Linear Orderings and the Full Periodicity Kernel for the n-Star

In this paper we consider the nonlinear third-order quasi-linear differential equation and obtain some simple conditions for the existence of a periodic solution for it. In so doing we use the implicit function theorem to prove a theorem about the existence of periodic solutions and consider one ex

Results are given that establish, for the first time, necessary and sufficient conditions for the existence of impulse responses and kernel representations for linear not-necessarily-time-invariant systems described by input-output operator equations. These results concern systems whose inputs and

On the existence of periodic solutions for the quasi-linear third order system of O.D.Es In this paper we concern with the nonlinear third order quasi-linear system of ordinary differential equations as: where X ∈ IR n and Λ is a diagonal matrix. We obtain some simple sufficient conditions for the

A multiple parameter perturbation method is developed to determine the Floquet eigenvalues and stability boundary of a linear discrete system that is described by a system of ordinary differential equations with periodic coefficients. In the method, the state of the system is determined by solving a