The flow configuration of MWCNTs-PG is considered over an inclined surface positioned in cartesian coordinates. The surface is inclined at an acute angle through the vertical axis oriented in an anticlockwise direction. To examine an innovative behavior of the nanofluid, influences of combined convection plugged in the governing model. Moreover, the flow is radiative, and viscous dissipation effects are contemplated. The fluid temperature is maintained at T w at the surface and T ∞   far from the surface. The nanofluid flows in the region y > 0 . It is assumed that MWCNTs will be dispersed in PG uniformly, that they are thermally compatible, and thatno slip occurs between them. Furthermore, the velocity and thermal slips are imposed over the surface. The flowing scenario of MWCNTs-PG is depicted in Figure 1.

To boost the energy storage of MWCNTs-PG, the following thermophysical attributes are ingrained in the constitutive model. These correlations are given in Table 1:

In Table 1, subscript n f stands for nanofluid and ϕ is the volumetric fraction of MWCNTs. The thermophysical values of the host liquid PG and MWCNTs are elaborated in Table 2 (Shaiq and Maraj, 2019; Benos et al., 2019):

Under the assumptions mentioned in the problem statement, the following relations constitute the flow of MWCNTs-PG over an inclined surface by incorporating the influences of combined convection, viscous dissipation, and thermal radiations (Das et al., 2015): ∂ u ∨ ∂ x + ∂ v ∨ ∂ y = 0 , (1) ρ ︷ n f ( u ∨ ∂ u ∨ ∂ x + v ∨ ∂ u ∨ ∂ y ) − μ ︷ n f ∂ 2 u ∨ ∂ y 2 − g ^ ( ρ ︷ β ︷ ∗ ) n f ( T ︷ − T ︷ ∞ ) c o s γ = 0 (2) ( ρ C p ︷ ^ ) n f ( u ∨ ∂ T ∨ ∂ x + v ∨ ∂ T ∨ ∂ y + w ∨ ∂ T ∨ ∂ z ) − k ︷ n f ∂ 2 T ∨ ∂ y 2 − μ ︷ n f ( ∂ u ∨ ∂ y ) 2 + 16 σ ∗ T ^ ∞ 3 3 K ∗ ∂ 2 u ∨ ∂ y 2 = 0 (3)

The flow over the surface obeys the following conditions at the surface and far from it: u ∨ = ∂ u ∨ ∂ y L , v ∨ = − u ∨ w , T ︷ = T w ︷ + ∂ T ∨ ∂ y K   at   y = 0 u ∨ → U ∞ , T ︷ → T ∞ ︷   at   y → ∞ In the above conditions, T w ︷ = T ∞ ︷ + T 0 ︷ x − 1 is the changeable temperature at the surface, the free stream is maintained at T ∞ ︷ and T ∞ ︷ < T w ︷ , the fluid moves uniformly at the free stream with velocity U ∞ , the velocity and thermal slip factors are denoted by L and K , respectively and the no-slip condition of MWCNTs-PG is recovered by setting L = 0 = K .

The supporting similarity equations for the problem are given by the following mathematical relations: β ( η ) = T ︷ − T ∞ ︷ T w ︷ − T ∞ ︷ , η = U ∞ x ν f y   and   Ψ ︷ = ν f x U ∞ F ( η )

The velocity components u ∨ and v ∨ can be achieved through the rule u ∨ = ∂ Ψ ︷ ∂ y and v ∨ = − ∂ Ψ ︷ ∂ x

Finally, after plugging the defined rules in the constitutive MWCNTs-PG model, the following self-similar version is achieved: 1 ( 1 − ϕ ) 2.5 ( π { ( 1 − ϕ ) + ϕ ρ ︷ M W C N T s ρ ︷ P G } ) F ‴ + 1 { ( 1 − ϕ ) + ϕ ρ ︷ M W C N T s ρ ︷ P G } λ β C o s   γ + 0.5 F F ″ = 0 , (4) ( 1 + R d { ( 1 − ϕ ) + 2 ϕ k M W C N T s ︷ k M W C N T s ︷ − k P G ︷ ln ( k M W C N T s ︷ + k P G ︷ ) 2 k P G ︷ ( 1 − ϕ ) + 2 ϕ k P G ︷ k M W C N T s ︷ − k P G ︷ ln ( k M W C N T s ︷ + k P G ︷ ) 2 k P G ︷ } ) β ″ + ( 1 ( 1 − ϕ ) 2.5 Pr E c F ″ 2 + 0.5 { ( 1 − ϕ ) + ϕ ( ρ c p ︷ ) M W C N T s ( ρ c p ︷ ) P G } Pr F β ′ ) { ( 1 − ϕ ) + 2 ϕ k M W C N T s ︷ k M W C N T s ︷ − k P G ︷ ln ( k M W C N T s ︷ + k P G ︷ ) 2 k P G ︷ ( 1 − ϕ ) + 2 ϕ k P G ︷ k M W C N T s ︷ − k P G ︷ ln ( k M W C N T s ︷ + k P G ︷ ) 2 k P G ︷ } = 0 (5)

The new version of the flow conditions is achieved as: F ( η = 0 ) = S ,   F ′ ( η = 0 ) = F ″ ( η = 0 ) δ ,   β ( η = 0 ) = 1 + β ∗ β ′ ( η = 0 ) F ′ ( η ∞ ) = 1 ,   β ( η ∞ ) = 0

The governing flow parameters are defined by the following relations in Table 3:

This subsection presents the motion of MWCNTs-PG by increasing the strength of the velocity parameter and fraction factor of MWCNTs. The results plotted for buoyancy added ( λ > 0 ) , buoyancy opposed ( λ < 0 ) , and in the absence of combined convection, respectively.

