Add to ORKGThe system of quasilinear equations for symmetric flows of a viscous heat-conducting gas with a free external boundary is considered. For global in time weak solutions hav-ing nonstrictly positive density, the linear in time two-sided bounds for the gas volume growth are established. Copyright © 2006 Alexander Zlotnik. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. 1
The main concern of this paper is to study large-time behavior of solutions to an ideal polytropic m...
AbstractWe study nonlinear systems of ordinary differential equations that arise when considering st...
Abstract: It is considered the asymptotic behaviour of the solution to the whole system of...
International audienceWe investigate the fast relaxation of internal energy in nonequilibrium gas mo...
Global solutions of the multidimensional Navier-Stokes equations for compressible heat-conducting fl...
This volume introduces a systematic approach to the solution of some mathematical problems that aris...
This volume introduces a systematic approach to the solution of some mathematical problems that aris...
We show the blow-up of strong solution of viscous heat-conducting flow when the initial density is c...
AbstractThe existence of global classical solutions to initial boundary value problems in the dynami...
AbstractWe show the blow-up of strong solution of viscous heat-conducting flow when the initial dens...
We show the blow-up of smooth solution of viscous heat-conducting flow when the initial density is c...
AbstractIn this paper we study a free boundary problem for the viscous, compressible, heat conductin...
AbstractWe study a system of quasilinear equations describing one-dimensional flow of a viscous comp...
AbstractA mathematical model for viscous, real, compressible, reactive fluid flows is considered. Th...
Abstract: Power geometry is applied here for the first time to the system of partial diffe...
The main concern of this paper is to study large-time behavior of solutions to an ideal polytropic m...
AbstractWe study nonlinear systems of ordinary differential equations that arise when considering st...
Abstract: It is considered the asymptotic behaviour of the solution to the whole system of...
International audienceWe investigate the fast relaxation of internal energy in nonequilibrium gas mo...
Global solutions of the multidimensional Navier-Stokes equations for compressible heat-conducting fl...
This volume introduces a systematic approach to the solution of some mathematical problems that aris...
This volume introduces a systematic approach to the solution of some mathematical problems that aris...
We show the blow-up of strong solution of viscous heat-conducting flow when the initial density is c...
AbstractThe existence of global classical solutions to initial boundary value problems in the dynami...
AbstractWe show the blow-up of strong solution of viscous heat-conducting flow when the initial dens...
We show the blow-up of smooth solution of viscous heat-conducting flow when the initial density is c...
AbstractIn this paper we study a free boundary problem for the viscous, compressible, heat conductin...
AbstractWe study a system of quasilinear equations describing one-dimensional flow of a viscous comp...
AbstractA mathematical model for viscous, real, compressible, reactive fluid flows is considered. Th...
Abstract: Power geometry is applied here for the first time to the system of partial diffe...
The main concern of this paper is to study large-time behavior of solutions to an ideal polytropic m...
AbstractWe study nonlinear systems of ordinary differential equations that arise when considering st...
Abstract: It is considered the asymptotic behaviour of the solution to the whole system of...