In this chapter, we introduce the study of disconjugacy of n th order dynamic equations on
time scales. Disconjugacy of ordinary differential equations is thoroughly studied and has a …

Method of Variation of Parameters for Dynamic Systems presents a systematic and unified
theory of the development of the theory of the method of variation of parameters, its …

Differences with Respect to Boundary Points for Right Focal Boundary Conditions Page 1
Jornrd ol Di//<,nnw Eyumw. ond Applb crram. 1 1998 OPA (Uversrdr Pubuah~'r, .\>~.>LI.~U< …

Smoothness of solutions with respect to multi-strip integral boundary conditions for nth order
ordinary differential equations Page 1 396 Nonlinear Analysis: Modelling and Control, 2014 …

For the n-th order difference equation, Δ nu= f (t, u, Δ u,…, Δ n− 1 u, λ), the solution of the
boundary value problem satisfying Δ i− 1 u (t 0)= A i, 1≤ i≤ n− 1, and u (t 1)−∑ j= 1 maju (τ …

The Derivative of a Solution to a Second Order Parameter Dependent Boundary Value
Problem with a Nonlocal Integral Boundary Cond Page 1 "Science Stays True Here" Journal of …

Abstract Solutions, u (x), of the first order system, u′= ƒ (x, u), satisfying the multipoint
boundary conditions,∑ kj= 1 M ju (xj)= r, are differentiated with respect to the com …

Dynamic Systems and Applications 23 (2014) 133-144 BOUNDARY DATA SMOOTHNESS
FOR SOLUTIONS OF SECOND ORDER ORDINARY DIFFERENTIAL Page 1 Dynamic …

Solutions of the 2mth-order nonlinear differential equation u (2m)= f (x, u, u′,…, u (2m− 1))
satisfying Lidstone boundary conditions are differentiated with respect to both boundary …

The foundations of the whole theory of Dynamical Systems are based on the fact that
solutions depend on initial data in a continuous way in some cases and in a differentiable …