The aim of this paper is to present a simplified, yet rigorous, deduction of the Boussinesq approximated governing equations for buoyant flows. In order to carry out the core deduction procedure, a simplified version of the manifold asymptotic analyses available in the literature is discussed. The method adopted in this study is focussed on the local balance equations valid for a general, not necessarily Newtonian, fluid. The analysis is carried out by demonstrating the leading order terms in the governing equations for the asymptotic limit which characterises the approximation. The role played by the effect of viscous dissipation is also taken into account
In this paper we review and clarify some aspects of the asymptotic analysis of the compressible Navi...
The Oberbeck-Boussinesq approximation is the most widely employed theoretical scheme for the study o...
In flows with stable density stratification, a portion of the gravitational potential energy is avai...
The aim of this paper is to present a simplified, yet rigorous, deduction of the Boussinesq approxim...
The numerical simulation of buoyant flows often makes use of the Boussinesq approximation. This is p...
We offer a synthetic exposition on the state of the art for Computational Fluid Dynamics (CFD) relev...
This paper compares two strategies to compute buoyancy-driven flows using stabilized methods. Both f...
The results of mathematical simulation of fully developed plane buoyant jet flows are presented. The...
International audienceConvection can occur in a shallow layer of fluid with a small temperature cont...
This paper presents a theory describing the energy budget of a fluid under the Boussinesq approximat...
We present here a generalization of the Boussinesq approximation of interest in the thermohydrodynam...
This note derives the Boussinesq approximation in a manner consistent with the conservation law of m...
We propose a unied asymptotic approach in order to derive the Oberbeck-Boussinesq approxi-mation fro...
Thermal convection is fluid motion caused by buoyancy forces arising due to the density variation in...
We consider the approach to blow-up in two-dimensional inviscid flows with stagnation-point similitu...
In this paper we review and clarify some aspects of the asymptotic analysis of the compressible Navi...
The Oberbeck-Boussinesq approximation is the most widely employed theoretical scheme for the study o...
In flows with stable density stratification, a portion of the gravitational potential energy is avai...
The aim of this paper is to present a simplified, yet rigorous, deduction of the Boussinesq approxim...
The numerical simulation of buoyant flows often makes use of the Boussinesq approximation. This is p...
We offer a synthetic exposition on the state of the art for Computational Fluid Dynamics (CFD) relev...
This paper compares two strategies to compute buoyancy-driven flows using stabilized methods. Both f...
The results of mathematical simulation of fully developed plane buoyant jet flows are presented. The...
International audienceConvection can occur in a shallow layer of fluid with a small temperature cont...
This paper presents a theory describing the energy budget of a fluid under the Boussinesq approximat...
We present here a generalization of the Boussinesq approximation of interest in the thermohydrodynam...
This note derives the Boussinesq approximation in a manner consistent with the conservation law of m...
We propose a unied asymptotic approach in order to derive the Oberbeck-Boussinesq approxi-mation fro...
Thermal convection is fluid motion caused by buoyancy forces arising due to the density variation in...
We consider the approach to blow-up in two-dimensional inviscid flows with stagnation-point similitu...
In this paper we review and clarify some aspects of the asymptotic analysis of the compressible Navi...
The Oberbeck-Boussinesq approximation is the most widely employed theoretical scheme for the study o...
In flows with stable density stratification, a portion of the gravitational potential energy is avai...