A note on stability investigations for Rosenbrock-type methods for quasilinear-implicit differential equations

Simple, mesh=grid free, explicit and implicit numerical schemes for the solution of linear advection-di usion problems is developed and validated herein. Unlike the mesh or grid-based methods, these schemes use well distributed quasi-random points and approximate the solution using global radial bas

In this paper we establish the nonlinear stability of solitary traveling-wave solutions for the Kawahara-KdV equation and the modified Kawahara-KdV equation where γ i ∈ R is a positive number when i = 1, 2. The main approach used to determine the stability of solitary traveling waves will be the t

In the literature [1] [Existence and uniqueness of the solutions and convergence of semiimplicit Euler methods for stochastic pantograph equation, J. Math. Anal. Appl. 325 (2007Appl. 325 ( ) 1142Appl. 325 ( -1159]], Fan and Liu investigated the existence and uniqueness of the solution for stochastic