Amid all convective heat transfer augmentation methods employing single phase, jet impingement heat transfer delivers significantly higher coefficient of local heat transfer. The arrangement leading to nine jets in square array has been used to cool a plate maintained at constant heat flux. Numerical study has been carried out using RANS-based turbulence modeling in commercial CFD Fluent software. The turbulent models used for the study are three different “k-ε” models (STD, RNG, and realizable) and SST “k-ω” model. The numerical simulation output is equated with the experimental results to find out the most accurate turbulence model. The impact of variation of Reynolds number, inter-jet spacing, and separation distance has been considered for the geometry considered. These parameters affect the coefficient of heat transfer, temperature, and turbulent kinetic energy related to flow. The local “h” values have been noticed to decline with the rise in separation distance “H/D.” The SST “k-ω” model has been noticed to be in maximum agreement with the experimental results. The average value of heat transfer coefficient “h” reduces from 210 to 193 W/m2K with increase in “H/D” from 6 to 10 at “Re” = 9000 and S/D of 3. As per numerical results, inter-jet spacing “S/D” of 3 has been determined to be the most optimum value.
1. Introduction
The application of jet impingement because of its higher convection heat transfer rates in processes, namely, mechanical as well as chemical, has steered numerous industry applications, for instance, metal plates cooling/heating, cooling of turbine blades, industrial equipment cleaning, and cooling of Micro Electro Mechanical Systems (MEMS). Jet impingement is normally utilized in numerous industrial applications which include automobile windshield de-icing, electronic component cooling, and glassware. High convective transfer rates associated with the jet impingement has ensured the use of this technology in the fields where the heat fluxes associated are very high and the space is restricted. Heat, Ventilation, and Air-Conditioning (HVAC) is significant for building indoors, not only for adequate comfort levels and quality of air for occupants, but also in terms of the energy consumption [1–3]. Impinging Jet Ventilation (IJV) is the new technique emerging in this field which uses the idea of an impinging jet employed for cooling a heated target surface. Good number of experimental, numerical, and analytical studies have been performed. Outstanding review papers (Viskanta [4] and Zuckerman and Lior [5]) have been published with an emphasis on different issues. The transfer of heat from a single striking jet is bell shaped Gaussian distribution and thus can lead to the formation of hot spots on target surface [4, 5]. Thus, it has been established that multiple impinging jets can give rise to better heat transfer consistency at the impingement surface. Interactions and thermal characteristics developed in multiple conventional striking jets (MCIJs) have been extensively explored. In multiple jet impingement, each impinging jet may be influenced essentially by two different kinds of interactions. First are inter-jet interactions preceding their impingement on the surface. This type of interaction is important in geometries having small inter-jet spacing and large separation distances. Second type is interaction among the wall jets of impinging jets after their impingement on surface. These primarily occur for array configurations with smaller inter-jet spacing with high velocities.
Metzger and Korstad [6] experimentally determined the effect of cross flow in multiple impinging jets on a horizontal plate. Inline circular jets with varying inter-nozzle distance and separation distance among jets and impingement plate were studied. Heat transfer coefficient is controlled with jet-diameter Reynolds number and inter-jet spacing. Li et al. [7] explored heat transfer from triangular array of jets with varying diameters on a roughened target surface. Goldstein and Timmers [8] studied a geometry of single jet bounded by a hexagonal array of six circular jets with radius of 5 mm. Behbahani and Goldstein [9] stated that at a fixed mass flow rate per jet, decreasing inter-jet spacing resulted in increased area averaged Nusselt number. Experiments carried out by Florschuetz et al. [10] indicated the direct advantages of reducing jet diameter as well as letting free space among jets for directing the spent gas flow. Obot and Trabold [11] examined effects of cross flow employing geometries with minimum, intermediate, and maximum crossflow. Goldstein and Seol [12] stated that local Nusselt number should be higher at smaller separation distance (H/D = 2) than at larger distance of H/D = 6. Slayzak et al. [13] investigated the interactions between adjacent jets using a twin jet impingement system. By varying the momentum of twin jets, oscillations were observed in the interaction zone. For a round jet at “H/D” = 2, Huber and Viskanta [14] noticed a peak in local “Nu” for a ring formed region around “r/D” = 0.5 and a second smaller peak at “r/D” = 1.6. San and Lai [15] showed that interaction between the jets produced smaller peaks in heat transfer distribution among the stagnation regions because of interactions among neighbouring jets. Geers et al. [16, 17] studied velocity flow field for the multiple array of circular jets striking on a flat