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2.1. Coupled radiation-free convection in cavities/enclosures without inner heated bodies

The principle of CRFC, particularly in closed cavities, has been extensively investigated and categorized into two cases: with radiations wall only, and with gas and radiations wall. The latter, which is essential in combustion systems, has been regarded in many works, as reported in [40], [41], [42], [43]. However, this case is not presented in the current survey; only the former category is focused.

Many earlier investigations have been conducted for differentially heated rectangular enclosures [44], [45], [46], [47], [48]. According to the reported numerical studies of CRFC by Balaji and Venkateshan [49], radiation revealed a dual influence: reducing the convective component and participating in the overall heat transfer. However, more complex formulae for calculating radiation were still required as simple ones were insufficient. Hence, correlations for CRFC, regarding air as a working medium, were proposed by Balaji and Venkateshan [50]. According to an experimental investigation by Ramesh and Venkateshan [35], the previous correlations were adequate and valid. Ridouane et al. [51] numerically evaluated the CRFC for a 2D square cavity enclosure having a heated base with four emissivity combinations at which isothermal horizontal walls differed from the adiabatic vertical ones and set at (ε =0.05 or 0.85). As a result, compared to pure free convection, the surface radiation influenced the steady-state modes' ranges and periodic solutions' nature and magnitude. On the other hand, for the rectangular cavity, Gad and Balaji [52]determined the Ra (Rayleigh number) for the convection onset in terms of adiabatic sidewalls' emissivity and aspect ratio. For this model, the upper horizontal wall was set at 303 K, the emissivity of the horizontal wall was constant (ε = 0.85), and the aspect ratio ranged from 1 to 10. According to their results, surface radiation influence diminishes beyond the aspect ratio of 5, and high emissivity of sidewalls delayed the Rayleigh-Benard convection onset. Inversely, for a top-heated open-ended cavity, Manca and Nardini [53]experimentally evaluated the CRFC utilizing high emissive horizontal walls (ε = 0.8). As concluded, the unheated bottom wall witnessed a temperature rise that could cause secondary motions in different observations to low emissive walls [54]. These secondary motions occurred by plumes within the cavity adjacent to the bottom plate at (Ra = 1.92×10⁵), based on flow visualization at transversal sections. Also, due to surface radiation, secondary convection was obtained near the sidewalls of industrial buildings that enhanced air flow and temperature patterns [55]. Moreover, the surface radiation significantly modified both flow and temperature patterns affecting the heat transfer process within a square enclosure as reported by Akiyama and Chong [56] and Lari K et al. [57].

2.2. Coupled radiation/free convection in cavities/enclosures with inner heated bodies/sources

The presence of an inner heated body significantly alters the flow dynamics compared to scenarios without such a body [58]. Without an inner heated body, convection currents primarily form around external surfaces, driven by temperature differences between these surfaces and the surrounding fluid. In contrast, when an inner heated body is present, it introduces additional heat sources within the fluid volume, leading to more complex flow patterns. This internal heating creates localized temperature gradients, which can induce buoyancy-driven flows within the fluid bulk. As a result, the combination of external surface convection and internal heating from the heated body enhances overall heat transfer rates but also introduces challenges in predicting and controlling fluid flow patterns [59], [60].

Various studies on CRFC for cavities/enclosures having inner heated bodies have been done [61], [62], [63], [64]. Mezrhab et al. [65], and Mezrhab and Bouali [66] evaluated the CRFC of a square cavity, including a heated cylinder. In addition, through a centered square body, a differentially heated square cavity was investigated by Mezrhab et al. [67]. As reported, when considering radiation, the heat transfer and flow pattern were highly augmented compared to the enclosure without an inner body. In addition, the CRFC was analyzed by Saravanan and Sivaraj [68], considering a square enclosure containing a discrete square heater with cooled and insulated vertical and horizontal walls, respectively. Also, discrete heaters inside a square enclosure were proposed by Saravanan and Raja [69]. On the other hand, a horizontal annular cavity surrounded by an inner heated elliptic cylinder was analyzed by El Moutaouakil et al. [70] exploring the CRFC. Moreover, Nguyen et al.[64] investigated CRFC in a cubic chamber containing a mixture of air and water when a heated obstacle is present. Also, Hidki et al. [71] studied numerically the influence of 2 heat-generating bodies based on CRFC in air cavities. Furthermore, El Moutaouakil et al. [72] examined the influence of a partially heated cylinder on CRFC heat transfer. Finally, Moussaoui et al.[73] applied the concept of CRFC in a square cavity with a heated bottom. For this work, the 2D analytical method was utilized. All works proved the obtained augmentation in heat transfer when thermal radiation was considered.

