Litcius/Paper detail

Nonlinear Stability and Linear Instability of Double-Diffusive Convection in a Rotating with LTNE Effects and Symmetric Properties: Brinkmann-Forchheimer Model

Ghazi Abed Meften, Ali Hasan Ali, Khalil S. Al-Ghafri, Jan Awrejcewicz, Omar Bazighifan

2022Symmetry26 citationsDOIOpen Access PDF

Abstract

The major finding of this paper is studying the stability of a double diffusive convection using the so-called local thermal non-equilibrium (LTNE) effects. A new combined model that we call it a Brinkmann-Forchheimer model was considered in this inquiry. Using both linear and non-linear stability analysis, a double diffusive convection is used in a saturated rotating porous layer when fluid and solid phases are not in the state of local thermal non-equilibrium. In addition, we discussed several related topics such as the effect of solute Rayleigh number, symmetric properties, Brinkman coefficient, Taylor number, inter-phase heat transfer coefficient on the stability of the system, and porosity modified conductivity ratio. Moreover, two cases were investigated in non-linear theory, the case of the Forchheimer coefficient F=0 and the case of the Taylor-Darcy number τ=0. For the validation of this work, some numerical experiments were made in the non-linear energy stability and the linear instability theories.

Topics & Concepts

InstabilityConvectionWork (physics)Linear stabilityRayleigh numberThermodynamicsMechanicsNonlinear systemStability (learning theory)PhysicsDouble diffusive convectionPorous mediumHeat transfer coefficientThermal conductivityMaterials scienceHeat transferNatural convectionPorosityComputer scienceMachine learningQuantum mechanicsComposite materialNanofluid Flow and Heat TransferHeat and Mass Transfer in Porous MediaRheology and Fluid Dynamics Studies