Over the past decades, Venturi tube has grown of importance in many applications such as cavitation bubbles [1], liquid flow metering [2], powder and particle transportation [3]. It’s worth pointing out that Venturi tube plays an extremely important role in the transportation of medium (i.e. powder, particles and liquid) in manufacturing industry, such as shot peening, water jet, sand blasting [4] [5] [6] [7] [8]. Strengthen grinding technology [9] [10], which employs a three-phase jet flow that consists of abrasive powders, steel balls and grinding fluids to shoot workpiece, emerges as a new solution to improve the fatigue life of metals (See Figure 1). Such technology can reduce surface roughness and form a harden layer, which is believed to enhance the fatigue life of the metals since the micro-cutting effect and shock processing of abrasive powders and steel balls. Moreover, the grinding fluid helps clear dust and rust. Therefore, strengthen grinding technology opened a new window for processing metal parts such as bearing, gear, and mould.

Venturi tubes are among the most important components in strengthen grinding equipment, but they usually suffered from poor conveying and non-continuity feeding of mixed abrasive during working condition. The conveying efficiency is mainly impacted by the flow resistance. The flow resistance, which may weaken the conveying efficiency of the Venturi tube, is highly impacted by geometry parameters. It mainly reflects in velocity and pressure distribution of the flow field. To address this issue, many studies have been carried out [11] [12] [13]. An example of Venturi tube has been optimized to evaluate its effect on the conveying properties and the pressure reduction by flowing gas-solid mixtures [14]. Li [15] demonstrates that the outlet tangle and the diameter ratio of Venturi tubes are the two key parameters in controlling the throat pressure and power consumption. However, these works are mainly focused on either solid-gas or fluid transportation, the suction pressure inside is relatively low. Venturi tube used for transporting of three-jet flow has a higher requirement on suction pressure and the investigation is still absent.

In this paper, a Venturi tube that used for transporting mixed abrasive has been proposed and optimized. Finite element method (FEM) was taken into consideration and the pressure and velocity distribution in the flow field have been studied. The optimal parameters including the ratio between throat diameter and inlet diameter (k₁), the ratio between suction diameter and throat diameter (k₂), and the convergent angle (α) as well as the diffuser angle (β) were selected. Through further verification, the optimal solution performs well and has great potential to be used in transporting mixed medium.

The proposed simplified Venturi tube is shown in Figure 2. It includes two parts: main tube and suction tube, the suction tube located in the throat of main tube. Table 1 reported the definitions of the geometric parameters.

When medium flow through main tube, the gas inside is carried away and the static pressure drops as the flow velocity increases. A negative pressure effect is formed once the flow velocity reaches a critical value, which help to absorb material from the suction port. The velocity increases rapidly in the process from inlet to throat since the diameter convergence. The maximum velocity appears in the throat tube and thus causes a maximum negative pressure. Therefore, the solid particles such as steel balls and abrasive powders can be sucked into the main tube by the negative pressure effect. Finally, the transportation of the solid material or mixed abrasive can be realized.

The pipeline pressure versus flow velocity is described by the following Bernoulli equation

P = C − 1 2 ρ v U 2 − ρ g h (1)

where P is the pressure, U is the flow velocity, ρ is the fluid density, g is the gravitational acceleration, h is the height of the flow and C is a constant.

The suction force of the Venturi tube can be expressed as [16]

F d = 1 8 π C d ρ U 2 D 2 (2)

where C_d is the drag coefficient of the flow around the medium, ρ is the density of the ambient flow, D is the cross-section diameter.

The drag coefficient of the flow around the medium can be expressed as [17]

C d = 24 R e ( 1 + b 1 R e b 2 ) + b 3 R e b 4 + R e (3)

where R_e is the Reynolds number, b_x is the coefficient that depends on the shapes of solid and the location of parts.

The mixed abrasive used for strengthen grinding is a mixture of steel balls and abrasive powder, and its shape is irregular. Here, a variate τ is introduced to describe the surface area of the mixed abrasive. And it’s defined as

τ = S 1 S 2 (4)

where S₁ is the surface area of the equivalent sphere, and S₂ is the surface area of the mixed abrasive. Then, the coefficient of b_x can be expressed as [17]

b x = { exp ( 2.33 − 6.46 τ + 2.54 τ 2 )                                                   ( x = 1 ) 0.09 + 0.56 τ                                                                                         ( x = 2 ) exp ( 4.91 − 13.84 τ + 18.42 τ 2 − 10.26 τ 3 )                 ( x = 3 ) exp ( 1.47 + 12.26 τ − 20.73 τ 2 + 15.89 τ 3 )                 ( x = 4 ) (5)

The airflow density is related to the pressure and the velocity according to the Bernoulli equation, shown in Equation (6).

ρ = 2 C − 2 P U 2 (6)

Substituting Equation (3) and Equation (6) into Equation (2), the suction force can be expressed as

F d = [ 3 R e ( 1 + b 1 R e b 2 ) + b 3 R e 8 b 4 + 8 R e ] ( 2 C − 2 P ) D 2 (7)

with joint Equation (5) and Equation (7), the suction force of the Venturi tube can be got.

It can be seen that the suction force of Venturi tube is highly depend on the flow velocity, which was impacted by the throat diameter (D₂), the suction port diameter (d), the convergent angle (α), the diffuser angle (β) and the inlet velocity. Therefore, the geometry parameters were taken into consideration in this study. To simplify the analysis, k₁ and k₂ were introduced, which were defined as k₁ = D₂/D₁ and k₂ = d/D₂, respectively.

