On the blowup mechanism of smooth solutions to 1D quasilinear strictly hyperbolic systems with large initial data

Abstract

For the first order 1D n× n quasilinear strictly hyperbolic system ∂tu+F(u)∂xu=0 with u(x, 0)= u0(x), where >0 is small, u0(x) 0 and u0(x)∈ C02( R), when at least one eigenvalue of F(u) is genuinely nonlinear, it is well-known that on the finite blowup time T, the derivatives ∂t,xu blow up while the solution u keeps to be small. For the 1D scalar equation or 2× 2 strictly hyperbolic system (corresponding to n=1, 2), if the smooth solution u blows up in finite time, then the blowup mechanism can be well understood (i.e., only the blowup of ∂t,xu happens). In the present paper, for the n× n (n≥ 3) strictly hyperbolic system with a class of large initial data, we are concerned with the blowup mechanism of smooth solution u on the finite blowup time and the detailed singularity behaviours of ∂t,xu near the blowup point. Our results are based on the efficient decomposition of u along the different characteristic directions, the suitable introduction of the modulated coordinates and the global weighted energy estimates.