A Nonlinear Stability Analysis of Convection in a Porous Vertical Channel Including Local Thermal Nonequilibrium

• Published in: Journal of mathematical fluid mechanics Vol. 15; no. 1; pp. 171 - 178
• Main Authors: Scott, Nicola L., Straughan, B.
• Format: Journal Article
• Language: English
• Published: Basel SP Birkhäuser Verlag Basel 01.03.2013; Springer Nature B.V
• Subjects: Classical and Continuum Physics; Fluid- and Aerodynamics; Free convection; Mathematical Methods in Physics; Nonlinear analysis; Physics; Physics and Astronomy; Porous media; Rayleigh number; Stability analysis; 76R10; Local thermal nonequilibrium; Porous vertical channel; Energy stability; 76S05; 80A20; Convection
• ISSN: 1422-6928; 1422-6952
• DOI: 10.1007/s00021-012-0109-y

The problem is considered of thermal convection in a saturated porous medium contained in an infinite vertical channel with differentially heated sidewalls. The theory employed allows for different solid and fluid temperatures in the matrix. Nonlinear energy stability theory is used to derive a Rayleigh number threshold below which convection will not occur no matter how large the initial data. A generalized nonlinear analysis is also given which shows convection cannot occur for any Rayleigh number provided the initial data is suitably restricted.