Well-Posedness and Singular Limit of a Semilinear Hyperbolic Relaxation System with a Two-Scale Discontinuous Relaxation Rate

Nonlinear hyperbolic systems with relaxations may encounter different scales of relaxation time, which is a prototype multiscale phenomenon that arises in many applications. In such a problem the relaxation time is of O(1) in part of the domain and very small in the remaining domain in which the solution can be approximated by the zero relaxation limit which can be solved numerically much more efficiently. For the Jin–Xin relaxation system in such a two-scale setting, we establish its wellposedness and singular limit as the (smaller) relaxation time goes to zero. The limit is a multiscale coupling problem which couples the original Jin–Xin system on the domain when the relaxation time is O(1) with its relaxation limit in the other domain through interface conditions which can be derived by matched interface layer analysis.As a result, we also establish the well-posedness and regularity (such as boundedness in sup norm with bounded total variation and L1-contraction) of the coupling problem, thus providing a rigorous mathematical foundation, in the general nonlinear setting, to the multiscale domain decomposition method for this two-scale problem originally proposed in Jin et al. in Math. Comp. 82, 749–779, 2013.

[1]  Z. Xin,et al.  The relaxation schemes for systems of conservation laws in arbitrary space dimensions , 1995 .

[2]  Guillaume Bal,et al.  Mathematical Modelling and Numerical Analysis Coupling of Transport and Diffusion Models in Linear Transport Theory , 2022 .

[3]  Huijiang Zhao FIRST ORDER QUASILINEAR EQUATIONS IN SEVERAL INDEPENDENT VARIABLES WITH SINGULAR INITIAL DATA Lp(p , 1996 .

[4]  P. Hartman A lemma in the theory of structural stability of differential equations , 1960 .

[5]  C. Cercignani The Boltzmann equation and its applications , 1988 .

[6]  François Golse,et al.  A Domain Decomposition Analysis for a Two-Scale Linear Transport Problem , 2003 .

[7]  E Weinan,et al.  The Heterognous Multiscale Methods , 2003 .

[8]  G. Rybicki Radiative transfer , 2019, Climate Change and Terrestrial Ecosystem Modeling.

[9]  Z. Xin,et al.  Stiff Well-Posedness and Asymptotic Convergence for a Class of Linear Relaxation Systems in a Quarter Plane , 2000 .

[10]  Stefano Bianchini,et al.  Hyperbolic limit of the Jin‐Xin relaxation model , 2006 .

[11]  D. Serre Relaxations semi-linaire et cintique des systmes de lois de conservation , 2000 .

[12]  Patrick Le Tallec,et al.  Coupling Boltzmann and Euler equations without overlapping , 1992 .

[13]  B. Perthame,et al.  A kinetic equation with kinetic entropy functions for scalar conservation laws , 1991 .

[14]  T. Teichmann,et al.  Introduction to physical gas dynamics , 1965 .

[15]  Li Wang,et al.  A domain decomposition method for semilinear hyperbolic systems with two-scale relaxations , 2012, Math. Comput..

[16]  H. Weinberger,et al.  Maximum principles in differential equations , 1967 .

[17]  Roberto Natalini,et al.  Recent Mathematical Results on Hyperbolic Relaxation Problems , 1999 .

[18]  R. Gorenflo,et al.  Multi-index Mittag-Leffler Functions , 2014 .

[19]  L. Chambers Linear and Nonlinear Waves , 2000, The Mathematical Gazette.

[20]  J. Nédélec,et al.  First order quasilinear equations with boundary conditions , 1979 .

[21]  D. Haar,et al.  Statistical Physics , 1971, Nature.

[22]  Pierre Degond,et al.  Kinetic boundary layers and fluid-kinetic coupling in semiconductors , 1999 .

[23]  M. Tidriri,et al.  New Models for the Solution of Intermediate Regimes in Transport Theory and Radiative Transfer: Existence Theory, Positivity, Asymptotic Analysis, and Approximations , 2001 .

[24]  R. Natalini Convergence to equilibrium for the relaxation approximations of conservation laws , 1996 .

[25]  E. Giusti Minimal surfaces and functions of bounded variation , 1977 .

[26]  Luc Mieussens,et al.  Macroscopic Fluid Models with Localized Kinetic Upscaling Effects , 2006, Multiscale Model. Simul..

[27]  Tao Tang,et al.  Pointwise Error Estimates for Relaxation Approximations to Conservation Laws , 2000, SIAM J. Math. Anal..

[28]  Manuel Torrilhon,et al.  Two-Dimensional Bulk Microflow Simulations Based on Regularized Grad's 13-Moment Equations , 2006, Multiscale Model. Simul..

[29]  Axel Klar,et al.  Convergence of Alternating Domain Decomposition Schemes for Kinetic and Aerodynamic Equations , 1995 .

[30]  C. M. Dafermos,et al.  Hyberbolic [i.e. Hyperbolic] conservation laws in continuum physics , 2005 .

[31]  E Weinan,et al.  Heterogeneous multiscale methods: A review , 2007 .

[32]  A. Tzavaras,et al.  Contractive relaxation systems and the scalar multidimensional conservation law , 1997 .

[33]  C. D. Levermore,et al.  Hyperbolic conservation laws with stiff relaxation terms and entropy , 1994 .

[34]  A. Vasseur A Rigorous Derivation of the Coupling of a Kinetic Equation and Burgers’ Equation , 2012 .

[35]  Shi Jin,et al.  A Smooth Transition Model between Kinetic and Diffusion Equations , 2004, SIAM J. Numer. Anal..