GLOBAL EXPONENTIAL NONLINEAR STABILITY FOR DOUBLE DIFFUSIVE CONVECTION IN POROUS MEDIUM

doi:10.1007/s10473-019-0109-6

Abstract

Abstract: Nonlinear stability of the motionless double-diffusive solution of the problem of an infinite horizontal fluid layer saturated porous medium is studied. The layer is heated and salted from below. By introducing two balance fields and through defining new energy functionals it is proved that for CLe ≥ R, Le ≤ 1 the motionless double-diffusive solution is always stable and for CLe < R, Le < 1 the solution is globally exponentially and nonlinearly stable whenever R < 4π² + LeC, where Le, C and R are the Lewis number, Rayleigh number for solute and heat, respectively. Moreover, the nonlinear stability proved here is global and exponential, and the stabilizing effect of the concentration is also proved.

Key words: energy method, energy functional, nonlinear stability, diffusive convection, porous medium

Lanxi XU, Ziyi LI. GLOBAL EXPONENTIAL NONLINEAR STABILITY FOR DOUBLE DIFFUSIVE CONVECTION IN POROUS MEDIUM[J].Acta mathematica scientia,Series B, 2019, 39(1): 119-126.

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References

[1] Gilman A, Bear J. The influence of free convection on soil salinization in arid regions. Transport Porous MED, 1996, 23:275-301
[2] Pieters G J M, Van Duijn C J. Transient growth in linearly stable gravity-driven flow in porous media. Eur J Mech B/Fluids, 2006, 25:83-94
[3] Payne L E, Straughan B. A naturally efficient numerical technique for porous convection stability with non-trivial boundary conditions. Int J Num Anal Meth Geomech, 2000, 24(10):815-836
[4] Nield D, Bejan A D. Convection in Porous Media. 5th ed. New York:Springer, 2017
[5] Capone F, Rionero S. Nonlinear stability of a convective motion in a porous layer driven by a horizontally periodic temperature gradient. Continuum Mech Thermodyn, 2003, 15:529-538
[6] Lombardo S, Mulone G. Necessary and sufficient conditions for global nonlinear stability for rotating double-diffusive convection in a porous medium. Continuum Mech Thermodyn, 2002, 14:527-540
[7] Lombardo S, Mulone G. Necessary and sufficient stability conditions via the eigenvalues-eigenvectors method:an application to the magnetic Bénard problem. Nonlinear Anal, 2005, 63(5/7):e2091-e2101
[8] Payne L E, Straughan B. Unconditional nonlinear stability in temperature-dependent viscosity flow in a porous medium. Stud Appl Math, 2000, 105:59-81
[9] Straughan B. The Energy Method, Stability, and Nonlinear Convection. 2nd ed. New York:Springer, 2004
[10] Mulone G, Rionero S. The rotating Bénard problem:new stability results for any Prandtl and Taylor numbers. Continuum Mech Thermodyn, 1997, 9:347-363
[11] Joseph D D. Global stability of the conduction-diffusion solution. Arch Rational Mech Anal, 1970, 36: 285-292
[12] Lombardo S, Mulone G, Straughan B. Stability in the Bénard problem for a double-diffusive mixture in a porous medium. Math Meth Appl Sci, 2001, 24:1229-1246
[13] Galdi G P, Padula M. A new approach to energy theory in the stability of fluid motion. Arch Rational Mech Anal, 1990, 110:187-286
[14] Xu L X, Lan W L. On the nonlinear stability of parallel shear flow in the presence of a coplanar magnetic field. Nonlinear Anal, 2014, 95:93-98
[15] Mulone G, Straughan B. An operative method to obtain necessary and sufficient stability conditions for double diffusive convection in porous media. Z Angew Math Mech, 2006, 86(7):507-520
[16] Schmitt B J, Von Wahl W. Decomposition of solenoidal fields into poloidal fields, toroidal fields and mean flow. Applications to the Boussinesq equations//Heywood J G, Masuda K, Rautmann R, Solonnikov S A, eds. The Navier-Stokes Equations II-Theory and Numerical Methods. Lecture Notes in Mathematics 1530, Berlin, Heidelberg, New York:Springer, 1992:291-305
[17] Chandrasekhar S. Hydrodynamic and Hydromagnetic Stability. Oxford:Oxford University Press, 1961
[18] Yang Z X, Zhang G B. Global stability of traveling wavefronts for nonlocal rection-diffusion equations with time delay. Acta Math Sci, 2018, 38B (1):291-304
[19] He L, Tang S J, Wang T. Stability of viscous shock waves for the one-dimensional compressible NavierStokes equations with density-dependent viscosity. Acta Math Sci, 2016, 36B (1):36-50