horizontal plate. Results revealed interactions taking place among cross flow as well as the wall jets that led to the development of horseshoe vortices. Spring et al. [18] stated that inline arrangement is superior to staggered arrangement of jets mainly attributed to the nature of crossflow existing in the array. San and Chen [19] reported that for the rise of separation distance from 0.5 to 2, the Nusselt number maxima between central and neighbouring jets disappeared attributed mainly to the decreased interactions between adjacent jets. Florschuetz et al. [20] studied the crossflow effects with temperature difference between crossflow and impinging jets. Gardon and Akfirat [21] conducted experiments on slot jet array and presented that the definition of each jet is maintained and the peak values in heat transfer distribution differed slightly from those pertaining to single impinging jets. Lee and Lee [22] established that orifice nozzles lead to high rates of heat transfer rates in comparison to fully developed pipe flow. Weigand et al. [23] conducted experiments on multiple jet impingement instead of a single jet and determined the presence of secondary stagnation zones and vortices that result in the reduction of heat transfer rates. This flow of gas is called spent gas and these wall jets are predominant in the geometries where the small inter-jet spacing, small gap distances among nozzle plate and target plate, and large velocities are used. Chougule et al. [24] determined experimentally that the rise in “H/D” resulted in decreased heat transfer rates. Higher heat transfer rates are visible in lower “H/D” ratios because of the decrease in the impact area as the jet does not mix well with the ambient fluid. Yong et al. [25] experimentally studied the crossflow effects of spent gases in staggered and inline array schemes and demonstrated that the effects of crossflow from upstream rows of jets to downstream rows are more pronounced for a staggered array in contrast to an inline array. Computational fluid dynamics has now emerged as a powerful tool for predicting the flow situations and heat transfer characteristics. Likewise, heat transfer enhancement is also gaining popularity so as to increase the thermal performance of the systems. There are many studies conducted where heat transfer enhancement has been studied by utilizing nano-sized particles and V-ribs for solar panels [26–33]. Jet impingement also focusses on the enhancement of heat transfer using turbulence induced mixing as a means for increased heat transfer coefficient.
The literature review suggests that there are few studies available in which the effects of interactions in larger arrays of impinging jets have been investigated numerically for heat transfer characteristics. Based on this finding, the present work has been performed where an inline array of nine impinging jets has been investigated for studying the impact of interactions upon heat transfer characteristics at different inter-jet spacings (“S/D” = 2, 3, 5, and 7), separation distances (“H/D” = 6, 8, and 10), and Reynolds numbers (“Re” = 7000, 9000, and 11000).
2. Numerical Modeling
The three-dimensional flow situation has been solved using the Navier–Stokes and energy equations along with turbulence models by means of CFD software (FLUENT 6.3.26) to predict the thermal and turbulent flow fields for the flow physics. Equations (1)–(5) have been solved in the commercial Fluent CFD code [34]. The “k-ω” turbulence model has been used with shear stress transport (SST) option, and it has been found to work best for wall bounded flows than other turbulence models available. The “k-ω” turbulence model is selected because of its lesser computation requirements, simplicity, and worldwide acceptability. The flow has been considered as incompressible for the sake of simplicity, and steady-state conditions have been assumed. The gravity and radiation heating are neglected, and temperature dependence for standard thermophysical properties such as specific heat, density, and heat conductivity has also not been considered. Figure 1(a) illustrates the detail description of the problem with the application of boundary conditions. The bottom wall of computational domain has been given a constant heat flux condition. Nine nozzles, having diameter “D” = 5 mm and length “L” = 25 mm, have been used to supply air in the form of round air jets. The velocity of the air jets has been varied with the use of different Reynolds number. These air jets exit the domain after impingement from the pressure outlets given at the sides of the domain. Likewise, the nozzle plate at the top has been assigned the constant temperature boundary condition. This plate also acts as a semiconfinement for the impinging jets. The schematic details of nozzle plate are given in Figure 1(b) for jet spacing of 15 mm corresponding to nondimensional distance of S/D = 3. The target plate has been maintained at a static heat input rate of 30 W, and all other surfaces except for the top surface are considered to be adiabatic. The governing equations for momentum, pressure, turbulent kinetic energy, specific rate of dissipation, and energy have been discretized using second-order techniques. A tetrahedral meshing scheme having y+ values less than five and adequate near wall treatment has been employed around wall region so as to precisely resolve viscous sublayer region.
