Decay structure of two hyperbolic relaxationmodels with regularity loss

Yoshihiro Ueda, Renjun Duan, Shuichi Kawashima

Research output: Contribution to journalArticle

5 Citations (Scopus)

Abstract

This article investigates two types of decay structures for linear symmetric hyperbolic systems with nonsymmetric relaxation. Previously, the same authors introduced a new structural condition which is a generalization of the classical Kawashima- Shizuta condition and also analyzed theweak dissipative structure called the regularityloss type for general systems with nonsymmetric relaxation, which includes the Timoshenko system and the Euler-Maxwell system as two concrete examples. Inspired by the previous work, we further construct in this article two more complex models which satisfy some new decay structure of regularity-loss type. The proof is based on the elementary Fourier energy method as well as the suitable linear combination of different energy inequalities. The results show that themodel of type I has a decay structure similar to that of the Timoshenko system with heat conduction via the Cattaneo law, and themodel of type II is a direct extension of two models considered previously to the case of higher phase dimensions.

Original languageEnglish
Pages (from-to)235-292
Number of pages58
JournalKyoto Journal of Mathematics
Volume57
Issue number2
DOIs
Publication statusPublished - Jun 2017

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Regularity
Decay
Symmetric Hyperbolic Systems
Dissipative Structure
Energy Inequality
Euler System
Maxwell System
Fourier Method
Energy Method
Heat Conduction
Linear Combination
Model
Generalization

All Science Journal Classification (ASJC) codes

  • Mathematics(all)

Cite this

Decay structure of two hyperbolic relaxationmodels with regularity loss. / Ueda, Yoshihiro; Duan, Renjun; Kawashima, Shuichi.

In: Kyoto Journal of Mathematics, Vol. 57, No. 2, 06.2017, p. 235-292.

Research output: Contribution to journalArticle

Ueda, Yoshihiro ; Duan, Renjun ; Kawashima, Shuichi. / Decay structure of two hyperbolic relaxationmodels with regularity loss. In: Kyoto Journal of Mathematics. 2017 ; Vol. 57, No. 2. pp. 235-292.
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