English

Shock waves for radiative hyperbolic--elliptic systems

Analysis of PDEs 2019-07-25 v1

Abstract

The present paper deals with the following hyperbolic--elliptic coupled system, modelling dynamics of a gas in presence of radiation, ut+f(u)x+Lqx=0,qxx+Rq+Gux=0,u_{t}+ f(u)_{x} +Lq_{x}=0, -q_{xx} + Rq +G\cdot u_{x}=0, where uRnu\in\R^{n}, qRq\in\R and R>0R>0, GG, LRnL\in\R^{n}. The flux function f:RnRnf : \R^n\to\R^n is smooth and such that f\nabla f has nn distinct real eigenvalues for any uu. The problem of existence of admissible radiative shock wave is considered, i.e. existence of a solution of the form (u,q)(x,t):=(U,Q)(xst)(u,q)(x,t):=(U,Q)(x-st), such that (U,Q)(±)=(u±,0)(U,Q)(\pm\infty)=(u_\pm,0), and u±Rnu_\pm\in\R^n, sRs\in\R define a shock wave for the reduced hyperbolic system, obtained by formally putting L=0. It is proved that, if uu_- is such that λk(u)rk(u)0\nabla\lambda_{k}(u_-)\cdot r_{k}(u_-)\neq 0,(where λk\lambda_k denotes the kk-th eigenvalue of f\nabla f and rkr_k a corresponding right eigenvector) and (k(u)L)(Grk(u))>0(\ell_{k}(u_{-})\cdot L) (G\cdot r_{k}(u_{-})) >0, then there exists a neighborhood U\mathcal U of uu_- such that for any u+Uu_+\in{\mathcal U}, sRs\in\R such that the triple (u,u+;s)(u_{-},u_{+};s) defines a shock wave for the reduced hyperbolic system, there exists a (unique up to shift) admissible radiative shock wave for the complete hyperbolic--elliptic system. Additionally, we are able to prove that the profile (U,Q)(U,Q) gains smoothness when the size of the shock u+u|u_+-u_-| is small enough, as previously proved for the Burgers' flux case. Finally, the general case of nonconvex fluxes is also treated, showing similar results of existence and regularity for the profiles.

Keywords

Cite

@article{arxiv.math/0606354,
  title  = {Shock waves for radiative hyperbolic--elliptic systems},
  author = {Corrado Lattanzio and Corrado Mascia and Denis Serre},
  journal= {arXiv preprint arXiv:math/0606354},
  year   = {2019}
}

Comments

32 pages