Title of article
Analytical Simulation for Transient Natural Convection in a Horizontal Cylindrical Concentric Annulus
Author/Authors
Al-Saif, A.S.J. Department of Mathematics - College of Education for Pure Science - Basrah University, Basrah, Iraq , Al-Griffi, Takia Ahmed J. Department of Mathematics - College of Education for Pure Science - Basrah University, Basrah, Iraq
Pages
17
From page
621
To page
637
Abstract
In this study, a new scheme is suggested to find the analytical approximating solutions for a two-dimensional transient
natural convection in a horizontal cylindrical concentric annulus bounded by two isothermal surfaces. The new methodology
depends on combining the algorithms of Yang transform and the homotopy perturbation methods. Analytical solutions for the
core, the outer layer and the inner layer at small times are found by a new method. Also, the effect of Grashof number, Prandtl
number and radius proportion on the heat transfer and the flow of fluid (air) at different values was studied. Moreover, the study
calculates the mean of the Nusselt number along with the effect of the Grashof number and radius proportion on it as
parameters which acts as clues for heat transfer calculations of the natural convection for the annulus. The results, obtained by
using the new method, prove that it is efficient and has high exactness compared to the other methods, used to find the
analytical approximate solution for the transient natural convection in a horizontal cylindrical concentric annulus. The
convergence of the new method was also discussed theoretically by referring to some theorems, and experientially by a
verification of the solutions resulting from the simulations of the convergent condition. Furthermore, the graphs of the new
solutions show the veracity, utility and exigency of the new method, and come in line with solutions offered by previous studies
Keywords
Yang transform , Homotopy perturbation method , Natural convection , Cylinder annulus , Convergence analysis
Journal title
Journal of Applied and Computational Mechanics
Serial Year
2021
Record number
2558614
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