On the expansion of a wedge of van der Waals gas into a vacuum
From MaRDI portal
Publication:2343532
DOI10.1016/j.jde.2015.02.039zbMath1317.35203OpenAlexW4206631264MaRDI QIDQ2343532
Publication date: 6 May 2015
Published in: Journal of Differential Equations (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jde.2015.02.039
Nonlinear boundary value problems for linear elliptic equations (35J65) PDEs in connection with fluid mechanics (35Q35) Degenerate elliptic equations (35J70) Hyperbolic conservation laws (35L65) Free boundary problems for PDEs (35R35) Euler equations (35Q31)
Related Items (27)
Expansion of a wedge of non-ideal gas into vacuum ⋮ Rarefaction wave interaction and shock-rarefaction composite wave interaction for a two-dimensional nonlinear wave system ⋮ The two dimensional gas expansion problem of the Euler equations for a class of pressure laws ⋮ Sonic-supersonic solutions for the two dimensional steady relativistic Euler equations ⋮ Simple waves for two-dimensional magnetohydrodynamics with extended Chaplygin gas ⋮ Classification of the Riemann problem for compressible two-dimensional Euler system in non-ideal gas ⋮ Interactions of Composite Waves of the Two-Dimensional Full Euler Equations for Van Der Waals Gases ⋮ Simple waves of the two dimensional compressible Euler equations in magnetohydrodynamics ⋮ Two-dimensional pseudo-steady supersonic isothermal flow around a sharp corner ⋮ Existence of solutions to gas expansion problem through a sharp corner for 2‐D Euler equations with general equation of state ⋮ On the existence and regularity of solutions of semihyperbolic patches to 2‐D Euler equations with van der Waals gas ⋮ Interactions of rarefaction waves and rarefaction shocks of the two-dimensional compressible Euler equations with general equation of state ⋮ Degenerate Cauchy–Goursat problem for 2‐D steady isentropic Euler system with van der Waals gas ⋮ On the expansion of a wedge of van der Waals gas into a vacuum. II ⋮ Global existence of smooth solutions for the one-dimensional full Euler system for a dusty gas ⋮ Three‐dimensional stationary supersonic flows with axial symmetry in relativistic hydrodynamics ⋮ The expansion of a non‐ideal gas around a sharp corner for 2‐D compressible Euler system ⋮ Two‐dimensional pseudo‐steady supersonic flow around a sharp corner ⋮ Two dimensional relativistic Euler equations in a convex duct ⋮ Interaction of fan–jump–fan composite waves in a two-dimensional steady jet for van der Waals gases ⋮ The expansion of supersonic flows into a vacuum through a convex duct with limited length ⋮ Interaction of a centered simple wave and a planar rarefaction wave of the two-dimensional Euler equations for pseudo-steady compressible flow ⋮ Two-dimensional pseudosteady flows around a sharp corner ⋮ Expansion of gas by turning a sharp corner into vacuum for 2-D pseudo-steady compressible magnetohydrodynamics system ⋮ Global solutions to a class of two-dimensional Riemann problems for the Euler equations with a general equation of state ⋮ On the rarefaction waves of the two-dimensional compressible Euler equations for magnetohydrodynamics ⋮ Interaction of jump-fan composite waves in a two-dimensional jet for van der Waals gases
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Riemann boundary value problems and reflection of shock for the Chaplygin gas
- Characteristic decompositions and interactions of rarefaction waves of 2-D Euler equations
- A self-similar solution of a shock propagation in a dusty gas
- Simple waves and pressure delta waves for a Chaplygin gas in two-dimensions
- Interaction of four rarefaction waves in the bi-symmetric class of the pressure-gradient system
- Interaction of rarefaction waves of the two-dimensional self-similar Euler equations
- Simple waves and a characteristic decomposition of the two-dimensional compressible Euler equations
- Global solutions of shock reflection by large-angle wedges for potential flow
- Interaction of four rarefaction waves in the bi-symmetric class of the two-dimensional Euler equations
- Multidimensional shock interaction for a Chaplygin gas
- The Riemann problem for general systems of conservation laws
- Systems of conservation laws. Two-dimensional Riemann problems
- Existence of a global smooth solution for a degenerate Goursat problem of gas dynamics
- The Riemann problem for materials with nonconvex equation of state. II: General flow
- Degenerate Goursat-type boundary value problems arising from the study of two-dimensional isothermal Euler equations
- The expansion of gas from a wedge with small angle into a vacuum
- Interaction of three and four rarefaction waves of the pressure-gradient system
- Two-dimensional regular shock reflection for the pressure gradient system of conservation laws
- The Riemann problem for materials with nonconvex equations of state. I: Isentropic flow
- On the Two-Dimensional Gas Expansion for Compressible Euler Equations
- Two-Dimensional Riemann Problems for Chaplygin Gas
- Global Smooth Solutions of Euler Equations for Van der Waals Gases
- On the stability of laminar flow of a dusty gas
- Conjecture on the Structure of Solutions of the Riemann Problem for Two-Dimensional Gas Dynamics Systems
- Supersonic flow onto a solid wedge
- The interaction of rarefaction waves of the two-dimensional Euler equations
- The Riemann problem for the transportation equations in gas dynamics
- A free boundary problem for a quasi-linear degenerate elliptic equation: Regular reflection of weak shocks
- Riemann Problem for the Euler Equation with Non-Convex Equation of State including Phase Transitions
- The Riemann problem for fluid flow of real materials
This page was built for publication: On the expansion of a wedge of van der Waals gas into a vacuum