Physical description and boundary conditions at various surfaces.
The velocity inlet boundary condition has been specified with the value of measured velocity from the Reynolds number, and static temperature of 300 K has also been assigned at the velocity inlet. No-slip criteria have been implemented at the wall surface for viscous effects. The pressure outlet boundary condition signifies the outflow of the spent flow, and it corresponds to the far field flow conditions with temperature (300 K), gauge pressure of “0” Pa relating to atmospheric conditions, and turbulence intensity of 5%. For the impingement wall, a uniform heat flux of 8333 W/m2 (30 W for 60 × 60 mm plate) has been specified along with temperature value of 40°C at bottom surface of heat sink. The other heat sink sides are taken to be adiabatic. The temperature values thus obtained at the top surface of base plate have been appended to the computational flow domain, and simulations have been carried out with different conditions of varying inter-jet spacings, H/D, and Reynolds number.
To minimize the computational time and efforts, only quarter of the complete domain is modeled, and by using symmetry boundary conditions, the heat transfer and fluid flow characteristics can be accurately predicted. Figure 2 portrays the computational grid generated for numerical study, and Table 1 highlights different boundary conditions given at various sides of the flow domain. Numbers of cells used for the quarter domain are around 4,34,000, thus resulting in 1.7 million cells for the complete domain which are adequate to model the fluid flow. To minimize the computational efforts, thermophysical properties for air have been approximated to be constant. The SIMPLE algorithm aimed at pressure velocity coupling has been taken for solving the pressure field [34]. The convergence criterion used for residuals in momentum, energy, and turbulence parameters has been specified as 10−6. The numerical calculations have been performed on a computer system having the following configuration: Intel i3 (4 core) processor, 4 GB RAM, 512 GB HDD, and 2 GB graphics. The computation time that has been taken by the computer in solving different mesh sizes is given in Table 2.
(a) Computational mesh generated for the numerical computation and (b) schematic view of nozzle plate being used.
Boundary conditions used for computation.
Physical location/identity
Boundary type
Mathematical representation
Top plate/nozzle plate
Wall
u = v = w = 0; Ts = 300 K
Bottom surface/impingement plate
Wall
u = v = w = 0; q″ = 8333 W/m2
Side/opening/outlet
Pressure outlet
P = Patm
Rear/side surface
Symmetry
∂./∂xj=0
Inlet/velocity inlet
Velocity inlet
As per value of Re at the nozzle
Nozzle walls
Wall
u = v = w = 0; T = 300 K
Computational grids and time taken for convergence.
S. No.
Mesh density/size
Computational time
1
301,720 cells
6 hours (approx.)
2
4,34,000 cells
9 hours (approx.)
3
6,55,600 cells
11 hours 30 minutes (approx.)
2.1. Numerical Procedure
CFD study of the multi nozzle impingement has been conducted by solving the discretized equations of mass, momentum, and energy conservation (equations (1)–(3)). RANS-based momentum equations have been solved for obtaining the flow velocities under steady-state conditions.
2.1.1. Continuity Equation
(1)∇.ρV⟶=0.
2.1.2. Momentum Equation
(2)∇.ρV⟶V⟶=−∇p+∇.μeff∇V⟶.
2.1.3. Energy Equation
The energy equation is solved to obtain the temperature data in the flow field.(3)∇.V⟶ρE+p=∇.keff∇T−∑j=1NhjJ⟶j.
