In the present article, the thermal and fluid dynamic behavior of an Al₂O₃/water nanofluid is analyzed by means of the mixture model, which seems to give accurate results with nanofluids 26 27 29 30 . In the mixture model, particles are taken into account by adding a term in the momentum conservation equation and solving the concentration equation.

Each phase has its own velocity vector, and within any control volume, there is a fraction of each phase, in accordance with the space occupied by the base fluid and particles.

The governing equations in mathematical formulation of the mixture model for average steady-state conditions in dimensional form, following the analysis given in 25 26 27 29 30 33 , are:

Conservation of mass:

Momentum equation:

Volume fraction:

Conservation of energy:

The compression work and the viscous dissipation are assumed negligible in the energy equation, Equation 4.

In the conservation of momentum, Equation 2, is the drift velocity for the secondary phase k, i.e. the nanoparticles in the present study:

The slip velocity is the relative velocity of the secondary phase, nanoparticles, with respect to the primary phase, fluid. It is:

The drift velocity and relative velocity are linked by:

The relative velocity is evaluated by the equation proposed in 33 :

whereas the drag function is calculated by means of the following equation:

proposed by Schiller and Naumann 34 .

The acceleration in Equation 10 is given by

The k-ε model, proposed by Launder and Spalding 35 , is employed to close turbulence model. The model introduces one equation for the turbulent kinetic energy, k, and another equation for the rate of dissipation, ε. To take into account the presence of nanoparticles, the following formulation is considered as suggested in 26 29 :

where

with C ₁ = 1.44, C ₂ = 1.92, C _μ = 0.09, σ _k = 1, σ _ε = 1.3.

The most difficult problem in nanofluids simulation is posed by the evaluation of thermophysical properties, particularly viscosity and thermal conductivity, because it is not clear if classical equations give reliable results. However, on the other hand, a few experimental data are available to build new models 26 .

In the present article, the following equations are considered to evaluate Al₂O₃/water nanofluid thermophysical properties:

Equations 17 and 18 are based on the classical theory of two-phase mixture and given in 19 21 22 23 28 29 . Equation 18 was first employed in 19 and then utilized in many different articles 21 22 23 28 29 30 . Another formulation of specific heat, based on heat capacity concept, is present in literature, as reported in 21 36 . The maximum difference between the two formulations is about 10% for a particle concentration of 6%, whereas at lower concentration, φ = 1%, the deviation is about 2%. In order to understand if this difference is acceptable, the bulk temperature of the fluid is estimated by applying the first law of thermodynamics. As known from basic thermodynamics, C _p represents the amount of heat necessary to increase the temperature of a substance of one degree. This implies that the main effect of C _p should be noticed on the bulk temperature of the fluid. In accordance with this, using the two different formulations of C _p, the variation on the bulk temperature is estimated to be about 3% at Re = 20 × 10³ and it reduces at the increase of Re. Therefore, from an engineering point of view, the two approaches can be considered to yield the same results.

Equation 19 was proposed in 21 22 23 30 and obtained as a result of a least square curve fitting of available experimental data 9 37 38 for the considered mixture. To assess their consistency, the results obtained from Equation 19 are compared with the very recent model proposed in 39 . The comparison show a difference of -0.4, -0.4 and -6.6% for concentrations of 1, 4 and 6%, respectively. Therefore, it can be concluded that Equation 19 gives, for the present case, a valid estimation of nanofluid viscosity. As for thermal conductivity, Equation 20 was obtained in 21 22 23 using the well known model proposed by Hamilton and Crosser 17 , assuming spherical particles. Such a model, which was first developed on data from several mixtures containing relatively large particles, i.e. millimetre and micrometre size particles, is believed to be acceptable for use with nanofluids. In order to prove this, the results of Equation 20 are compared with the model proposed in 14 , showing a maximum deviation of -2.5% for a concentration of 6%. In light of the small difference, Equation 20 is to be considered a valid formulation to estimate nanofluid thermal conductivity in the present case.

It should be noted that the validity of the reported Equations 17 to 20 remains a subject of debate. At present, there is no agreement in the nanofluids community about the description of thermophysical properties 26 .

