TY - JOUR
T1 - High concentration property on discontinuity in two-dimensional unsteady compressible Euler equations
AU - Gao, Qihui
AU - Qu, Aifang
AU - Yang, Xiaozhou
AU - Yuan, Hairong
N1 - Publisher Copyright:
© 2025 Elsevier Inc.
PY - 2025/5/15
Y1 - 2025/5/15
N2 - We propose a new definition of measure-valued solutions for the two dimensional Euler equations with general pressure laws. This generalization of the traditional weak solutions can describe flow fields with properties of high concentrations on mass and momentum. We derive the intrinsic partial differential equations governing the front surface of the concentration discontinuities, which can at certain extend be considered as generalization of the classical Rankine-Hugoniot conditions for the Euler equations. We also get some new application results to singular Riemann problems of pressureless Euler equations.
AB - We propose a new definition of measure-valued solutions for the two dimensional Euler equations with general pressure laws. This generalization of the traditional weak solutions can describe flow fields with properties of high concentrations on mass and momentum. We derive the intrinsic partial differential equations governing the front surface of the concentration discontinuities, which can at certain extend be considered as generalization of the classical Rankine-Hugoniot conditions for the Euler equations. We also get some new application results to singular Riemann problems of pressureless Euler equations.
KW - Compressible Euler equations
KW - Concentration discontinuity
KW - Generalized Rankine-Hugoniot conditions
KW - Radon measure-valued solution
KW - Singular Riemann problem
UR - https://www.scopus.com/pages/publications/85216470212
U2 - 10.1016/j.jde.2025.01.082
DO - 10.1016/j.jde.2025.01.082
M3 - 文章
AN - SCOPUS:85216470212
SN - 0022-0396
VL - 427
SP - 194
EP - 218
JO - Journal of Differential Equations
JF - Journal of Differential Equations
ER -