The classical Prüfer transformation has proved to be a useful tool in the study of Sturm-Liouville theory. In this paper we introduce the Prüfer transformation for self-adjoint difference equations and use it to obtain oscillation criteria and other results. We then offer an extension of this approach to the case of general symplectic systems on time scales. Time scales have been introduced in order to unify discrete and continuous analysis, and indeed our results cover as special cases both the Prüfer transformation for differential and for difference equations
We give the precise conditions under which a periodic discrete-time linear state-space system can be...
Abstract. This article is a review article on the use of Prüfer Transformations techniques in provi...
In this work, we establish Weyl-Titchmarsh theory for symplectic difference systems. This paper exte...
Basic results of the oscillation and transformation theories of linear Hamiltonian dynamic systems o...
We study second order scalar delta derivative expressions of Sturm-Liouville type on our newly defin...
For Sturm—Liouville eigenvalue problems on time scales with separated boundary conditions we give an...
In this study, linear second-order delta-nabla matrix equations on time scales are shown to be forma...
AbstractIn this paper we open a new direction in the study of discrete symplectic systems and Sturm–...
An explicit characterization of all self-adjoint extensions of the minimal linear relation associate...
AbstractChange of independent variablet=1/xmotivates variable step size discretizations of even orde...
The theory of time scales has been introduced in order to unify discrete and continuous analysis. W...
The theory of time scales has been introduced in order to unify discrete and continuous analysis. We...
AbstractWe develop an analog of classical oscillation theory for discrete symplectic eigenvalue prob...
AbstractDiscrete and continuous formulations of partial differential operators are unified by a time...
We consider continuous and discrete Schrödinger systems with self-adjoint matrix potentials and with...
We give the precise conditions under which a periodic discrete-time linear state-space system can be...
Abstract. This article is a review article on the use of Prüfer Transformations techniques in provi...
In this work, we establish Weyl-Titchmarsh theory for symplectic difference systems. This paper exte...
Basic results of the oscillation and transformation theories of linear Hamiltonian dynamic systems o...
We study second order scalar delta derivative expressions of Sturm-Liouville type on our newly defin...
For Sturm—Liouville eigenvalue problems on time scales with separated boundary conditions we give an...
In this study, linear second-order delta-nabla matrix equations on time scales are shown to be forma...
AbstractIn this paper we open a new direction in the study of discrete symplectic systems and Sturm–...
An explicit characterization of all self-adjoint extensions of the minimal linear relation associate...
AbstractChange of independent variablet=1/xmotivates variable step size discretizations of even orde...
The theory of time scales has been introduced in order to unify discrete and continuous analysis. W...
The theory of time scales has been introduced in order to unify discrete and continuous analysis. We...
AbstractWe develop an analog of classical oscillation theory for discrete symplectic eigenvalue prob...
AbstractDiscrete and continuous formulations of partial differential operators are unified by a time...
We consider continuous and discrete Schrödinger systems with self-adjoint matrix potentials and with...
We give the precise conditions under which a periodic discrete-time linear state-space system can be...
Abstract. This article is a review article on the use of Prüfer Transformations techniques in provi...
In this work, we establish Weyl-Titchmarsh theory for symplectic difference systems. This paper exte...