2.3. Coupled radiation/free convection in vertical parallel plate channels

The investigated CRFC with vertical parallel plates has been examined for a long time. For laminar free convection, using asymmetric heating, Carpenter et al. [74] evaluated the CRFC for vertical parallel plate channels via employing numerical parabolic formulation and Boussinesq approximation. The investigation was conducted to estimate the impact of dimensionless variables, namely: Ra number, heat flux ratio, radiation number, emissivity, and aspect ratio. The results displayed surface radiation's ability to change the wall temperatures, particularly the peak value. Also, for laminar convection, Krishnan et al. [75]experimented CRFC for parallel plates: two unheated (ε = 0.05), and one high emissive central plate (ε = 0.85). This work is considered as a proof of the successful impact of radiation at room temperature. In addition, surface radiation was proved to be feasible in the case of asymmetric heating more than symmetric heating, according to experimental work by Manca and Naso [76]. At high emissivity, flow patterns approached those of symmetric heating and Rayleigh number was reduced. Additionally, Lakhi and Safavinejad [77] tested CRFC numerically between two parallel plates (various angles). They showed that radiation factors significantly affect heat transfer (both airspeed and temperature profiles of the fluid) between them. Moreover, increasing the angle between the plates and the horizontal increase also air speed, temperatures, and buoyancy effect.

Step 4

dimensionless parameters (dimensionless coordinates (X, Y), dimensionless velocity components (U, V), dimensionless stream function (Ψ), dimensionless vorticity (Ω), dimensionless temperature ratio (Θ), and dimensionless time (τ)): the two approaches can be taken into consideration when dimensionless parameters are formed:

• •

  1^st approach:

• •

  2^nd approach:

Additionally, the following dimensionless numbers are used to evaluate the CRFC model:

The radiative heat flux can be calculated using different approaches, as follows:

• i

   

  $$
  , 
  $$
  as reported by [87].

   

• ii

   

  $$
  as reported by [88].

   

• iii[45]

4.1. Cavities/enclosures without inner heated bodies and vertical parallel plate channels

Gad and Balaji [52] investigated the influenced onset of convection for a Rayleigh– Benard configuration (Fig. 5(a)) by thermal radiation. Four different values of ε (range = 0 to 0.85), and variable aspect ratios (ARs) were proposed. According to the result, the effect of radiation decreased with the increase of AR till (AR=8) and then vanished as shown in Fig. 5(b). For AR=1, Fig. 5(c) and (d), except for 1×10⁴< Ra<5×10⁴, the convective components varied inversely with ε. But, generally, the surface radiation enhances the heat transfers across the cavity. There are three kinds of regimes have occurred: (i) for 4×10³< Ra<1×10⁴, there was no effect on convection due to emissivity, (ii) for 1×10⁴< Ra<5×10⁴, the flow structure turned from unicellular to bicellular for higher emissivity, i.e., increase in convection, and (iii) beyond 5×10⁴, the convection suppression occurred with the emissivity increase. For AR=2, Fig. 5(e) and (f), just the bicellular structure appeared with the validity AR=1, i.e., convention enhancement and radiation declined with emissivity. For AR=3, both tetra-cellular and tri-cellular flow structures occurred when radiation was regarded for the proposed range of Ra. Then, with the increase of AR, the convection declined.

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Fig. 5

Wang et al. [3] proved the significant effect of thermal radiation on convection for a proposed cavity having a porous medium, as shown in Fig. 6(a). Due to surface radiation, the temperature field was changed for both free and porous regions. As R_a increased, temperature gradients were formed on a porous medium at two upper corners with a decrease in mean temperature at the interface. Regarding Fig. 6(b) and (c), which illustrate the variation of Nu_c with ε at Ra = 10⁴ and 10⁶, respectively, Nu_c at the free flow region was significantly affected by ε more than that of a porous region with greater change because the lack of radiation and the weakness of convection within the porous region. In addition, with the rise of ε, the presence of thermal radiation led to a growing temperature gradient adjacent to the hot wall, hence, Nu_c increased. However, with a further increase in ε, Nu_c at the hot wall became lower than at the cold one, and a slight increase in temperature gradient appeared near the cold side. This is attributed to the proportionality of radiative energy with T⁴, which augmented the heat transfer from the hot side to the adiabatic top side compared to the cold side. Whereas the radiative energy weakened the gradient adjacent to the hot side and inversely at the cold one. For Nu_R, Fig. 6(d), a direct increase with ε was obtained as expected. All these findings assure that surface thermal radiation had a good influence on convection heat transfer.

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Fig. 6

Bousetta et al. [89] conducted a numerical study on CRFC between vertical plates under asymmetric heating. The model shown in Fig. 7 (a) was proposed and the range of emissivity (0.1 – 1) was considered. As illustrated in Fig. 7 (b), Nu_c was slightly modified at (ε=0.1) and reduced at (ε=1). For Nu_R, the same order of Nu_c was obtained; however, Nu_R increased with ε. Both Nu_c and Nu_Rincreased with Ra at the same value of ε. Moreover, the CRFC resulted in declination in maximum T_H, reaching a reduction of 24.4K. It was also reported that there were increased deviations between inlet and max. wall temperatures up to ∼200K had a negligible effect on the heat transfer process.

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Fig. 7

Said et al. [90] numerically evaluated the CRFC for the annular air gap of two concentric cylinders, illustrated in Fig. 8(a). The governing equations were derived in (r, θ) coordinates. The calculations were conducted at ranges of Ra (10³ to 10⁶) and ε (0 to 1); whereas the curvature ratio was constant at 2. The results revealed that Nu_c varied within the proposed ranges as it increased before (Ra≥10⁵) and (ε≥0.3), then decreased, as noticed in Fig. 8(b). But for Nu_R, Fig. 8(c), it was constant within the Ra range and increased with ε. The total Nu increased with both Ra and ε. Hence, it can be confirmed that radiation successfully affected the heat transfer process.

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Fig. 8

4.2. Cavities/enclosures with inner heated bodies/sources

Boukendil et al. [91] numerically simulated CRFC of asymmetrically cooled (single vertical wall at T_C=293K) enclosure having discretely heated body (circular cylinder at 297K<T_H<357K), Fig. 9(a), whereas the other remaining parts were insulated. The heat transfer process was evaluated at (10³<Ra<10⁷) and (0<ε<1). The results showed that both Nu_c and Nu_total increased monotonically with Ra with high growth at high Ra, as shown in Fig. 9(b). The value of Nu_R (Nu_total - Nu_c) also increased significantly at high Ra. As obviously shown, Nu_c was independent of ε. It was also concluded that surface radiation contributed by half of overall heat transfer.

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Fig. 9

Miroshnichenko and Sheremet [92] conducted a numerical evaluation of natural convection in the presence of thermal radiation for a tilted square cavity having a local heater, as illustrated in Fig. 10(a). The governing Equations (1-5) were modified by the addition of turbulent parameters (e.g., ν_t) and k-ε was considered as reported by [93], [94], [95]. The study was conducted at (0<φ<2 π), (10⁸<Ra<10¹⁰), and (0<ε<0.9). The higher the tilt angle the lower Nu_R was obtained, and the maximum heat transfer occurred at φ = 5π/6. Moreover, at π/3<φ<5π/6, the value of Nu_c was enhanced by 51%. In addition, the surface radiation enhanced the flow pattern. Furthermore, for constant values of Ra and φ, the Nu_total was enhanced with the increase of ε and τ, as shown in Fig. 10(b) and Table 1, however, the Nu_c was slightly enhanced. Finally, Finally, Table 2compares these studies with the ones mentioned in the previous literature regarding the Nusselt number obtained, emissivity range, Rayleigh number range, and the type of geometry studied.

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Fig. 10

Table 1

Emissivity (ε)	NuR	Nuc	Nutotal	Enhance in heat transfer (%)
0	0	78.4	78.4	0
0.3	22.3	80.4	102.7	31
0.6	46.4	81.7	128.1	63
0.9	72.6	82.6	155.2	98

Table 2

Geometry	Emissivity (ε)	Highest total Nusselt number (Nu)	Rayleigh number (Ra)	Ref
Rayleigh– Benard configuration	0-0.85	10	1×104< Ra<5×104	[52]
Rectangular cavity with horizontal porous layer	0-1	18.7	Ra =104 and Ra =106	[3]
Asymmetrically heated vertical channels	0.1-1	42	102 < Ra< 108	[89]
Vertical cylinder partially annular	0-1	33	103 < Ra< 106	[90]
Rectangular cavity with a discretely heated inner body	1	27.5	103<Ra<107	[91]
Inclined rectangular cavity with local heater	0-0.9	155.2	108<Ra<1010	[92]
2D square cavity enclosure having heated base	0.05 or 0.85	16.6	103<Ra<2.3×106	[51]
A cavity having a square body at its center	1	65	103<Ra<108	[67]
An air‐filled square cavity containing two heat‐generating bodies	0-1	45	103 < Ra< 106	[71]
A square cavity partially heated cylinder	0-1	21	103<Ra<107	[72]