数学物理学报(英文版) ›› 2018, Vol. 38 ›› Issue (3): 1043-1056.doi: 10.1016/S0252-9602(18)30800-2

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INITIAL BOUNDARY VALUE PROBLEM FOR A NONCONSERVATIVE SYSTEM IN ELASTODYNAMICS

K. Divya JOSEPH, P. A. DINESH   

  1. Department of Mathematics, M. S. Ramaiah Institute of Technology MSRIT P. O, Bangalore 560054, India
  • 收稿日期:2017-07-07 出版日期:2018-06-25 发布日期:2018-06-25
  • 作者简介:K. Divya JOSEPH,E-mail:divyakj@msrit.edu;P.A.DINESH,E-mail:dineshdpa@msrit.edu

INITIAL BOUNDARY VALUE PROBLEM FOR A NONCONSERVATIVE SYSTEM IN ELASTODYNAMICS

K. Divya JOSEPH, P. A. DINESH   

  1. Department of Mathematics, M. S. Ramaiah Institute of Technology MSRIT P. O, Bangalore 560054, India
  • Received:2017-07-07 Online:2018-06-25 Published:2018-06-25

摘要:

This article is concerned with the initial boundary value problem for a nonconservative system of hyperbolic equation appearing in elastodynamics in the space time domain x > 0, t > 0. The number of boundary conditions, to be prescribed at the boundary x=0, depends on the number of characteristics entering the domain. Because our system is nonlinear, the characteristic speeds depends on the unknown and the direction of the characteristics curves are known apriori. As it is well known, the boundary condition has to be understood in a generalised way. One of the standard way is using vanishing viscosity method. We use this method to construct solution for a particular class of initial and boundary data, namely the initial and boundary datas that lie on the level sets of one of the Riemann invariants.

关键词: Elastodynamics, viscous shocks

Abstract:

This article is concerned with the initial boundary value problem for a nonconservative system of hyperbolic equation appearing in elastodynamics in the space time domain x > 0, t > 0. The number of boundary conditions, to be prescribed at the boundary x=0, depends on the number of characteristics entering the domain. Because our system is nonlinear, the characteristic speeds depends on the unknown and the direction of the characteristics curves are known apriori. As it is well known, the boundary condition has to be understood in a generalised way. One of the standard way is using vanishing viscosity method. We use this method to construct solution for a particular class of initial and boundary data, namely the initial and boundary datas that lie on the level sets of one of the Riemann invariants.

Key words: Elastodynamics, viscous shocks