Convective Instability in Porous Media, Volume II

Dear Colleagues,

The first Special Issue on convective instability in porous medium contained 14 papers covering a wide variety of topics under that general title. The issue included two excellent review articles and 12 papers that dealt with bidispersive effects, unsteady forcing effects, local thermal non-equilibrium, rotation, precipitation, viscoelastic fluids, ferrofluids, and more. To this end, the various authors employed linear theory, weakly nonlinear theory, strongly nonlinear simulations of various kinds, and theory for the absolute/convective instability transition theory. Given the success of that Special Issue, it has been decided to create a second edition, and papers are invited for this. The original Special Issue information remains applicable and it is reproduced below.

Many practical problems involving porous media in engineering, geophysics, and CO2 sequestration involve the simulation of what might be termed convection in a very wide sense. Such instabilities are always brought about by nonuniform buoyancy forces due to density changes, which, in turn, have arisen because of variations in the temperature and/or chemical composition of the fluid, or by miscible or immiscible displacements of heavier fluids by lighter fluids. The aim of this Special Issue is to collect together a wide variety of papers that have, as their unifying theme, the onset and subsequent development of convective instability. We intend there to be a strong emphasis on the methodology of solution, for reasons of pedagogy, for both analytical and numerical methods. Papers that involve those variants of Darcy’s law for which there is no formal support (i.e., REV averaging or experimental validation), will not feature in this Issue. Numerical accuracy will be of paramount importance.

Dr. D. Andrew Rees
Prof. Dr. Antonio Barletta
Guest Editors

Manuscript Submission Information

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• porous media
• instability
• numerical simulation
• Darcy–Bénard convection
• boundary layers
• fingering
• bifurcations