The shock formation and optimal regularities of the resulting shock curves for 1-D scalar conservation laws

Abstract

The study on the shock formation and the regularities of the resulting shock surfaces for hyperbolic conservation laws is a basic problem in the nonlinear partial differential equations. In this paper, we are concerned with the shock formation and the optimal regularities of the resulting shock curves for the 1-D conservation law ∂tu+∂xf(u)=0 with the smooth initial data u(0,x)=u0(x). If u0(x)∈ C1( R) and f(u)∈ C2( R), it is well-known that the solution u will blow up on the time T*=-1g'(x) when g'(x)<0 holds for g(x)=f'(u0(x)). Let x0 be a local minimum point of g'(x) such that g'(x0)=g'(x)<0 and g''(x0)=0, g(3)(x0)>0 (which is called the generic nondegenerate condition), then by Theorem 2 of Le94, a weak entropy solution u together with the shock curve x=(t)∈ C2[T*, T*+) starting from the blowup point (T*, x*=x0+g(x0)T*) can be locally constructed. When the generic nondegenerate condition is violated, namely, when x0 is a local minimum point of g'(x) such that g''(x0)=g(3)(x0)=...=g(2k0)(x0)=0 but g(2k0+1)(x0)>0 for some k0∈ N with k0 2; or g(k)(x0)=0 for any k∈ N and k 2, we will study the shock formation and the optimal regularity of the shock curve x=(t), meanwhile, some precise descriptions on the behaviors of u near the blowup point (T*, x*) are given. Our main aims are to show that: around the blowup point, the shock really appears whether the initial data are degenerate with finite orders or with infinite orders; the optimal regularities of the shock solution and the resulting shock curve have the explicit relations with the degenerate degrees of the initial data.