On Initial Boundary Value Problems for a Viscous, Heat-Conducting, One-Dimensional Real-Gas

This paper deals with model equations for linearly viscous materials. Viscosity is allowed to vary with temperature. The global solvability of an initial-boundary value problem for nonlinear equations is proved by continuation of a local solution with the help of a priori estimates. The main attenti

We consider initial boundary value problems for the equations of the one-dimensional motion of a viscous, heat -conducting gas with density -dependent viscosity that decreases (to zero) with decreasing density. We prove that if the viscosity does not decrease to zero too rapidly, then smooth solutio

A matricial formalism to solve multi-dimensional initial boundary values problems for hyperbolic equations written in quasi-linear based on the λ scheme approach is presented. The derivation is carried out for nonorthogonal, moving systems of curvilinear coordinates. A uniform treatment of the integ