[1] TABRIZINEJADAS, S., FAHS, M., ATAIE-ASHTIANI, B., SIMMONS, C. T., ROUPERT, R. D. C., and YOUNES, A. A Fourier series solution for transient three-dimensional thermohaline convection in porous enclosures. Water Resources Research, 56, e2020WR028111(2020)
[2] TURNER, J. S. Double-diffusive phenomena. Annual Review of Fluid Mechanics, 6, 37-56(1974)
[3] HUPPTER, H. E. and TURNER, J. S. Double-diffusive convection. Journal of Fluid Mechanics, 106, 299-329(1981)
[4] SCHMITT, R. W. Double diffusion in oceanography. Annual Review of Fluid Mechanics, 26, 255-285(1994)
[5] CHAMKHA, A. J. Double-diffusive convection in a porous enclosure with cooperating temperature and concentration gradients and heat generation or absorption effects. Numerical Heat Transfer; Part A:Applications, 41, 65-87(2002)
[6] ABIDI, A., KOLSI, L., BORJINI, M. N., and BEN-AISSIA, H. Effect of heat and mass transfer through diffusive walls on three-dimensional double-diffusive natural convection. Numerical Heat Transfer; Part A:Applications, 53, 1357-1376(2008)
[7] CHEN, C. F. and CHAN, C. L. Stability of buoyancy and surface tension driven convection in a horizontal double-diffusive fluid layer. International Journal of Heat and Mass Transfer, 53, 1563-1569(2010)
[8] YU, P. X., XIAO, Z. C., WU, S., TIAN, Z. F., and CHENG, X. Z. High accuracy numerical investigation of double-diffusive convection in a rectangular cavity under a uniform horizontal magnetic field and heat source. International Journal of Heat and Mass Transfer, 110, 613-628(2017)
[9] RADKO, T. Double-Diffusive Convection, Cambridge University Press, Cambridge (2013)
[10] NISHIMURA, T., WAKAMATSU, M., and MOREGA, A. M. Oscillatory double-diffusive convection in a rectangular enclosure with combined horizontal temperature and concentration gradients. International Journal of Heat and Mass Transfer, 41, 1601-1611(1998)
[11] REDDY, N. and MURUGESAN, K. Magnetic field influence on double-diffusive natural convection in a square cavity-a numerical study. Numerical Heat Transfer; Part A:Applications, 71, 448-475(2017)
[12] SENTHIL KUMAR, D., MURUGESAN, K., and THOMAS, H. R. Numerical simulation of double diffusive mixed convection in a lid-driven square cavity using velocity-vorticity formulation. Numerical Heat Transfer; Part A:Applications, 54, 837-865(2008)
[13] WANG, J., YANG, M., and ZHANG, Y. Onset of double-diffusive convection in horizontal cavity with Soret and Dufour effects. International Journal of Heat and Mass Transfer, 78, 1003-1031(2014)
[14] DENG, Q. H., ZHOU, J., MEI, C., and SHEN, Y. M. Fluid, heat and contaminant transport structures of laminar double-diffusive mixed convection in a two-dimensional ventilated enclosure. International Journal of Heat and Mass Transfer, 47, 5257-5269(2004)
[15] GHORAYEB, K., KHALLOUF, H., and MOJTABI, A. Onset of oscillatory flows in doublediffusive convection. International Journal of Heat and Mass Transfer, 42, 629-643(1999)
[16] QIN, Q., XIA, Z. A., and TIAN, Z. F. High accuracy numerical investigation of double diffusive convection in a rectangular enclosure with horizontal temperature and concentration gradients. International Journal of Heat and Mass Transfer, 71,405-423(2014)
[17] LIANG, X., LIANG, X. L., FU, D. X., and MA, Y. W. Complex transition of double-diffusive convection in a rectangular enclosure with height-to-length ratio equal to 4:part I. Communications in Computational Physics, 6, 247-268(2009)
[18] LIANG, X., PENG, B., and TIAN, Z. F. Complex transition of double-diffusive convection in a rectangular enclosure with height-to-length ratio equal to 4:part II. International Journal of Heat and Mass Transfer, 135, 247-261(2019)
