TY - JOUR
T1 - Natural convection heat transfer of a viscous fluid in a vertical porous channel
AU - Akyildiz, F. Talay
AU - Siginer, Dennis A.
AU - Vajravelu, K.
AU - van Gorder, Robert A.
PY - 2012/6
Y1 - 2012/6
N2 - Approximate analytic solutions to second-order nonlinear systems arising in natural convection flow and heat transfer in vertical porous channels are obtained via the Galerkin-Legendre Spectral Method. Furthermore, existence, uniqueness, and concavity results are established using Green's functions and degree theory. We find that an increase in either the Darcy number or the quadratic density temperature variation results in an increase in the velocity and the temperature of a Newtonian fluid. Finally, parametric zones for the occurrence of reverse flow are considered, and the resulting influences on the obtained approximate solutions are analyzed.
AB - Approximate analytic solutions to second-order nonlinear systems arising in natural convection flow and heat transfer in vertical porous channels are obtained via the Galerkin-Legendre Spectral Method. Furthermore, existence, uniqueness, and concavity results are established using Green's functions and degree theory. We find that an increase in either the Darcy number or the quadratic density temperature variation results in an increase in the velocity and the temperature of a Newtonian fluid. Finally, parametric zones for the occurrence of reverse flow are considered, and the resulting influences on the obtained approximate solutions are analyzed.
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U2 - 10.1007/s10665-011-9489-x
DO - 10.1007/s10665-011-9489-x
M3 - Article
AN - SCOPUS:84860885390
SN - 0022-0833
VL - 74
SP - 61
EP - 71
JO - Journal of Engineering Mathematics
JF - Journal of Engineering Mathematics
IS - 1
ER -