Weakly Nonlinear Stability Analysis of
Double Diffusive Convection in a Porous
Medium with Magnetic Field and
Concentration-Based Internal Heating

Liberty Ebiwareme; Chigozie Israel-Cookey

doi:https://doi.org/10.14445/22315373/IJMTT-V66I9P524

International Journal of Mathematics Trends and Technology

Research Article | Open Access | Download PDF

Volume 66 | Issue 9 | Year 2020 | Article Id. IJMTT-V66I9P524 | DOI : https://doi.org/10.14445/22315373/IJMTT-V66I9P524

Weakly Nonlinear Stability Analysis of Double Diffusive Convection in a Porous Medium with Magnetic Field and Concentration-Based Internal Heating

Liberty Ebiwareme, Chigozie Israel-Cookey

Citation :

Liberty Ebiwareme, Chigozie Israel-Cookey, "Weakly Nonlinear Stability Analysis of Double Diffusive Convection in a Porous Medium with Magnetic Field and Concentration-Based Internal Heating," International Journal of Mathematics Trends and Technology (IJMTT), vol. 66, no. 9, pp. 209-219, 2020. Crossref, https://doi.org/10.14445/22315373/IJMTT-V66I9P524

Abstract

The Steady state finite amplitude of double diffusive convection with effects of concentration-based internal heating and magnetic field is investigated. The governing equation of the flow are reduced using the Darcy-Brinkman model in a porous medium. The result shows, both Darcy number and magnetic field increases the heat and mass transfer in the system, whereas Vadasz and other parameters decreases the mass transfer, but the heat transfer decreases as the magnetic parameter increases.

Keywords

Double diffusive convection, Weakly nonlinear analyses, Darcy-Brinkman, Concentration base, internal heat, porous medium

References

[1] Gupta, V.K., and Singh, A.K. (2014). Double-diffusive reaction-convection in a viscous fluid layer. Journal of Industrial Mathematics, 6(4), Article ID: IJIM-00488, 12 Pages
[2] Joseph, D.D. (1976). Stability of Fluid Motions. Vol. 1 and 2. Springer-Verlag, Berlin
[3] Nield, D.A., and Bejan, A. (2017). Convection in Porous Media, Fifth edition, Springer-Verlag, New York, US.
[4] Ingham, D. B., and Pop, I. (2005). Transport Phenomena in Porous Media, Vol. III, Pergamon, Oxford
[5] Chandrasekhar, S. (1961). Hydrodynamic and Hydromagnetic Stability. Clarendon Press, Oxford, UK.
[6] Vafai, K. (2005). Handbook of Porous Media, second edition. Taylor and Francis Group, LLC, US
[7] Malashetty, M.S., and Gaikward, S.N., and Swamy, M. (2006).
[8] Wang, C.Y. (2002). Transport of Porous Media, 46(2002), 37.
[9] Hayat, T., Ali, N., and Asghar, S. (2007). Physics Letters A 363(2007) 97
[10] Bahloul, A., Boutana, N., and Vasseur, P. (2003). Journal of Fluid Mechanics, 491(2003) 325
[11] Narayan, M., Sibanda, P., and Motsa, S.S., and Sidhdeswar, P.G. (2012). On the Double-diffusive convection and cross-diffusion effects in a horizontal wavy surface in a porous medium. Boundary vale Problems, 2012, 1/88.
[12] Stern, M.E. (1960). The Salt fountain and Thermohaline convection. Tellus, 172-175.
[13] Akbarzadeh, A., and Manins, A. (1988). Convective Layers generated by side Walls in Solar Ponds. Sol. Energy, 41(6), 521-529.
[14] Stern, M.E. (1969). Collective instability of Salt fingers. Journal of Fluid Mechanics, 35, 209-218.
[15] Fernando, H.J.S., and Brandt, A. (1994). A recent Advances in Double-diffusive convection. Application of Mechanical Review, 47, c1-c7
[16] Huppert, H.E., and Sparks, R.S.J. (1984). Double-diffusive convection due to crystallization in Magma. Annual Review of Earth Planet Science, 12, 11-37.
[17] Zhao, M., Zhang, Q., and Shaowei, W. (2014). Linear and Nonlinear Stability Analysis of Double-diffusive convection in a Maxwell fluid saturated porous layer with Internal heat Source. Journal of Applied Mathematics, Article ID, 489279, 12 Pages.
[18] Altawallbeh, A. A., Bhadauria, B.S., and Hashim, I. (2013). Linear and Nonlinear Double-diffusive convection in a saturated porous layer with Soret and Internal heat source, 59(2013), 103-111.
[19] Malashetty, M.S., and Swamy, M. (2005). Linear and Non-linear double diffusive convection in a fluid saturated anisotropic porous layer. Proceedings of Internal Conference on Advances in Applied Mathematics, 2005, 253-264.
[20] Rudraiah, N., and Siddheshwar, P.G. (1998). A Weak nonlinear stability analysis of double diffusive convection with crossdiffusion in a fluid saturated porous medium. Heat and Mass Transfer, 33(4), 287-293.
[21] Malashetty, M.S., and Biradar, B.S. (2012). Linear and nonlinear double-diffusive convection in a fluid-saturated porous medium with cross-diffusion effects. Transport of Porous Medium, 9(2012), 649-675.
[22] Gaikwad, S.N., Malashetty, M.S., and Prasad, K.R. (2009). An analytical study of linear and nonlinear double diffusive convection in a fluid saturated anisotropic porous medium with Soret effect. Applied Mathematical Modelling, 33(9), 3617-3635
[23] Pranesh, S., and Sameena, T. (2015). Linear and weakly nonlinear stability analysis of double diffusive electro-convection in a micropolar pond. IOSR Journal of Mathematics, 11(6), 44-70.
[24] Pranesh, S. (2014). Linear and weakly nonlinear stability analysis of gravity modulation and electric field on the onset of Rayleigh-Bernard convection in a micropolar pond. Journal of Advances in Mathematics, 9(3), 2057-2082.
[25] Palle, K. (2015). Weak nonlinear oscillatory convection in a non-uniform heating porous medium with throughflow. International Journal of Engineering and Mathematical Modelling, 2(3), 63-78.
[26] Premila, K., and Sudhaamsh, G. (2017). Nonlinear double diffusive convection in a couple stress fluid with rotational modulation. International Journal of Engineering Research and Application, 7(7), 25-29.
[27] Bhadauria, B.S., and Palle, K. (2014). Weak nonlinear thermal instabilities under vertical magnetic field, temperature modulation and heat source. International Journal of Engineering Research and Application, 4(1), 200-208.
[28] Cha’o-kuang, C., and Dong-Yu, L. (2010). Weakly nonlinear stability analysis of a thin magnetic fluid during spin coating. Mathematical Problems in Engineering, 4(17), 987891-987898.
[29] Celli, M., Alves, D.B., and Barletta, A. (2014). Nonlinear stability analysis of a Darcy flow with viscous dissipation. International Journal of Engineering Research and Application, 2(4), 927-936.
[30] Edmond, O. O., Israel-Cookey, C. and Emeka, A. (2020). Onset of Magnetoconvection in a rotating Darcy-Brinkman porous layer heated from below with temperature dependent heat source. International Journal of Mathematics Trends and Technology- Volume 66 Issue 5.