Stability analysis of a couple-stress fluid saturating a porous medium with temperature and pressure dependent viscosity using a thermal non-equilibrium model
From MaRDI portal
Publication:2007642
DOI10.1016/j.amc.2018.08.025zbMath1428.76206OpenAlexW2890855489MaRDI QIDQ2007642
Publication date: 22 November 2019
Published in: Applied Mathematics and Computation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.amc.2018.08.025
temperature and pressure dependent viscositycouple stress parameterDarcy-Brinkman numberinterface heat transfer coefficientporosity modified conductivity ratio
Nonlinear effects in hydrodynamic stability (76E30) Flows in porous media; filtration; seepage (76S05)
Related Items (3)
Transitions and bifurcations in couple stress fluid saturated porous media using a thermal non-equilibrium model ⋮ Implementation of compressible porous-fluid coupling method in an aerodynamics and aeroacoustics code. I: Laminar flow ⋮ The well-posedness and the regularity of global attractor for a couple stress fluid through porous layer with the local thermal non-equilibrium effect
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Stability analysis of Rayleigh--Bénard convection in a porous medium
- Stability analysis of the Rayleigh-Bénard convection for a fluid with temperature- and pressure-dependent viscosity
- On the Oberbeck-Boussinesq approximation for fluids with pressure dependent viscosities
- The onset of Lapwood-Brinkman convection using a thermal non-equilibrium model
- Periodic free convection from a vertical plate in a saturated porous medium, non-equilibrium model
- A systematic approximation for the equations governing convection-diffusion in a porous medium
- A nonlinear stability analysis for rotating magnetized ferrofluid heated from below saturating a porous medium
- Nonlinear stability of the magnetic Bénard problem via a generalized energy method
- Nonlinear stability problem of a rotating doubly diffusive fluid layer
- Vertical free convective boundary-layer flow in a porous medium using a thermal nonequilibrium model: Elliptical effects
- The energy method, stability, and nonlinear convection.
- Necessary and sufficient conditions for nonlinear stability in the magnetic Bénard problem
- Onset of Darcy-Bénard convection using a thermal non-equilibrium model
- On the nonlinear stability of the rotating Bénard problem via the Lyapunov direct method
- Nonlinear stability problem of a rotating doubly diffusive porous layer
- A nonlinear stability analysis for rotating magnetized ferrofluid heated from below
- On the stability of the Boussinesq equations
- Nonlinear stability of the Boussines q equations by the method of energy
- Metodi variazionali per la stabilita in media in magnetoidrodinamica
- Analysis of mixed convection in a vertical porous layer using non-equilibrium model
- A new approach to energy theory in the stability of fluid motion
- A sharp nonlinear stability threshold in rotating porous convection
- Vertical Free Convective Boundary-Layer Flow in a Porous Medium Using a Thermal Nonequilibrium Model
- Global nonlinear stability in porous convection with a thermal non-equilibrium model
- Thermal convection in a rotating porous layer using a thermal nonequilibrium model
- An explicit example of Hopf bifurcation in fluid mechanics
- A nonlinear analysis of the stabilizing effect of rotation in the Bénard problem
- Unconditional Nonlinear Stability in Temperature‐Dependent Viscosity Flow in a Porous Medium
- Convection in Porous Media
- A nonlinear stability analysis for magnetized ferrofluid heated from below
- Nonlinear convection in a porous medium with inclined temperature gradient and variable gravity effects
This page was built for publication: Stability analysis of a couple-stress fluid saturating a porous medium with temperature and pressure dependent viscosity using a thermal non-equilibrium model
