On the Benney–Lin and Kawahara Equations

By using the solutions of an auxiliary ordinary differential equation, a direct algebraic method is described to construct the exact travelling wave solutions for nonlinear evolution equations. By this method the Kawahara and the modified Kawahara equations are investigated and new exact travelling

We consider Benney's equations, and their reductions to systems with finitely many Riemann invariants. The equations w x describing these reductions were given in 5 and a construction of a class of their solutions was briefly described there. Here we discuss the properties of these equations in more

In this paper, we consider the nonlinear evolution equations such as Kawahara equation and modified Kawahara equation. By using the tanh method and an exp-function method, the travelling wave solutions for the these equations are presented. New exact travelling solutions are explicitly obtained with

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