[19] MAHAPATRA, T. R., PAL, D., and MONDAL, S. Effects of buoyancy ratio on double-diffusive natural convection in a lid-driven cavity. International Journal of Heat and Mass Transfer, 57, 771-785(2013)
[20] CORCIONE, M., GRIGNAFFINI, S., and QUINTINO, A. Correlations for the double-diffusive natural convection in square enclosures induced by opposite temperature and concentration gradients. International Journal of Heat and Mass Transfer, 81, 811-819(2015)
[21] KRAMER, J., JECL, R., and SKERGET, L. Boundary domain integral method for the study of double diffusive natural convection in porous media. Engineering Analysis with Boundary Elements, 31, 897-905(2007)
[22] VERHAEGHE, F., BLANPAIN, B., and WOLLANTS, P. Lattice Boltzmann method for double diffusive natural convection. Physical Review E, 75, 046705(2007)
[23] WANG, L., SHI, B. C., CHAI, Z. H., and YANG, X. G. Regularized lattice Boltzmann model for double-diffusive convection in vertical enclosures with heating and salting from below. Applied Thermal Engineering, 103, 365-376(2016)
[24] LIU, Q., FENG, X. B., XU, X. T., and HE, Y. L. Multiple-relaxation-time lattice Boltzmann model for double-diffusive convection with Dufour and Soret effects. International Journal of Heat and Mass Transfer, 139, 713-719(2019)
[25] SHAO, Q., FAHS, M., YOUNES, A., and MAKRADI, A. A high-accurate solution for DarcyBrinkman double-diffusive convection in saturated porous media. Numerical Heat Transfer; Part B:Fundamentals, 69, 26-47(2016)
[26] BEN-ARTZI, M., CROISILLE, J. P., FISHELOV, D., and TRACHTENBERG, S. A pure-compact scheme for the streamfunction formulation of Navier-Stokes equations. Journal of Computational Physics, 205, 640-664(2005)
[27] YOUNES, A., FAHS, M., ZIDANE, A., HUGGENBERGER, P., and ZECHNER, E. A new benchmark with high accurate solution for hot-cold fluids mixing. Heat and Mass Transfer, 51, 1321-1336(2015)
[28] TIAN, Z. F. and YU, P. X. An effcient compact difference scheme for solving the streamfunction formulation of the incompressible Navier-Stokes equations. Journal of Computational Physics, 230, 6404-6419(2011)
[29] PANDIT, S. K. and KARMAKAR, H. An effcient implicit compact streamfunction velocity formulation of two dimensional flows. Journal of Scientific Computing, 68, 653-688(2016)
[30] YU, P. X. and TIAN, Z. F. Compact computations based on a stream-function-velocity formulation of two dimensional steady laminar natural convection in a square cavity. Physical Review E, 85, 036703(2012)
[31] YU, P. X., QIU, J. X., and TIAN, Z. F. Numerical investigation of natural convection in a rectangular cavity under different directions of uniform magnetic field. International Journal of Heat and Mass Transfer, 67, 1131-1144(2013)
[32] YU, P. X. and TIAN, Z. F. An upwind compact difference scheme for solving the streamfunctionvelocity formulation of the unsteady incompressible Navier-Stokes equations. Computers and Mathematics with Applications, 75, 3224-3243(2018)
[33] SHAH, A., GUO, H., and YUAN, L. A third-order upwind compact scheme on curvilinear meshes for the incompressible Navier-Stokes equations. Communication in Computational Physcis, 5, 712-729(2009)
[34] TIAN, Z. F., LIANG, X., and YU, P. X. A higher order compact finite difference algorithm for solving the incompressible Navier-Stokes equations. International Journal for Numerical Methods in Engineering, 88, 511-532(2011)
[35] CARPENTER, M. H., GOTTLIEB, D., and ABARBANEL, S. The stability of numerical boundary treatments for compact high-order schemes finite difference schemes. Journal of Computational Physics, 108, 272-295(1993)
[36] MOREGA, A. and NISHIMURA, T. Double-diffusive convection by a Chebyshev collocation method. Technology Reports of the Yamaguchi University, 5, 259-276(1996)
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