This work was carried out in the fluent module of ANSYS Workbench software using FEM method. It was regarded as an effective tool for the design and optimization of Venturi tubes [18] [19] [20]. As mentioned before, a three-jet flow needs a higher suction pressure that caused by negative pressure effect, while negative pressure effect is highly depends on flow velocity. Hence, pressure and velocity were simulated. To improve simulation efficiency, a single medium of gas was selected and a 3-D model was considered.

The geometric parameters were selected from Figure 2, the boundary condition is shown in Figure 3. The initial pressure in both the suction port and outlet port was set as zero. The flow velocity in the inlet was set as 20 m/s. The flow field is in a stable state and work at room temperature. The adaptive method was adopted for the meshing of model (See Figure 3).

The governed equations in the simulation are shown in the following:

∂ ρ ∂ t + ∇ ⋅ ( ρ U ) = 0 (8)

v = ∑ ​ 1 2 α 1 ρ 1 U 1 ρ (9)

ρ = ∑ ​ 1 2     α 1 ρ 1 (10)

where α 1 , ρ 1 and U 1 are the fraction, density and velocity, respectively.

The velocity dependence of pressure can be obtained by discrete momentum equation, which is shown in Equation (11).

ρ = ∑ ​ 1 2     α 1 ρ 1 (10)

The velocity dependence of pressure can be obtained by discrete momentum equation, which is shown in Equation (11).

a P U P r → + ∑ N a N U N r → = S → − ∇ P 0 (11)

where a P and a N are constants, S is a microunit on the surface of the spatial control body, U P r → is the predicted center velocity of the control body, U N r → is the predicted velocity around the control body and P 0 is the initial pressure.

The Semi-implicit method for pressure linked equations consistent (SIMPLEC) algorithm, which is based on continuity equation of Equation (12) and Equation (13) [21] [22], was employed for the calculation. And the solving process of velocity and pressure in the Venturi tube was illustrated in Figure 4.

∇ ⋅ ( 1 a P + ∑ N a N ∇ P n ) = ∇ ⋅ [ H b y → A r + ( 1 a P + ∑ N a N − 1 a P ) ∇ P r ] (12)

U p n → = H b y → A r + ( 1 a P + ∑ N a N − 1 a P ) ∇ P r − 1 a P + ∑ N a N ∇ P n (13)

The variation parameters include k₁, k₂, α, β. A single variable method was used. k₁ and k₂ ranging from 0.4 to 0.9 with a step of 0.1, α ranging from 5˚ and 30˚ with a step of 5˚, β ranging from 4˚ to 14˚ with a step of 2˚. Details see in Table 2. After finish the first part of our simulation, a verification mode is used to assess its performance.

Figure 5 reported the pressure distribution along the flow direction. It can be seen that static pressure initially falls as medium flow in the tubes, when arrives at the end of throat, the static pressure reaches its valley −1090 Pa. It is interesting to observe that the minimum static pressure achieves after medium pass through the throat. This could be explained by the absorption of extra air in the suction port, which caused oscillation. Figure 5(b) reported the static pressure distribution in the suction port projected to the axis of main tube. The pressure is overall in a stable state, ranging from −840 to −949 Pa. The pressure in the intersection part of suction pipe and throat pipe was significantly lower than the other parts of suction port. Hence, absorbing materials is become possible.

As mentioned above, the airflow velocity was closely related to the ratio of throat diameter to inlet diameter (k₁), which controlled the cross-sectional area, under steady flow conditions. And it was confirmed again in Figure 6(a), where k₁ increased from 0.4 to 0.9 and the maximum airflow velocity of Venturi tube

decreased from 145 m/s to 27.2 m/s. But other variables have little effect on maximum velocity compare with k₁. Moreover, the maximum velocity increases as k₂ increases (See Figure 6(b)), which is opposite to the trend in Figure 6(a). When k₂ increases, the diameter of suction pipe will also increase. Then the fluid drag force that courses by the suction pipe will decrease and leading to the increasing of maximum velocity in Venturi tube. An interesting fact that the velocity distribution of diffuser section is symmetrical when the convergent angle is 20˚ (See Figure 6(c)), whereas the high velocity of the others spread over the position that is opposite to the side of suction port when parameters change. No obvious velocity change can be found with the change of diffuser angle from 4˚ to 14˚ (See Figure 6(d)). Hence, a conclusion can be drawn that the value of diffuser angle has the least effect on the airflow velocity of Venturi tube among the four factors in this study.

The geometric optimization of Venturi jet tubes for medium conveying in strengthen grinding equipment was performed by FEM. The following conclusions can be drawn based on the analysis.

When the diameter ratios of k₁ and k₂ are equal to 0.4 and 0.5, a better acceleration effect and negative pressure effect achieve, which is more conducive to the transportation of medium during the strengthen grinding process. A convergence angle of 20˚ and a diffuser angle of 4˚ had selected for the optimal angle of the proposed Venturi tube in this study. The suction force mathematical model for medium conveying of different sizes particle by Venturi tube had been established, which could help the parameter design of Venturi tube.

A single-phase flow is used to simulate the flow field of the Venturi, and the rationality of the structure is evaluated by the flow velocity and pressure, which constitutes the limitations of this study. And the multiphase flow simulation and experiment need to be carried out in the future.

This research was supported by the Science and Technology Planning Project of Guangdong China (2019B020404) and the Science and Technology Planning Project of Guangzhou China (202102080225).

The authors declare no conflicts of interest regarding the publication of this paper.

Xiao, J.R., Liang, Z.W., Liu, X.C., Zhao, Z. and Xie, X.C. (2021) Design Optimization Analysis of Venturi Tube for Medium Conveying in Strengthen Grinding Process. Engineering, 13, 431-447. https://doi.org/10.4236/eng.2021.138031