Periodic conservative solutions for the two-component Camassa-Holm system

Abstract

We construct a global continuous semigroup of weak periodic conservative solutions to the two-component Camassa-Holm system, ut-utxx+ ux+3uux-2uxuxx-uuxxx+ηx=0 and t+(u)x=0, for initial data (u,)|t=0 in H1 per× L2 per. It is necessary to augment the system with an associated energy to identify the conservative solution. We study the stability of these periodic solutions by constructing a Lipschitz metric. Moreover, it is proved that if the density is bounded away from zero, the solution is smooth. Furthermore, it is shown that given a sequence 0n of initial values for the densities that tend to zero, then the associated solutions un will approach the global conservative weak solution of the Camassa-Holm equation. Finally it is established how the characteristics govern the smoothness of the solution.