When there is a wall near the jet, it deflects and flows while being attached to the wall owing to the Coanda effect. The flow characteristics of the incompressible and twoimensional (2D) Coandareattached jets have been considerably explained. However, 2D supersonic underexpanded jets, reattached to side walls, have not been sufficiently investigated. These jets are used in gasatomization to produce fine metal powder particles of several micrometers to several tens micrometers. In this case, the supersonic underexpanded jets are issued from an annular nozzle, which is set around a vertically installed circular nozzle for molten metal. The jet flow at the center cross

section of the annular jet resembles a 2D Coandareattached jet that deflects and attaches on the central axis. In this study, the flow characteristics of a supersonic underexpanded Coanda air jet from a 2D nozzle that reattaches to an offset side wall are elucidated through experiment and numerical analysis. For numerical analysis, we show how much it can express experimental results. The effects of supply pressure P_{}_{0} on the flow characteristics such as the flow pattern, size of shock cell, reattachment distance, and velocity and pressure distributions, etc. are examined. The flow pattern was visualized by Schlieren method and the velocity distribution was measured using a Pitot tube. These results will be also useful in understanding the flow characteristics of a gasatomization annular nozzle approximately.
When there is a wall near the jet, the jet will adhere to and flow round nearby the wall. This Coandareattached flow is used for controlling flow in a wall attached type fluidic device, preventing flow separation, and increasing the wing lift force. The flow characteristics of incompressible twodimensional (2D) Coandareattached jet flows have been elucidated considerably owing to the development of fluidics [1] [2]. For example, Bourque et al. [1] studied the reattachment distance and pressure within the separation bubble of a 2D reattached jet by a theoretical analysis using momentum theory, and compared them with experiments in terms of the offset distance and inclined angle of the side wall.
Supersonic underexpanded free jets, such as jets from jet engines and rocket engines to obtain thrust have been studied in detail. