Influence of one porous layer insert on the transient heat transfer in a tall annulus in presence of large source terms

In the present paper, the authors employ the generalized porous medium model, taking into account Whitaker's volume averaging method for the derivation of the dimensionless governing equations, and the hypothesis of local thermal equilibrium for the porous medium modeling [27]. Under these hypotheses, the governing equations of the generalized porous medium model, written in a cylindrical coordinate system, are the following:

$\frac{1}{r}\frac{\partial \left( r\cdot {{u}_{r}} \right)}{\partial r}+\frac{\partial {{u}_{z}}}{\partial z}=0$    (1)

$\begin{matrix} \frac{1}{\varepsilon }\frac{\partial {{u}_{r}}}{\partial t}+\frac{1}{{{\varepsilon }^{2}}}\left( {{u}_{r}}\frac{\partial {{u}_{r}}}{\partial r}+{{u}_{z}}\frac{\partial {{u}_{r}}}{\partial z} \right)=-\frac{\partial {{p}_{f}}}{\partial r}+ \sqrt{\frac{\Pr }{Ra}}\frac{J}{\varepsilon }\left[ \frac{1}{r}\frac{\partial }{\partial r}\left( r\frac{\partial {{u}_{r}}}{\partial r} \right)-\frac{{{u}_{r}}}{{{r}^{2}}}+\frac{{{\partial }^{2}}{{u}_{r}}}{\partial {{z}^{2}}} \right]-\left( \frac{1}{Da}\sqrt{\frac{\Pr }{Ra}}+\frac{Fo}{\sqrt{Da}}\left| \overrightarrow{u} \right| \right){{u}_{r}} \\\end{matrix}$    (2)

$\begin{matrix} \frac{1}{\varepsilon }\frac{\partial {{u}_{z}}}{\partial t}+\frac{1}{{{\varepsilon }^{2}}}\left( {{u}_{r}}\frac{\partial {{u}_{z}}}{\partial r}+{{u}_{z}}\frac{\partial {{u}_{z}}}{\partial z} \right)=-\frac{\partial {{p}_{f}}}{\partial z}+ \sqrt{\frac{\Pr }{Ra}}\frac{J}{\varepsilon }\left[ \frac{1}{r}\frac{\partial }{\partial r}\left( r\frac{\partial {{u}_{z}}}{\partial r} \right)+\frac{{{\partial }^{2}}{{u}_{z}}}{\partial {{z}^{2}}} \right]-\left( \frac{1}{Da}\sqrt{\frac{\Pr }{Ra}}+\frac{Fo}{\sqrt{Da}} \right){{u}_{z}}+T \\\end{matrix}$       (3)

$\sigma \frac{\partial T}{\partial t}+{{u}_{r}}\frac{\partial T}{\partial r}+{{u}_{z}}\frac{\partial T}{\partial z}=\frac{\lambda }{\sqrt{Ra\Pr }}\left( \frac{1}{r}\frac{\partial }{\partial r}\left( \frac{\partial \left( r\cdot T \right)}{\partial r} \right)+\frac{{{\partial }^{2}}T}{\partial {{y}^{2}}} \right)$      (4)

The Boussinesq approximation is introduced to take into account the buoyancy effects and the thermo-physical parameters of the porous medium are calculated as geometrical mean values of fluid and solid phase. For the definition of the scales and parameters used to derive the dimensionless eqs. (1)-(4), the reader can refer to [26].

In this section, the numerical results, obtained for unsteady free convection in a tall annulus with the Aspect Ratio (AR) equal to 4:1, partially filled by a porous layer with variable properties and positions, are presented.

Several analyses have been performed considering three different geometrical configurations: a first one, in which the porous layer is located near the inner wall of the annulus (case A), a second one where the porous domain is at the center of the annulus (case B) and a last one, in which the porous medium is located near the outer wall of the annulus (case C).

The different computational domains are shown in Figure 1, which also reports the thermal boundary conditions employed. For the velocity field, no-slip condition is applied to all boundaries, except to the interfaces between the porous medium and the free fluid, where the continuity of all physical quantities is imposed as a matching condition.

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Figure 1. Reference geometries and boundary conditions employed

Two different computational grids have been employed for the simulations: a first one, for case A and C, composed of 18000 triangular elements and 9231 nodes, while the second one, employed for case B, consists of 19800 triangular elements and 10117 nodes. Both meshes, selected after an accurate grid sensitivity analysis, have been refined near all the boundaries to catch the local variations of the quantities of interest.

The following input parameters have been considered for all the simulations: Pr=0.71, Ra=3.4∙10⁶, ε=0.5, Da ranging from 10^-3 to 10^-5. First, several simulations have been performed assuming a fixed thickness of the porous domain, r_p=0.5, and adopting a fixed annular reference geometry with a radii ratio r_o/r_i=2.

The final results in terms of temperature contours are shown in Figure 2 for all the geometrical configurations examined and the different values of Da employed: it is quite interesting to notice that for Da=10^-3, the isotherms show similar trends for all the different cases under study, while for Da≤10^-4, the temperature fields are strongly influenced by the properties and the position of the porous layer.

In order to analyze the transient behavior of the phenomenon, six probe points have been selected; their coordinates are reported in Table 1.

Table 1. Non dimensional coordinates of probe points

x1.png

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Figure 2. Temperature contours at τ=500 for different values of Da for: a) case A, b) case B, c) case C (Ra=3.4∙10⁶,r_p=0.5,r_o/r_i=2) 

Figure 3 analyzes the transient evolution of temperature at probe points from 1 to 6 (see Table 1) for all three configurations and for two different values of Darcy: Da=10^-3 (on the left) and Da=10^-5 (on the right). The analysis of the results highlights that both the position and the permeability of the porous insert affect significantly the thermal transient behavior of the cavity: for Da=10^-5 no transient oscillations of temperature field are observed for all the cases under study; whereas for Da=10^-3 transient oscillations rises at different points of the cavity, depending on the different position of the porous insert into the cavity, but dampen with the time in all the cases.

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Figure 3. Transient evolution of temperature for Da=10^-3 (on the left) and Da=10^-5 (on the right) at six probe points (see Table 1) for Ra=3.6∙10⁶ for the different cases under study (r_p=0.5, r_o/r_i=2

Moreover, several simulations have been performed assuming a fixed thickness of porous layer (r_p=0.5) for the three configurations A, B and C, and a cavity radii ratio r_o/r_i variable into the range 1.5÷5, considering different values of Da ranging from 10^-3 to 10^-5. Transient evolution of temperature at the six probe points has been represented in Figures 4-6: in particular, Figures 4, 5 and 6 represent the results related to case A, B and C, respectively, for Da=10^-3 (on the left) and for Da=10^-5 (on the right). For high values of Da, the value of the radii ratio affects the time evolution of temperature, as the amplitude of the transient oscillations decreases with the increase of the radii ratio for all the configuration studied; for low values of Da, the radii ratio affects the transient temperature distribution into the cavity but has not a strong influence on the transient evolution of the fluid flow at the six probe points examined.

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Figure 4. Transient evolution of temperature for Da=10^-3 (on the left) and Da=10^-5 (on the right) at probe points from 1 to 6 for several values of r_o/r_i (Ra=3.4∙10⁶,r_p=0.5,case A)

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Figure 5. Transient evolution of temperature for Da=10^-3 (on the left) and Da=10^-5 (on the right) at probe points from 1 to 6 for several values of r_o/r_i (Ra=3.4∙10⁶,r_p=0.5,case B)

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Figure 6. Transient evolution of temperature for Da=10^-3 (on the left) and Da=10^-5 (on the right) at probe points from 1 to 6 for several values of r_o/r_i (Ra=3.4∙10⁶,r_p=0.5,case C)

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Figure 7. Transient evolution of temperature at probe points from 1 to 6 in a 4:1 partially porous annulus (case A) for Da ranging from 10^-3 to 10^-5, for: a) r_p=0.25 and b) r_p=0.75 (Ra=3.4 ∙10⁶,r_o/r_i=2)

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Figure 8. Transient evolution of temperature at probe points from 1 to 6 in a 4:1 partially porous annulus (case B) for Da ranging from 10^-3 to 10^-5, for: a) r_p=0.25 and b) r_p=0.75 (Ra=3.4 ∙10⁶, r_o/r_i=2)

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Figure 9. Transient evolution of temperature at probe points from 1 to 6 in a 4:1 partially porous annulus (case C) for Da ranging from 10^-3 to 10^-5, for: a) r_p=0.25 and b) r_p=0.75 (Ra=3.4 ∙10⁶,r_o/r_i=2)

Finally, several analyses have been conducted by assuming a fixed value of radii ratio, r_o/r_i=2 for the three configurations shown in Fig. 1, and a variable thickness of the porous layer, r_p, considering different values of Da numbers, ranging from 10^-3 to 10^-5. Figures 7-9 show the variation of the temperature over the time at the probe points from 1 to 6, for case A (Figure 7), case B (Figure 8) and case C (Figure 9). All the Figures report on the left side the results related to r_p=0.25, whereas on the right side are represented the transient evolution observed for r_p=0.75. The analyses of the results highlight that the porous layer thickness strongly affects the transient evolution of the temperature into the cavity for Da=10^-3; this is true for all the configurations examined here, as transient oscillations of different amplitude characterize the temporal evolution of the convective phenomenon for variable values of r_p. In particular, the amplitude of these oscillations rises with the increase of r_p; moreover, the configuration B is the one that is more affected by the porous layer thickness, as a periodic oscillating behavior with respect to time characterizes the transient evolution of the convection into the cavity only for r_p=0.75.