Collision of solitons for a non-homogenous version of the KdV equation

Abstract

We consider KdV-type equations with C1 nonhomogeneous nonlinearities and small dispersion . The first result consists in the conclusion that, in the leading term with respect to , the solitary waves in this model interact like KdV solitons. Next it turned out that there exists a very interesting scenario of instability in which the short-wave soliton remains stable whereas a small long-wave part, generated by perturbations of original equation, turns to be unstable, growing and destroying the leading term. At the same time, such perturbation can eliminate the collision of solitons.