Alberto Bressan, Helge Holden, Xavier Raynaud
Published 2009-04-23Version 1
We study stability of solutions of the Cauchy problem for the Hunter-Saxton equation $u_t+uu_x=\frac14(\int_{-\infty}^xu_x^2 dx-\int_{x}^\infty u_x^2 dx)$ with initial data $u_0$. In particular, we derive a new Lipschitz metric $d_\D$ with the property that for two solutions $u$ and $v$ of the equation we have $d_\D(u(t),v(t))\le e^{Ct} d_\D(u_0,v_0)$.
The Cauchy problem for a Schroedinger - Korteweg - de Vries system with rough data
On the Cauchy problem of a periodic 2-component $μ$-Hunter-Saxton equation
Global conservative solutions of the Camassa-Holm equation for initial data nonvanishing asymptotics
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