In the present article, the thermophysical properties considered for Al₂O₃ are 37 :

and those of base fluid are:

The total entropy generation in the considered channel is obtained as 31 :

In Equation 21, two contributions represent the entropy generation due to heat transfer and the friction losses, respectively. To understand the weight of each contribution to the entropy generation a dimensionless parameter, the Bejan number (Be), is considered:

The value of Be ranges from 0 to 1. Accordingly, Be = 0 and Be = 1 are two limiting cases representing the irreversibility is dominated by fluid friction and heat transfer, respectively. The two quantities on the second member of Equation 21 are expressed, according to Bejan 31 , as follows:

Analyzing Equation 23, it becomes evident that a high Stanton number contributes to the reduction of the heat transfer share of S _gen, (S _gen)_T, whereas a high friction factor has the effect of increasing the entropy generation rate due to viscous effects, (S _gen)_F. Despite its simple form, Equation 23 is a very powerful tool because it allows to minimize the entropy generation inside a given channel with a determined nanofluid subjected to a known heat flux, which is quite a common case.

If nanofluid, channel and heat flux are given, all the thermophysical properties, geometrical factors and heat power are known. The only unknown variables in Equation 23 are Stanton number, mass flow rate, T _b,av and the friction factor. Except for T _b,av, which needs to be estimated as shown in the following, the others parameters, if an adequate correlations for Nu is introduced in St and a proper correlation is used for f, are all function of the velocity.

In the present investigation, the correlation proposed by Pak and Cho 19 is used to calculate Nu

and, according to 19 , the correlation proposed by Kays and Crawford 40 is used to evaluate f

Combining Equations 24, 25 with Equation 23 and setting ∂S _gen/∂V = 0, it is possible to calculate the optimal velocity to minimize entropy generation:

Once Equation 26 is known, the Re _opt value is evaluated as:

The bulk temperature is estimated by means of an energy balance on the inlet and outlet section of the tube:

From Equation 28, it is possible to calculate the outlet temperature and re-arrange it in terms of Re, to obtain the following expression:

With T _out known the bulk temperature of the fluid can be determined as following 41 :

Equations 27 and 30 are coupled, hence they are solved by successive iterations, until the chosen convergence criteria is respected. In the present analysis, the solution is considered to converge if the variation of the bulk temperature between steps n and n - 1 is less than 0.001%.

The results of the present analytical formulation are reported in Table 1.

In the following analysis, uniform axial velocity and temperature profiles are assigned and constant turbulence intensity, I, is imposed at the channel inlet. The inlet temperature and turbulence intensity value are T ₀ = 293 K and I ₀ = 1%, respectively, in all considered cases.

At the channel exit section, the fully developed conditions are obtained, that is to say that all axial derivatives are zero. On the channel wall, the non-slip conditions and a uniform heat flux (q = 50·10⁴ W m^-2) are imposed. Moreover, both turbulent kinetic energy and dissipation are equal to zero. Flow and thermal fields are assumed symmetrical with respect to the vertical plane passing through the channel longitudinal axis. Therefore, a symmetry boundary condition is applied on the aforementioned plane, that is to say the gradient of all variables is zero.

The computational fluid dynamic code Fluent 42 was employed to solve the present problem. The governing equations (Equations 1 to 4) were solved by control volume approach. The residuals resulting from the integration of the governing equations (Equations 1 to 4) are considered as convergence indicators. Convergence is considered achieved, when the residuals of Equations 1 to 4 are in the order of 10^-6, 10^-8, 10^-8 and 10^-8, respectively.

In order to ensure the accuracy as well as the consistency of numerical results, three non-uniform grids were subjected to an extensive testing procedure.

Results showed that for the problem under consideration, the chosen non-uniform grid seems to be sufficient to guarantee the precision of numerical results and their independency with respect to the number of elements used. The considered grid has 25, 50 and 200 elements along the horizontal, vertical and axial directions, respectively, with heavily packed grid points close to the channel wall and at the entrance region, where the temperature and velocity gradients are significant 29 . The computational grid is validated using the correlations proposed by Gnielinski, as also suggested in 27 , Petukhov and Nusselt 43 44 45 for pure water, as shown in Figure 2.

