Self-Similar Blowup Solutions to the 2-Component Camassa-Holm Equations

Abstract

In this article, we study the self-similar solutions of the 2-component Camassa-Holm equations% equation \ array [c]c% t+ux+ ux=0 mt+2uxm+umx+σx=0 array . equation with equation m=u-α2uxx. equation By the separation method, we can obtain a class of blowup or global solutions for σ=1 or -1. In particular, for the integrable system with σ=1, we have the global solutions:% equation \ array [c]c% (t,x)=\ array [c]c% f( η) a(3t)1/3, for η2< α2 0, for η2≥α2% array . ,u(t,x)=·a(3t)a(3t)x ··a(s)-3a(s)1/3=0, a(0)=a0% >0, ·a(0)=a1 f(η)=-1η2+( α) 2% array . equation where η=xa(s)1/3 with s=3t; >0 and α≥0 are arbitrary constants. Our analytical solutions could provide concrete examples for testing the validation and stabilities of numerical methods for the systems.