Figure 2 captures the behavior of fluid motion against rising velocity slip parameter δ . The fluid motion is in direct proportion with the strength of the slip parameter. Near the inclined surface, the velocity abruptly rises, and then with time it reduces and then finally approaches the free stream velocity. Physically, at the surface vicinity, the slip effects are dominant and maximum variations in the velocity are examined. The force of friction between the fluid layer adjacent to the surface and the surface of the sheet is reduced due to the slip effects. As a result, the fluid particles move freely and abruptly over the surface. For buoyancy opposed flow, these variations are quite rapid and buoyancy assists flow scenarios. The momentum boundary layer region increases for buoyancy assisted flow of MWCNTs-PG.

The influences of suction and injection are also captured for MWCNTs-PG. Based on the results, the injection of MWCNTs-PG from the surface favors the movement of the fluid over the surface. Physically, injecting fluid exerted extra force on the fluid particles, which ultimately boosts the momentum of the particles. Due to increasing momentum, the fluid motion rises whereas, in the case of suction, the motion is slow because the fluid particles are stuck at the surface, which slightly decreases the fluid momentum. Therefore, the fluid moves more slowly than when injected.

Figure 3 examines the fluid motion by strengthening the fraction factor of MWCNTs. By increasing the strength of the fraction factor within the feasible domain, fluid motion is resisted. Physically, the mixture becomes denser due to the high volumetric fraction and intermolecular forces between the fluid particles becoming dominant. As a result, the fluid motion drops. The maximum drop in the motion is observed for buoyancy opposing flow and minimal decreasing variations are noted for buoyancy-assisted flow. These results are demonstrated in Figures 3A–C, respectively.

The viscous dissipation and thermal slip parameters significantly alter the fluid thermal behavior over the desired domain. Therefore, Figures 4, 5 are decorated to analyze the temperature trends of MWCNTs-PG against Ec and β ∗ . The temperature of MWCNTs-PG enhances for more dissipative fluid. The fluid temperature prominently rises near the surface for both suction and injection of the fluid. Physically, the internal energy of the fluid particles enhances due to more dissipation effects and it leads to an increment in the thermal field. The temperature far from the surface obeys the ambient temperature condition and finally vanishes by showing its asymptotic behavior.

For injection of the fluid, the temperature rises more rapidly than suction. Physically, injecting fluid transfers energy to the fluid particles and the internal energy of MWCNTs-PG boosts. This leads to an increment in the thermal profile β ( η ) . The temperature trends against the thermal slip parameter are demonstrated in Figure 5. It is noteworthy that, in the presence of combined convection effects, the temperature drops near the surface by strengthening the thermal slip parameter.

The temperature alterations due to the velocity and thermal radiation parameters are elaborated in Figures 6, 7, respectively. From the analysis of Figure 6, the resistive behavior of δ on the temperature field is observed. The temperature rapidly drops for the suction case. Physically, the fluid particles stick to the surface due to the suction of the fluid and intermolecular forces between them becoming more dominant. This drops the momentum of the fluid and ultimately collisions between the particles become slow, which leads to a decrement in temperature β ( η ) . These effects are pictured in Figures 6A,B for buoyancy assisted and without convection, respectively.

Figure 7 elaborates on the influence of thermal radiations on the temperature performance of MWCNTs-PG. The imposed thermal radiations favor the temperature of the nanofluid. Physically, the internal energy of MWCNTs-PG rises due to thermal radiations, and in turn the temperature rises. For suction of the fluid, the rise in the temperature is slower than the injecting fluid. The injecting fluid provides extra energy to the fluid particles due to the existence of thermal radiations, which significantly increase the temperature.

The trends in surface shear stress due to altering the velocity slip and combined convection parameter are elaborated in Figure 8. The shear stresses at the surface decline quickly against δ . However, for injection cases, rapid decrement in the shear stresses was investigated. The reason for this decrease is that fluid particles left the surface due to the injecting fluid as a result transformation of the surface stresses drops. On the other hand, combined convection favors the transformation of the shear stresses at the surface. This behavior is outlined in Figures 8A, B, respectively.

The local thermal performance of MWCNTs-PG against Ec, β ∗ and thermal radiation over Ec are demonstrated in Figures 9, 10, respectively. On inspection of the results, the local thermal performance rate in the particular nanoliquid drops Ec and β ∗ . By enhancing the strength of these parameters, the decrement becomes slowed down. Similar trends in the local heat transport mechanism are highlighted in Figure 10.

Table 4 provides a summary of the results against the varying flow quantities. It covers all the questions of the conducted research.