Jinlu Li, Yanghai Yu, Weipeng Zhu
Published 2020-11-28Version 1
The failure of uniform dependence on the data is an interesting property of classical solution for a hyperbolic system. In this paper, we consider the solution map of the Cauchy problem to the 2D viscous shallow water equations which is a hyperbolic-parabolic system. We prove that the solution map of this problem is not uniformly continuous in Sobolev spaces $H^s\times H^{s}$ for $s>2$.
Ill-posedness for the 2D viscous shallow water equations in the critical Besov spaces
Stability of $L^\infty$ solutions for hyperbolic systems with coinciding shocks and rarefactions
Ill-posedness issue for the 2D viscous shallow water equations in some critical Besov spaces
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