Dual-Family Viscous Shock Waves in n Conservation Laws with Application to Multi-Phase Flow in Porous Media
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- 作者:Dan Marchesin and Alexei A. Mailybaev
- 刊名:Archive for Rational Mechanics and Analysis
- 出版年:2006
- 出版时间:September, 2006
- 年:2006
- 卷:182
- 期:1
- 页码:1-24
- 全文大小:344 KB
文摘
We consider shock waves satisfying the viscous profile criterion in general systems of n conservation laws. We study S i, j dual-family shock waves, which are associated with a pair of characteristic families i and j. We explicitly introduce defining equations relating states and speeds of S i, j shocks, which include the Rankine–Hugoniot conditions and additional equations resulting from the viscous profile requirement. We then develop a constructive method for finding the general local solution of the defining equations for such shocks and derive formulae for the sensitivity analysis of S i, j shocks under change of problem parameters. All possible structures of solutions to the Riemann problems containing S i, j shocks and classical waves are described. As a physical application, all types of S i, j shocks with i>j are detected and studied in a family of models for multi-phase flow in porous media.