耗散系统
数学
类型(生物学)
色散(光学)
特征向量
数学分析
压缩性
傅里叶变换
物理
机械
热力学
生态学
量子力学
生物
光学
作者
Shuichi Kawashima,Yoshihiro Shibata,Jiang Xu
标识
DOI:10.1080/03605302.2021.1983596
摘要
In this paper, we are concerned with generally symmetric hyperbolic-parabolic systems with Korteweg-type dispersion. Referring to those classical efforts by Kawashima et al., we formulate new structural conditions for the Korteweg-type dispersion and develop the dissipative mechanism of “regularity-gain type.” As an application, it is checked that several concrete model systems (e.g., the compressible Navier-Stokes(-Fourier)-Korteweg system) satisfy the general structural conditions. In addition, the optimality of our general theory on the dissipative structure is also verified by calculating the asymptotic expansions of eigenvalues.
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