As stated in previous sections, it is assumed that the heat exchange happens by means of forced convection and the contribution of natural convection is not taken into account. In order to show the validity of this assumption, the quantity Gr ⋅ Pr is evaluated for Re = 5 × 10³, 10 × 10³ and 20 × 10³ at z/D = 50, obtaining the following results: (approx.) 5.0 × 10⁶, 4.0 × 10⁶ and 3.0 × 10⁶, respectively. These results are compared with the data reported in 46 , showing that for Re = 10 × 10³ and 20·10³ there is no contribution of natural convection at all, whereas Re = 5 × 10³ seems to be a limit condition, and the contribution of natural convection might be neglected without loosing too much accuracy. It is not possible from the data presented in 46 to understand exactly what happens at Re = 5 × 10³, because the corresponding value of Gr ⋅ Pr is out of the considered range. For the purpose of this analysis, the contribution of natural convection can be neglected without loosing too much accuracy.

First, it is of fundamental importance to understand the impact of nanoparticles on the turbulent flow. As remarked in 10 , an important concept in turbulent flow is that of 'energy cascade'. That is, the kinetic energy originated by the turbulence goes first into larger eddies, from which it is transferred to smaller eddies, then into further smaller ones, until it is converted to heat by viscous forces. Given these facts, it is fundamental to understand if the nanoparticles can conflict with this energy exchange, thereby suppressing turbulence. As observed in 10 , considering a turbulent flow inside a tube of equivalent diameter D and mean velocity , the length scale of the large eddies, l ₀, would be of the order of D, and their time scale, t ₀, of the order of D/ . By means of the Kolmogorov's scaling laws 47 , it is possible to determine the length scale, l _s, and time scale, t _s, of the smallest eddies:

In the case of Re equal to 1 × 10⁵, l _s ~ 2 μm and t _s ~ 2 μs (for particle concentration equal to 6%) are obtained. Therefore, the length and time scales of turbulent eddies are much larger than the nanoparticle size, 38 nm, and relaxation time, ~2 ns, estimated as suggested in 10 . This means that the nanoparticles are transported very effectively by the turbulent flow.

The development of the axial velocity along the tube centreline for φ = 4% is shown in Figure 3 and the results suggest the existence of a fully developed region for z/D ≈ 40 for all the considered Reynolds numbers. Immediately after the tube inlet, the boundary layer growth pushes the fluid towards the centreline region, causing an increase of the centreline velocity. As the Reynolds number increases, the maximum value of axial velocity moves further downstream, because the increase of axial momentum transports the generated turbulence in the flow direction. After the maximum point, the velocity at the centreline decreases in order to respect the continuity equation, as also reported in 29 .

It is interesting to note that the maximum and fully developed values of the dimensionless centreline velocity decrease as Reynolds number increases. This effect is due to the fact that the corresponding velocity profiles become more uniform as Re increases.

In Figure 4, wall and bulk temperature profiles for Re = 20 × 10³ are reported. The figure clearly shows that the inclusion of nanoparticles has a beneficial effect on the wall temperature, which decreases according to increase in the particles' concentration.

Particularly, the temperature difference at tube exit, between base fluid and nanofluid with φ = 6% is about 20 K. Consequently, particles effect is remarkable. This behaviour can be explained by means of the higher thermal capacity (i.e. the product of density and heat capacity) of nanofluids with respect to conventional fluid. Therefore, more energy is required to increase the bulk temperature. This property is of fundamental importance, because it allows to downsize devices without violating thermal constraints, as shown in 47 48 .

Increasing particles' concentration causes the increase of the average heat transfer coefficient, as clearly shown by Figure 5a.

The average shear stress on the tube wall is reported in Figure 5b. The figure shows an increase in the shear stress in accordance with the concentration and Reynolds number. For the lowest concentration considered, φ = 1%, the increase in the shear stress with respect to the base fluid is about the 10%, while for the other concentration values, φ = 4 and 6%, the increment is noticeable and it increases in accordance with concentration and Reynolds number. As for the friction factor, it is observed to be in strong agreement with Equation 25, but for the sake of brevity, the relative diagram is not reported. It is important to underline that looking at Figure 5a, b it is not possible to make deductions about the energetic convenience in using of nanofluids.

Average Nusselt number, for all the concentrations and Reynolds numbers, is reported in Figure 6. In this figure, comparisons with experimental and numerical correlations, present in the literature, are also provided.

A comparison with the experimental correlations proposed by Pak and Cho 19 and Xuan and Li 20 and the numerical correlation proposed by Maiga et al. 22 is accomplished.

Figure 6a shows the performances of the aforementioned correlations when only the base fluid is considered. The correlation proposed by Maiga et al. 22 over-estimates the values provided by Pak and Cho 19 by about 20%, while Xuan and Li 20 correlation under-estimates them by about 15%. However, these results can be considered acceptable, as reported also by Buongiorno 10 .

