Add to ORKGThe discontinuities piecewise analytic initial value problem for a wide class of conservation laws is considered which includes the full three-dimensional Euler equations. The initial interaction at an arbitrary curved surface is resolved in time by a convergent series. Among other features the solution exhibits shock, contact, and expansion waves as well as sound waves propagating on characteristic surfaces. The expansion waves correspond to he one-dimensional rarefactions but have a more complicated structure. The sound waves are generated in place of zero strength shocks, and they are caused by mismatches in derivatives
AbstractConsider a hyperbolic system of conservation laws with genuinely nonlinear characteristic fi...
AbstractThis work is a continuation of our previous work [Z.-Q. Shao, D.-X. Kong, Y.-C. Li, Shock re...
AbstractIn this paper we study the zero reaction limit of the hyperbolic conservation law with stiff...
AbstractThis work is a continuation of our previous work [Z.Q. Shao, Global structure stability of R...
AbstractIn order to investigate the linearized stability or instability of compressible flows, as it...
The present work is concerned with the extension of the theory of characteristics to conservation la...
The present work is concerned with the extension of the theory of characteristics to conservation la...
AbstractIn order to investigate the linearized stability or instability of compressible flows, as it...
The nature of wave interaction in a continuum dynamical model may undergo a qualitative change in ce...
AbstractWe introduce a new definition of a δ-shock wave type solution for a class of systems of cons...
Tese de doutoramento em Matemática (Análise Matemática), apresentada à Universidade de Lisboa atravé...
AbstractThis paper is the third in a series that undertakes a systematic investigation of Riemann so...
AbstractWe prove that the Cauchy problem for an n×n system of strictly hyperbolic conservation laws ...
AbstractThis work is a continuation of our previous work, in the present paper we study the mixed in...
A wide class of difference equations is described for approximating discontinuous time dependent sol...
AbstractConsider a hyperbolic system of conservation laws with genuinely nonlinear characteristic fi...
AbstractThis work is a continuation of our previous work [Z.-Q. Shao, D.-X. Kong, Y.-C. Li, Shock re...
AbstractIn this paper we study the zero reaction limit of the hyperbolic conservation law with stiff...
AbstractThis work is a continuation of our previous work [Z.Q. Shao, Global structure stability of R...
AbstractIn order to investigate the linearized stability or instability of compressible flows, as it...
The present work is concerned with the extension of the theory of characteristics to conservation la...
The present work is concerned with the extension of the theory of characteristics to conservation la...
AbstractIn order to investigate the linearized stability or instability of compressible flows, as it...
The nature of wave interaction in a continuum dynamical model may undergo a qualitative change in ce...
AbstractWe introduce a new definition of a δ-shock wave type solution for a class of systems of cons...
Tese de doutoramento em Matemática (Análise Matemática), apresentada à Universidade de Lisboa atravé...
AbstractThis paper is the third in a series that undertakes a systematic investigation of Riemann so...
AbstractWe prove that the Cauchy problem for an n×n system of strictly hyperbolic conservation laws ...
AbstractThis work is a continuation of our previous work, in the present paper we study the mixed in...
A wide class of difference equations is described for approximating discontinuous time dependent sol...
AbstractConsider a hyperbolic system of conservation laws with genuinely nonlinear characteristic fi...
AbstractThis work is a continuation of our previous work [Z.-Q. Shao, D.-X. Kong, Y.-C. Li, Shock re...
AbstractIn this paper we study the zero reaction limit of the hyperbolic conservation law with stiff...