2.1.4. Turbulence Parameters
The turbulence in the flow has been numerically solved using two turbulence models, and the equations used for solving the turbulence parameters are given in equations (4)–(7). The turbulence parameters are calculated or predicted as per the model being used so as to calculate the value of turbulent viscosity which is then used to estimate the value of effective viscosity in equation (2). With the inclusion of this term, the velocity field can be calculated numerically as the equations are now mathematically closed. Equations (4) and (5) represent the transport equations for turbulent kinetic energy (k) and dissipation rate (ε) as used in k-ε models. Likewise, the turbulent parameters (k) and specific dissipation rate (ω) have been estimated for k-ω model as per equations (6) and (7).(4)∇ρkV⟶=∇αkμeff∇k+Gk−ρε,(5)∇ρεV⟶=∇αεμeff∇ε+C1εεkGk−C2ερε2k−Rε,(6)∇ρkV⟶=∇αεμeff∇k+Gk−Yk+Sk,(7)∇ρωV⟶=∇αεμeff∇ω+Gω−Yω+Sω.
3. Numerical Results
Numerical study has been executed to explore the impact of variation in “S/D,” “H/D,” and “Re” upon heat transfer characteristics. For the validation of numerical results, Table 3 highlights the average heat transfer coefficient values compared to the experimental output of Chougule et al. [24] along with the errors at fixed conditions corresponding to “H/D” of 8, S/D of 3, and Re of 9000. On the basis of these results, k-ω “SST” model has been implemented for numerical simulations. Likewise, local coefficient of heat transfer has also been plotted against nondimensional distance along x-axis (Figure 3) for “H/D” = 6 and Re = 9000.
Comparison of different turbulence models.
Sr. No.
Turbulence models
Average heat transfer coefficient (h)
Error (% age)
1
Experimental value
210 W/m2-K
—
2
k-ε STD
181 W/m2-K
13.8
3
k-ε RNG
192 W/m2-K
8.57
4
k-ε realizable
191 W/m2-K
9.04
5
k-ω SST
204 W/m2-K
2.85
Local heat transfer coefficient (W/m2-K) distribution with respect to “X/D” for various turbulence models.
3.1. Impact of Separation Distance (H/D)
The impact of separation distance (H/D) among the nozzle and the target plate has been explored by varying “H/D” at the same “S/D” and Reynolds number. The rise in separation distance resulted in decreased rate of heat transfer as the increase in the separation improves the interaction among the jets and the surroundings, and thus velocity of the jet decreases owing to increased momentum exchange. The values of coefficient of heat transfer as well as Nusselt number should thus decline at stagnation regions. Figure 4 shows the distribution of heat transfer coefficient and turbulent kinetic energy (TKE) at Reynolds number “Re” = 7000 for numerous values of separation distances (“H/D” = 6, 8, and 10) for “D” = 5 mm.
(a) Local heat transfer coefficient (W/m2-K) and (b) turbulent kinetic energy (m2/s2) distribution at fixed “S/D” of 3 and “Re” of 7000 for varying separation distances, “H/D” of 6, 8, and 10.
The values of local “h” decrease with increasing “H/D” at the stagnation region pertaining to the jet at “X/D” = 0. The variation shows value of “h” to decrease from 390 W/m2-K to 270 W/m2-K as “H/D” is increased from 6 to 10.
The value of peak in “TKE” distribution reduces from 15 m2/s2 to 2 m2/s2 for the separation distance “H/D” changing from 6 to 10. Likewise, Figures 5 and 6 portray local “h” and “TKE” distribution intended for different “H/D” at fixed “S/D” of 3 and Re of 9000 and 11000.
(a) Local heat transfer coefficient (W/m2-K) and (b) turbulent kinetic energy (m2/s2) distribution at fixed “S/D” of 3 and “Re” of 9000 for varying separation distances, “H/D” of 6, 8, and 10.
(a) Local heat transfer coefficient (W/m2-K) and (b) turbulent kinetic energy (m2/s2) distribution at fixed “S/D” of 3 and “Re” of 11000 for varying separation distances, “H/D” of 6, 8, and 10.
The values of local heat transfer coefficient and turbulent kinetic energy can be seen to be increasing with increasing Reynolds number since the increase in flow velocities tends to increase the turbulent interactions with the atmosphere. The increase in axial flow velocities also results in lesser jet spread and thus lesser thermal dilution leading to higher heat transfer. At the interaction region formed in-between adjacent jets (i.e., “X/D” ∼ 1.5), the higher flow velocities of wall jets result in flow separation in form of fountain upwash flow. Due to this flow separation, the value of “h” at this region is very less. One more observation can be made for “H/D” = 10 case that the stagnation region formed here (“X/D” = 0) shows a plateau of high local “h” values instead of depicting a sharp peak as seen for “H/D” = 6 and 8. This happens due to increased jet spread taking place due to the increased space available between nozzle exit and impingement plate for higher separations.
