe develop an analog of classical oscillation theory for discrete symplectic eigenvalue problems with general self-adjoint boundary conditions which, rather than measuring of the spectrum of one single problem, measures the difference between the spectra of two different problems. We prove formulas connecting the numbers of eigenvalues in a given interval for two symplectic eigenvalue problems with different self-adjoint boundary conditions. We derive as corollaries generalized interlacing properties of eigenvalues
We consider 2n x 2n symplectic difference systems together with associated discrete quadratic functi...
This is a celebratory and pedagogical discussion of Sturm oscillation theory. Included is the discus...
AbstractWe consider the eigenvalue problem for a selfadjoint system of linear ordinary differential ...
AbstractWe develop an analog of classical oscillation theory for discrete symplectic eigenvalue prob...
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...
AbstractIn this paper we open a new direction in the study of discrete symplectic systems and Sturm–...
AbstractWe develop relative oscillation theory for one-dimensional Dirac operators which, rather tha...
AbstractAn extension is given to the known inequalities which interlace the eigenvalues correspondin...
AbstractWe provide a comprehensive treatment of oscillation theory for Jacobi operators with separat...
AbstractWe study oscillatory properties of two-dimensional symplectic difference systems. Using the ...
For general Sturm-Liouville operators with separated boundary conditions, we prove the following: If...
AbstractThis paper is concerned with coupled boundary value problems for self-adjoint second-order d...
Ein Einstieg in die Relative Oszillationstheorie.An Introduction to relative oscillation theory, whi...
Abstract. We consider 2n × 2n symplectic difference systems together with associated discrete qua-dr...
We consider 2n x 2n symplectic difference systems together with associated discrete quadratic functi...
This is a celebratory and pedagogical discussion of Sturm oscillation theory. Included is the discus...
AbstractWe consider the eigenvalue problem for a selfadjoint system of linear ordinary differential ...
AbstractWe develop an analog of classical oscillation theory for discrete symplectic eigenvalue prob...
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...
AbstractIn this paper we open a new direction in the study of discrete symplectic systems and Sturm–...
AbstractWe develop relative oscillation theory for one-dimensional Dirac operators which, rather tha...
AbstractAn extension is given to the known inequalities which interlace the eigenvalues correspondin...
AbstractWe provide a comprehensive treatment of oscillation theory for Jacobi operators with separat...
AbstractWe study oscillatory properties of two-dimensional symplectic difference systems. Using the ...
For general Sturm-Liouville operators with separated boundary conditions, we prove the following: If...
AbstractThis paper is concerned with coupled boundary value problems for self-adjoint second-order d...
Ein Einstieg in die Relative Oszillationstheorie.An Introduction to relative oscillation theory, whi...
Abstract. We consider 2n × 2n symplectic difference systems together with associated discrete qua-dr...
We consider 2n x 2n symplectic difference systems together with associated discrete quadratic functi...
This is a celebratory and pedagogical discussion of Sturm oscillation theory. Included is the discus...
AbstractWe consider the eigenvalue problem for a selfadjoint system of linear ordinary differential ...