Existence of quasibounded solutions for the higher order dynamic equations on measure chains

under suitable conditions on f(t? u), the boundary value problem uaa(t) + pf(t, uO(t)) = 0, in [a,b], (E) 1 au(a) -puA(a) = 0, yu(cr(b)) + 6uA(0(6)) = 0, (BC) (BW has at least one solution. Moreover, we also apply this main result to establish several existence theorems of multiple solutions for so

This paper introduces generalized zeros and hence disconjugacy of nth order Ž linear dynamic equations, which cover simultaneously as special cases among . others both differential equations and difference equations. We also define Markov, Fekete, and Descartes interpolating systems of functions. Th

Differential equations are considered which contain a small parameter. When the parameter is zero the equation is autonomous with a hyperbolic equilibrium and a homoclinic solution. No restriction is placed on the dimension of the phase space or the dimension of intersection of the stable and unstab