Construction of higher order accurate vortex and particle methods

In this paper, various least-squares procedures to solve first-order initial value problems are studied. The accuracy and stability properties are investigated by applying the methods to a linear first-order ordinary differential equation. In relating the least-squares procedures to the weighted res

We investigate explicit higher order time discretizations of linear second order hyperbolic problems. We study the even order (2m) schemes obtained by the modified equation method. We show that the corresponding CFL upper bound for the time step remains bounded when the order of the scheme increases

In this paper, we present an application of some known generalizations of the Exp-function method to the fifth-order Burgers and to the seventh-order Korteweg de Vries equations for the first time. The two examples show that the Exp-function method can be an effective alternative tool for explicitly

## Abstract It is well known that a Vandermonde matrix generates an ill‐conditioned system matrix when applied with finite numerical precision. This deficiency affects the Cauchy method by restricting its application to only lower order systems. This paper presents an innovative and accurate genera

In this paper, a new explicit numerical integration method is proposed. The proposed method is based on the relationship that m-step Adams-Moulton method is the linear convex combination of (m-1)-step Adams-Moulton and m-step Adams-Bashforth methods with a ÿxed weighting coe cient. By examining the