Periodic solutions of difference Runge-Kutta schemes

First we give an intuitive explanation of the general idea of [1]: consistency and numerical smoothing implies convergence and, in addition, enables error estimates. Then, we briefly discuss some of the advantages of numerical smoothing over numerical stability in error analysis. The main aim of th

In the present work, we are concerned with the derivation of continuous Rung+Kutta-Nystrom methods for the numerical treatment of second-order ordinary differential equations with periodic solutions. Numerical methods used for solving such problems are better to have the characteristic of high phase

We consider the construction of Runge-Kutta(-Nyström) methods for ordinary differential equations whose solutions are known to be periodic. We assume that the frequency w tan be estimated in advance. The resulting methods depend on the Parameter v = wh, where h is the stepsize. Using the linear Stag