STABILITY AND BOUNDEDNESS PROPERTIES OF SOLUTIONS TO CERTAIN FIFTH ORDER NONLINEAR DIFFERENTIAL EQUATIONS

In this paper, we consider the nonlinear fifth order differential equation x((v)) + ax((iv)) + b (x) triple over dot + f(sic) + g(x)over dot + h(x) = p(t; x, (x)over dot, (sic), (x) triple over dot, x((iv))) and we used the Lyapunov's second method to give sufficient criteria for the zero solution to be globally asymptotically stable as well as the uniform boundedness of all solutions with their derivatives.