Asymptotic behavior of solutions for a degenerate hyperbolic system of viscous conservation laws with boundary effect

We consider the asymptotic stability of viscous shock wave , for scalar viscous conservation laws Our problem is divided into three cases depending on the sign of shock speed s of the shock (u & , u + ). When s 0, the asymptotic state of u becomes ,( } +d(t)), where d(t) depends implicitly on the i

We consider two classes of typical degenerate hyperbolic systems of conservation laws to provide a general approach for solving the existence and large-time asymptotic behavior of measure-valued solutions for initial-boundary value problems. Some existence theorems of the measure-valued solutions ar

This paper is concerned with the asymptotic behaviors of the solutions to the initialboundary value problem for scalar viscous conservations laws ut + f(u), = uzz on [0, 11, with the boundary condition u(O,t) = u\_(t) -+ u\_, u(l,t) = u+(t) + u+, as t --t +m and the initial data u(z,O) = uo(z) satis