In this study, linear second-order delta-nabla matrix equations on time scales are shown to be formally self-adjoint equations with respect to a certain inner product and the associated self-adjoint boundary conditions. After a connection is made with symplectic dynamic systems on time scales, we introduce a generalized Wronskian and establish a Lagrange identity and Abel\u27s formula. Two reduction-of-order theorems are given. Solutions of the second-order self-adjoint equation are then shown to be related to corresponding solutions of a first-order Riccati equation. Then a comprehensive roundabout theorem relating key equivalences is stated. Finally several oscillation theorems are proven about the self-adjoint equation. We then go on to ...
WOS: 000175021700007In this paper we offer a form of self-adjoint differential equations on time sca...
ABSTRACT. Alpha derivatives are studied on generalized time scales T. We present a Liouville formula...
The classical Prüfer transformation has proved to be a useful tool in the study of Sturm-Liouville t...
In this study, linear second-order delta-nabla matrix equations on time scales are shown to be forma...
ABSTRACT. In this paper we examine the dynamic equation [p(t)x∆(t)] ∇ + q(t)x(t) = 0 on a time scal...
The theory of time scales was introduced by Stefan Hilger in his 1988 PhD dissertation, [18]. The st...
Abstract. Even order self adjoint differential time scale expressions are introduced, to-gether with...
We obtain oscillation criteria for a second order self-adjoint matrix differential equation on a mea...
Until recently, mathematical models of natural occurrences were either exclusively continuous or dis...
The theory of time scales is introduced by Stefan Hilger in his PhD thesis in 1998 in order to unify...
In this article we establish the uniqueness of solutions to first-order matrix dynamic equations on...
Abstract. By employing the matrix Riccati technique and the integral av-eraging technique, new oscil...
The study of dynamic equations on time scales, which goes back to its founder Stefan Hilger (1988), ...
AbstractIn this paper we offer a form of self-adjoint differential equations on time scales so that ...
A well-known Picone identity is extended and generalized to second-order dynamic matrix equations on...
WOS: 000175021700007In this paper we offer a form of self-adjoint differential equations on time sca...
ABSTRACT. Alpha derivatives are studied on generalized time scales T. We present a Liouville formula...
The classical Prüfer transformation has proved to be a useful tool in the study of Sturm-Liouville t...
In this study, linear second-order delta-nabla matrix equations on time scales are shown to be forma...
ABSTRACT. In this paper we examine the dynamic equation [p(t)x∆(t)] ∇ + q(t)x(t) = 0 on a time scal...
The theory of time scales was introduced by Stefan Hilger in his 1988 PhD dissertation, [18]. The st...
Abstract. Even order self adjoint differential time scale expressions are introduced, to-gether with...
We obtain oscillation criteria for a second order self-adjoint matrix differential equation on a mea...
Until recently, mathematical models of natural occurrences were either exclusively continuous or dis...
The theory of time scales is introduced by Stefan Hilger in his PhD thesis in 1998 in order to unify...
In this article we establish the uniqueness of solutions to first-order matrix dynamic equations on...
Abstract. By employing the matrix Riccati technique and the integral av-eraging technique, new oscil...
The study of dynamic equations on time scales, which goes back to its founder Stefan Hilger (1988), ...
AbstractIn this paper we offer a form of self-adjoint differential equations on time scales so that ...
A well-known Picone identity is extended and generalized to second-order dynamic matrix equations on...
WOS: 000175021700007In this paper we offer a form of self-adjoint differential equations on time sca...
ABSTRACT. Alpha derivatives are studied on generalized time scales T. We present a Liouville formula...
The classical Prüfer transformation has proved to be a useful tool in the study of Sturm-Liouville t...