Compactons: Solitons with finite wavelength

The understand the role of nonlinear dispersion in pattern formation, we introduce and study Korteweg-de Vries-like equations wtih nonlinear dispersion: u_t+(u^m)_x+(uⁿ)_xxx=0, m,n>1. The solitary wave solutions of these equations have remarkable properties: They collide elastically, but unlike the Korteweg-de Vries (m=2, n=1) solitons, they have compact support. When two ``compactons'' collide, the interaction site is marked by the birth of low-amplitude compacton-anticompacton pairs. These equations seem to have only a finite number of local conservation laws. Nevertheless, the behavior and the stability of these compactons is very similar to that observed in completely integrable systems.