Title | Nonlinear Hyperbolic Problems [electronic resource] : Proceedings of an Advanced Research Workshop held in St. Etienne, France January 13-17, 1986 / edited by Claude Carasso, Denis Serre, Pierre-Arnaud Raviart |
---|---|
Imprint | Berlin, Heidelberg : Springer Berlin Heidelberg, 1987 |
Connect to | http://dx.doi.org/10.1007/BFb0078312 |
Descript | XVIII, 342 p. online resource |
Approximate solution of the generalized Riemann problem and applications -- Computation of oscillatory solutions to partial differential equations -- Preliminary results on the extension of eno schemes to two-dimensional problems -- Upwind differencing schemes for hyperbolic conservation laws with source terms -- The entropy dissipation by numerical viscosity in nonlinear conservative difference schemes -- 2-D and 3-D Euler computations with finite element methods in aerodynamics -- A โbox-schemeโ for the euler equations -- Numerical techniques in elastoplasticity -- An implicit centered scheme which gives non-oscillatory steady shocks -- A computer-aided system for investigation and construction of difference schemes of gas dynamics -- Lois de conservation et integrales d'energie des equations hyperboliques -- On symmetrizing hyperbolic differential equations -- A survey of nonstrictly hyperbolic conservation laws -- Admissibility criteria for phase boundaries -- The transformation from Eulerian to Lagrangian coordinates for solutions with discontinuities -- Two existence theorems for systems of conservation laws with dissipation -- Global solutions to some free boundary problems for quasilinear hyperbolic systems and applications -- Un theoreme d'existence globale en elasticite non lineaire mono-dimensionnelle -- A nonhomogeneous system of equations of nonisentropic gas dynamics -- Far field boundary conditions for steady state solutions to hyperbolic systems -- Can hyperbolic systems of conservation laws be well-posed in BV(R;RN)? -- Propagation des oscillations dans les systemes hyperboliques non lineaires -- Stability and decay in systems of conservation laws -- Different approach for the relation between the kinetic and the macroscopic equations -- Integrable transport processes