Ill-posedness issue for the 2D viscous shallow water equations in some critical Besov spaces

Abstract

We study the Cauchy problem of the 2D viscous shallow water equations in some critical Besov spaces B2pp,1(R2)× B2p-1p,q(R2). As is known, this system is locally well-posed for large initial data as well as globally well-posed for small initial data in B2pp,1(R2)× B2p-1p,1(R2) for p<4 and ill-posed in B2pp,1(R2)× B2p-1p,1(R2) for p>4. In this paper, we prove that this system is ill-posed for the critical case p=4 in the sense of "norm inflation". Furthermore, we also show that the system is ill-posed in B124,1(R2)× B-124,q(R2) for any q≠ 2