AbstractThis paper continues the development of disconjugacy of higher order dynamic equations on time scales. Two-point conjugate type boundary value problems for general disconjugate dynamic equations on time scales are studied and the sign properties of associated Green's functions are established. As expected, the results unify known results from the theories of ordinary differential equations and finite difference equations
AbstractUtilizing the theory of dynamic systems on time scales, which unifies the theory of continuo...
AbstractIn this paper we offer a form of self-adjoint differential equations on time scales so that ...
AbstractIn this paper, we study the existence of solutions of periodic boundary value problem for se...
In this chapter, we introduce the study of disconjugacy of nth order dynamic equations on time scale...
On the specific time scale—given as integer multiples of a fixed, positive real number h—and under c...
This paper introduces generalized zeros and hence disconjugacy of nth order linear dynamic equations...
The Introduction briefly discusses calculus on time scales, initially developed by Stefan Hilger in ...
AbstractIn this paper a sufficient condition for disconjugacy of second order Δ-differential equatio...
WOS: 000175021700015In this paper a sufficient condition for disconjugacy of second order Delta-diff...
AbstractThis paper introduces generalized zeros and hence disconjugacy of nth order linear dynamic e...
This paper introduces generalized zeros and hence disconjugacy of nth order linear dynamic equations...
AbstractEventual disconjugacy of the time scale differential equation yΔΔ(t)+p1(t)yΔ(t)+p2(t)y(t)=0 ...
AbstractIn this study, higher-order self-adjoint differential expressions on time scales and their a...
As a way to unify a discussion of many kinds of problems for equations in the contionous and discret...
WOS: 000175021700007In this paper we offer a form of self-adjoint differential equations on time sca...
AbstractUtilizing the theory of dynamic systems on time scales, which unifies the theory of continuo...
AbstractIn this paper we offer a form of self-adjoint differential equations on time scales so that ...
AbstractIn this paper, we study the existence of solutions of periodic boundary value problem for se...
In this chapter, we introduce the study of disconjugacy of nth order dynamic equations on time scale...
On the specific time scale—given as integer multiples of a fixed, positive real number h—and under c...
This paper introduces generalized zeros and hence disconjugacy of nth order linear dynamic equations...
The Introduction briefly discusses calculus on time scales, initially developed by Stefan Hilger in ...
AbstractIn this paper a sufficient condition for disconjugacy of second order Δ-differential equatio...
WOS: 000175021700015In this paper a sufficient condition for disconjugacy of second order Delta-diff...
AbstractThis paper introduces generalized zeros and hence disconjugacy of nth order linear dynamic e...
This paper introduces generalized zeros and hence disconjugacy of nth order linear dynamic equations...
AbstractEventual disconjugacy of the time scale differential equation yΔΔ(t)+p1(t)yΔ(t)+p2(t)y(t)=0 ...
AbstractIn this study, higher-order self-adjoint differential expressions on time scales and their a...
As a way to unify a discussion of many kinds of problems for equations in the contionous and discret...
WOS: 000175021700007In this paper we offer a form of self-adjoint differential equations on time sca...
AbstractUtilizing the theory of dynamic systems on time scales, which unifies the theory of continuo...
AbstractIn this paper we offer a form of self-adjoint differential equations on time scales so that ...
AbstractIn this paper, we study the existence of solutions of periodic boundary value problem for se...