Average Nusselt number for φ = 1% is reported in Figure 6b. The values of the present work are in very good agreement with Pak and Cho 19 correlation, except that for Re = 5.0 × 10³ and 10 × 10³, which fits the value given by Maiga et al. 22 However, it is important to remark that Re = 10 × 10³ is the lowest limit to apply Pak and Cho correlation, which was obtained in the range 10 × 10³ < Re < 100 × 10³ 19 .

For Re < 30 × 10³, Xuan and Li 20 data are in agreement with Pak and Cho 19 and the present numerical data, whereas for Re > 30 × 10³, there is a deviation, which leads to over-estimated values. For φ = 4% and φ = 6%, in Figure 6c, d, respectively, the average Nusselt number presents a similar behaviour to the previous case. In fact, the average Nusselt numbers of the present work are in strong agreement with the results of Pak and Cho 19 except that for Re = 10 × 10³ which, on the contrary, is in agreement with Maiga et al. 22 and Xuan and Li 20 and Re = 5 × 10³, which is greater than all the correlations values. For Re > 2.0 × 10⁴, Xuan and Li's 20 correlation significantly overestimates the average Nusselt number.

It is important to note, as also indicated by Buongiorno 10 , that Pak and Cho's 19 correlation is completely empirical, whereas Xuan and Li's 20 is based on the dispersion model, but it needs five empirical coefficients to match the data. They experimentally determined these five coefficients to match their analytical correlation. This fact could explain the deviation between the two earlier mentioned correlations. Moreover, it is important to remark that Pak and Cho 19 developed their correlation working with Al₂O₃ nanofluid, as in the present article, whereas Xuan and Li 20 worked with Cu nanofluid, even though their correlation should be valid in general 20 33 .

In this section, the entropy generation analysis is presented. The analysis is formulated in global terms and it allows to understand the optimal working conditions for the considered channel from the energetic point of view.

Entropy generation due to heat transfer and friction losses is reported for each concentration, as a function of Reynolds number in Figure 7, for φ = 1%, Figure 7a, φ = 4%, Figure 7b, and φ = 6%, Figure 7c. It is possible to observe that as Re value increases, there is a reduction of (S _gen)_T, because there is a decrease in the difference between wall and bulk average temperatures, which causes a decrease in the entropy generation. On the contrary, as Re increases, there is an increment of (S _gen)_F, because of the higher values of velocity gradient, which causes an increase of the wall shear stress, and, consequently, of the friction losses.

As the particles' concentration increases, (S _gen)_T decreases and (S _gen)_F increases. This happens because a higher particles' concentration improves the heat transfer between wall and fluid contributing to a reduction in the difference between wall and bulk temperature. However, it also causes an increase of the nanofluid viscosity, which leads to an increase of the shear stress.

According to Equation 27, the optimal Reynolds number for each concentration is calculated, as reported in Table 1. It is noted that Re _opt value decreases as the φ value increases. This is also shown in Figure 8, where the numerical calculation of total entropy generation as a function of Re is reported for each concentration value. The analytical results of Equation 27 are in very good agreement with the numerical results (Figure 8); in fact, the minimum points of the curves correspond to the Reynolds values reported in Table 1. This result can also be considered an indirect proof of the agreement between results proposed by Pak and Cho 19 and the mixture model employed in the present article. In Figure 8, it is noted that the optimal value of Reynolds number decreases as the concentration increases. This happens because the increase of the viscosity becomes more and more important, overcoming the beneficial effect that the particles have on the heat transfer and, consequently, on (S _gen)_T.

The behaviour of Bejan number is reported in Figure 9. It is observed that Be decreases as Re and φ increase, showing that (S _gen)_F is increasing. For φ = 4% and Re = 1.0 × 10⁵ and for φ = 6% and Re = 8.0 × 10⁴, Be is about 0.5. This means that entropy generation, due to heat transfer and friction losses, have the same weight. Up to Re = 2 × 10⁴, Be is equal to 1 for all concentrations, showing that in all considered cases, the entropy generation is due to thermal irreversibility. For Re > 2 × 10⁴, Be value starts to decrease, but with different slopes according to particles' concentration. Particularly, at the higher concentration, there is higher slope, because the friction losses, due to the increase of Re and viscosity, become more relevant.