Existence of periodic solutions in shifts δ for neutral nonlinear dynamic systems

Abstract

In this study, we focus on the existence of a periodic solution for the neutral nonlinear dynamic systems with delay% \[ x(t)=A(t)x(t)+Q(t,x(δ-(s,t)) ) +G(t,x(t),x(δ-(s,t)) ) . \] We utilize the new periodicity concept in terms of shifts operators, which allows us to extend the concept of periodicity to time scales where the additivity requirement t T∈T for all t∈T and for a fixed T>0, may not hold. More, importantly, the new concept will easily handle time scales that are not periodic in the conventional way such as; qZ and k=1∞[ 3 k,2.3 k] \0\ . Hence, we develop a tool that enables the investigation of periodic solutions of q-difference systems. Since we are dealing with systems, in order to convert our equation to an integral systems, we resort to the transition matrix of the homogeneous Floquet system y(t)=A(t)y(t) and then make use of Krasnoselskii's fixed point theorem to obtain a fixed point.