Two-step General Linear Methods for Retarded Functional Differential Equations
This work provides new numerical methods for solving retarded functional differential equations, which are important in various applications, but the contribution is incremental as it extends existing general linear methods to a specific class of equations.
The paper develops explicit two-step general linear methods up to order five for retarded functional differential equations, achieving high uniform stage order to avoid order reduction for mildly stiff problems.
This paper presents a class of Two-Step General Linear Methods for the numerical solution of Retarded Functional Differential Equations. Explicit methods up to order five are constructed. To avoid order reduction for mildly stiff problems the uniform stage order of the methods is chosen to be close to uniform order.