Add to ORKGIn this paper, we study the uniqueness of the steady 1-D shock solutions for the inviscid compressible Euler system in a finite nozzle via asymptotic analysis for physical parameters. The parameters for the heat conductivity and the temperature-depending viscosity are investigated for both barotropic gases and polytropic gases. It finally turns out that the hypotheses on the physical effects have significant influences on the asymptotic behaviors as the parameters vanish. In particular, the positions of the shock front for the limit shock solution( if exists ) are different for different hypotheses. Hence, it seems impossible to figure out a criterion selecting the unique shock solution within the framework of the inviscid Euler flows.Comme...
In this note we review and recast some recent results on the existence of non-standard solutions to ...
AbstractIn this paper we study the asymptotic limiting behavior of the solutions to the initial boun...
Guderley's 1942 work on radial shock waves provides cases of self-similar Euler flows exhibiting blo...
We treat the 1D shock tube problem, establishing existence of steady solutions of full (nonisentropi...
AbstractWe study the zero-dissipation problem for a one-dimensional model system for the isentropic ...
Steady nozzle flows of Bethe-Zel'dovich-Thompson fluids - substances exhibiting non-classical gasdyn...
A classical result of Gilbarg states that a simple shock wave solution of Euler's equations is compr...
We consider the Cauchy problem for the isentropic compressible Euler equations in a three-dimensiona...
In chapter 1, we focus on the full potential equation in an infinite nozzle with some decay cross-se...
summary:Our aim is to find roots of the non-unique behavior of gases which can be observed in certai...
AbstractIn this paper, we investigate the asymptotic behavior of the generalized solution to the com...
In this thesis, we present a collection of newly obtained results concerning the existence of vanish...
We are concerned with globally defined entropy solutions to the Euler equations for compressible flu...
AbstractIn this paper, we study a transonic shock problem for the Euler flows through a class of 2-D...
We are concerned with the global existence of entropy solutions for the compressible Euler equations...
In this note we review and recast some recent results on the existence of non-standard solutions to ...
AbstractIn this paper we study the asymptotic limiting behavior of the solutions to the initial boun...
Guderley's 1942 work on radial shock waves provides cases of self-similar Euler flows exhibiting blo...
We treat the 1D shock tube problem, establishing existence of steady solutions of full (nonisentropi...
AbstractWe study the zero-dissipation problem for a one-dimensional model system for the isentropic ...
Steady nozzle flows of Bethe-Zel'dovich-Thompson fluids - substances exhibiting non-classical gasdyn...
A classical result of Gilbarg states that a simple shock wave solution of Euler's equations is compr...
We consider the Cauchy problem for the isentropic compressible Euler equations in a three-dimensiona...
In chapter 1, we focus on the full potential equation in an infinite nozzle with some decay cross-se...
summary:Our aim is to find roots of the non-unique behavior of gases which can be observed in certai...
AbstractIn this paper, we investigate the asymptotic behavior of the generalized solution to the com...
In this thesis, we present a collection of newly obtained results concerning the existence of vanish...
We are concerned with globally defined entropy solutions to the Euler equations for compressible flu...
AbstractIn this paper, we study a transonic shock problem for the Euler flows through a class of 2-D...
We are concerned with the global existence of entropy solutions for the compressible Euler equations...
In this note we review and recast some recent results on the existence of non-standard solutions to ...
AbstractIn this paper we study the asymptotic limiting behavior of the solutions to the initial boun...
Guderley's 1942 work on radial shock waves provides cases of self-similar Euler flows exhibiting blo...