The linear instability for a generalization of the Oberbeck-Boussinesq system towards slightly compressible fluids shows a lower critical Rayleigh number in the Benard problem
For arbitrary Rayleigh number, Ra, Prandtl number, and any ratio of the cylindrical radii, existence...
cited By 0International audienceThe linear stability threshold of the Rayleigh-Bénard configuration ...
International audienceWe consider the Boltzmann equation for a gas in a horizontal slab, subject to ...
An Oberbeck-Boussinesq-like approximation for a compressible fluid is investigated in 3-D from the p...
We study the nonlinear almost compressible 2D Oberbeck-Boussinesq system, characterized by an extra ...
We provide sufficient conditions for nonlinear exponential stability of the compressible Benard prob...
This paper shows the existence, uniqueness, and asymptotic behavior in time of regular solutions (a ...
Non-linear energy stability for the compressible Benard problem is studied for regular solutions
A linear stability analysis of the Benard problem for deep convection is performed. An estimate of t...
The Oberbeck-Boussinesq (OB) approximation for a compressible fluid in Bénard’s problem geometry is...
In this paper we apply the ideas introduced with the so-called extended-quasi-thermal-incompressible...
none3The linear stability of the magnetic Rayleigh Bénard problem for a general compressible horizo...
We propose a unied asymptotic approach in order to derive the Oberbeck-Boussinesq approxi-mation fro...
We consider the Boltzmann equation for a gas in a horizontal slab, subject to a gravitational force....
Perfectly incompressible materials do not exist in nature but are a useful approximation of several ...
For arbitrary Rayleigh number, Ra, Prandtl number, and any ratio of the cylindrical radii, existence...
cited By 0International audienceThe linear stability threshold of the Rayleigh-Bénard configuration ...
International audienceWe consider the Boltzmann equation for a gas in a horizontal slab, subject to ...
An Oberbeck-Boussinesq-like approximation for a compressible fluid is investigated in 3-D from the p...
We study the nonlinear almost compressible 2D Oberbeck-Boussinesq system, characterized by an extra ...
We provide sufficient conditions for nonlinear exponential stability of the compressible Benard prob...
This paper shows the existence, uniqueness, and asymptotic behavior in time of regular solutions (a ...
Non-linear energy stability for the compressible Benard problem is studied for regular solutions
A linear stability analysis of the Benard problem for deep convection is performed. An estimate of t...
The Oberbeck-Boussinesq (OB) approximation for a compressible fluid in Bénard’s problem geometry is...
In this paper we apply the ideas introduced with the so-called extended-quasi-thermal-incompressible...
none3The linear stability of the magnetic Rayleigh Bénard problem for a general compressible horizo...
We propose a unied asymptotic approach in order to derive the Oberbeck-Boussinesq approxi-mation fro...
We consider the Boltzmann equation for a gas in a horizontal slab, subject to a gravitational force....
Perfectly incompressible materials do not exist in nature but are a useful approximation of several ...
For arbitrary Rayleigh number, Ra, Prandtl number, and any ratio of the cylindrical radii, existence...
cited By 0International audienceThe linear stability threshold of the Rayleigh-Bénard configuration ...
International audienceWe consider the Boltzmann equation for a gas in a horizontal slab, subject to ...
DOI
Add to ORKG