文摘
The Hunter–Saxton equation determines a flow of conservative solutions taking values in the space k to view the MathML source">H1(R+). However, the solution typically includes finite time gradient blowups, which make the solution flow not continuous w.r.t. the natural k to view the MathML source">H1 distance. The aim of this paper is to first study the generic properties of conservative solutions of some initial boundary value problems to the Hunter–Saxton type equations. Then using these properties, we give a new way to construct a Finsler type metric which renders the flow uniformly Lipschitz continuous on bounded subsets of k to view the MathML source">H1(R+).