3.2. Impact of Inter-Jet Spacing (S/D)
The values of “S/D” considered for the present analysis are “S/D” = 2, 3, 5, and 7. These “S/D” values are sufficient to analyze how the jets will behave for very close, medium, and far inter-jet spacings. The increase in “S/D” will result in decreased interactions among the jets, and therefore the total heat transfer will decrease and the decrease in “S/D” will lead to increased interaction and thus increase in heat transfer. The too small value of “S/D” resulted in array of jets to behave like a large single jet, and thus the heat transfer coefficient value is also high, but study of interaction effects cannot be made properly. The impact of variation in inter-jet spacing is depicted graphically in Figure 7. The graphs show the variation in heat transfer coefficient and temperature at central horizontal axis of the target plate for the nine jets at “S/D” = 2, 3, 5, and 7 for fixed value of Reynolds number, “Re” = 9000, “H/D” = 8, and “D” = 5 mm.
(a) Local heat transfer coefficient (W/m2-K) and (b) temperature (K) distribution at fixed “H/D” of 8 and “Re” of 9000 for varying separation distances, “S/D” of 2, 3, 5, and 7.
Figure 7 shows declining tendencies for the change in heat transfer coefficient by increasing “S/D.” This reduction in the values of heat transfer coefficient “h” can be anticipated due to decrease in the interaction among the neighbouring jets. At lower values of “S/D,” the interaction between the jets and lesser spacing results in turbulence and thus increase in heat transfer rates. As the value of “S/D” increases, the distance among the jets increases, and thus the rate of heat transfer per unit area decreases. Figure 7 also shows the variation in temperature with respect to “X/D.” The values of temperature are found to rise with the rise in “S/D” at “X/D” = 0. Also, the local maxima developed at the interaction region in-between adjacent jets can be seen to show an increase in temperature values with the rise in the value of inter-jet spacing “S/D.” This is due to the decreased interactions and lesser heat transfer taking place in the interaction region for different “S/D” cases here. The decrease in heat transfer leads the surface plate temperature to rise, and thus the cooling of plate is not effective at these interaction regions.
3.3. Impact of Reynolds Number (Re)
Impact of Reynolds number on the heat transfer rate has been studied at fixed “H/D” of 6 and “S/D” of 3, and Reynolds number has been varied as “Re” = 7000, 9000, and 11000. Experimental data analysis suggests a rise in the value of heat transfer rate and thus Nusselt number by increasing Reynolds number at same separation distance.
The impact of Reynolds number on coefficient of heat transfer and turbulent kinetic energy (TKE) is shown in Figure 8. For a fully developed pipe flow, Popiel and Boguslawski [35] revealed that the turbulent intensity as well as kinetic energy rises and achieves their maximum value at “H/D” = 6 for a single jet. This results from high turbulent jet intensity. Even though the jet centerline velocity starts decaying due to its interaction with the ambient, the turbulent intensity continues to increase. The outer peak in heat transfer distribution begins to become less distinctive because the rate of heat transfer at the impact region has developed to so high values that the chances of their further increase as an outcome of transition from laminar to turbulent flow are attenuated. The heat transfer coefficient value “h” at the stagnation region corresponding to central jet increases from 370 W/m2-K to 495 W/m2-K with the rise in Reynolds number. Rise in “Re” leads to increased length of potential core region, and thus the axial velocity at the jet centerline is preserved for much greater downstream distances. This marks the increase of heat transfer at the corresponding locations on the target plate. Variation of turbulent kinetic energy shows maximum turbulence at regions confirming to the location of the jets. Turbulent kinetic energy has been found to be high at the stagnation regions corresponding to the jets, and the values of “TKE” increase from 15.2 m2/s2 to 31.8 m2/s2 at “X/D” = 0 with the rise in Reynolds number, “Re” from 7000 to 11000.
(a) Local heat transfer coefficient (W/m2-K) and (b) turbulent kinetic energy (m2/s2) distribution at fixed “H/D” of 6 and “S/D” of 3 for varying “Re” of 7000, 9000, and 11000.
