Formation and construction of large variational shock waves for 1-D n× n quasilinear hyperbolic conservation systems

Abstract

In the paper [Li Jun, Xu Gang, Yin Huicheng, On the blowup mechanism of smooth solutions to 1D quasilinear strictly hyperbolic systems with large variational initial data, Nonlinearity 38 (2025), No.2, 025016], for the 1-D n× n (n≥slant 3) strictly hyperbolic system ∂tv+F(v)∂xv=0 with some classes of large variational initial data v(x, 0), the geometric blowup mechanism and the detailed singularity behaviours of ∂x,tv near the blowup point are studied when the n× n matrix F(v) admits at least one genuinely nonlinear eigenvalue. In this paper, we focus on the formation and construction of a large variational shock wave from the blowup point for 1-D n× n quasilinear hyperbolic conservation law system ∂tu+∂xf(u)=0 when some smooth simple wave solution is generic non-degenerate before the formation of singularity and the corresponding eigenvalue is genuinely nonlinear.