The paper de ls with oscillation of Runge-Kutta methods for equation x'(t) = ax(t) + aox([t]). The conditions of oscillation for the numerical methods are presented by considering the characteristic equation o...The paper de ls with oscillation of Runge-Kutta methods for equation x'(t) = ax(t) + aox([t]). The conditions of oscillation for the numerical methods are presented by considering the characteristic equation of the corresponding discrete scheme. It is proved that any nodes have the same oscillatory property as the integer nodes. Furthermore, the conditions under which the oscillation of the analytic solution is inherited by the numerical solution are obtained. The relationships between stability and oscillation are considered. Finally, some numerical experiments are given.展开更多
基金Supported by the National Natural Science Foundation of China(No.11201084)the State Scholarship Fund grant[2013]3018 from the China Scholarship Council
文摘The paper de ls with oscillation of Runge-Kutta methods for equation x'(t) = ax(t) + aox([t]). The conditions of oscillation for the numerical methods are presented by considering the characteristic equation of the corresponding discrete scheme. It is proved that any nodes have the same oscillatory property as the integer nodes. Furthermore, the conditions under which the oscillation of the analytic solution is inherited by the numerical solution are obtained. The relationships between stability and oscillation are considered. Finally, some numerical experiments are given.