Figure 9 highlights the temperatures attained by the target plate at different values of Reynolds number for fixed “S/D” of 3 and “H/D” of 6. It can be seen that the plate becomes cooler particularly at the places related to stagnation regions of different impinging jets.
Local contours of temperature (K) developed at the target surface at separation distance “H/D” of 6 and inter-jet spacing “S/D” of 3 for different Reynolds number corresponding to (a) 7000, (b) 9000, and (c) 11000.
The plate, however, remains relatively hotter at the intersection regions developed in-between four jets and interaction areas in-between each pair of jets. The temperature values decrease from 324 K to 315 K at the regions corresponding to intersection of four jets with increasing values of Reynolds number.
3.4. Averaged Heat Transfer Coefficients “Havg”
Averaged heat transfer coefficients at the target surface are given in Table 4.
Averaged heat transfer coefficients for various cases.
Cases
Re = 7000
Re = 9000
Re = 11000
H/D = 6
178 (W/m2-K)
210 (W/m2-K)
241 (W/m2-K)
H/D = 8
174 (W/m2-K)
204 (W/m2-K)
219 (W/m2-K)
H/D = 10
170 (W/m2-K)
193 (W/m2-K)
213 (W/m2-K)
Inter-jet spacing (S/D)
Re = 9000 and H/D = 8
2
3
5
7
205
204
200
182
4. Concluding Remarks
Numerical modeling can be used as an alternative and powerful tool to predict the trend in variation of heat transfer rates as well as fluid flow features in various fluid flow applications. The trends obtained in the current numerical study show the effects of separation distance, inter-jet spacing, and Reynolds number on coefficient of heat transfer and turbulent kinetic energy. Following are the major concluding remarks:
The “k-ω” SST model is observed to match best with the experimental data among different models selected for the study.
The local “h” values have been noticed to decline with the rise in separation distance “H/D.” The average value of heat transfer coefficient “h” reduces from 210 to 193 W/m2-K with increase in “H/D” from 6 to 10 at “Re” = 9000 and S/D of 3.
The values of coefficient of heat transfer “h” and thus Nusselt number rise due to the rise in Reynolds number “Re.”
The average value of coefficient of heat transfer “h” is 205, 204, 200, and 182 W/m2-K at inter-jet spacing “S/D” of 2, 3, 5, and 7, respectively, at “H/D” = 8 and “Re” = 9000. At “S/D” = 2, the multiple jets start behaving as a large single jet.
On the basis of heat transfer features, inter-jet spacing “S/D” = 3 has been determined to be the optimum value for increasing heat transfer.
NomenclatureX, Y:
Coordinate axis on impingement plate
X/D:
Nondimensional x-distance
Y/D:
Nondimensional y-distance
D:
Diameter of nozzle (mm)
H:
Impingement separation (mm)
H/Dh:
Nondimensional impingement separation
S/Dh:
Inter-jet spacing (dimensionless)
T:
Temperature (K)
Ts:
Surface temperature (K)
T∞:
Ambient temperature (K)
p:
Pressure (Pa)
q″L:
Heat flux (kW/m2)
havg:
Averaged heat transfer coefficient (W/m2-K)
h:
Convective heat transfer coefficient
Re:
Reynolds number
u, v, w:
Velocity components in x, y, and z directions (m/s)
k:
Turbulent kinetic energy, TKE (m2/s2)
Sk:
Source term for TKE
Sω:
Source term for “ω”
Yk:
Dissipation term for k in k-ω model
Yω:
Dissipation term for ω in k-ω model
keff:
Effective thermal conductivity (W/m-K)
AbbreviationsNu:
Nusselt number
RANS:
Reynolds averaged NS equations
Re:
Reynolds number
RNG:
Renormalization group theory
STD:
Standard
SST:
Shear stress transport
TKE:
Turbulent kinetic energy (W/m2-K)
Greek Symbolsμ:
Dynamic viscosity (kg/m-s)
ε:
Dissipation rate (m2/s3)
ρ:
Density (kg/m3)
ω:
Specific dissipation rate (m2/s4).
Data Availability
The data used to support the findings of this study are included within the article.
Conflicts of Interest
The authors declare that they have no conflicts of interest.
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