EfficientP-stable methods for periodic initial value problems

## Some embedded Runge-Kutta methods with minimal phase-lag for second-order periodic initial-value problems are developed. It should be noted that these embedded methods are based on the Runge-Kutta methods of algebraic order three, and on a new error estimation introduced in this paper. The num

The idea of super-implicit methods (requiring not just past and present but also future values) was suggested by Fukushima recently. Here, we construct P-stable super-impliclt methods for the solution of second-order initial value problems. The benefit of such methoda is realized when using vector o

A class of P-stable singlestep methods is discussed for solving initial-value problems involving second-order differential equations. The methods depend upon a parameter p > 0 and reduce to the classical methods for p = 0. A few choices of p have been discussed for which the methods are P-stable. Fu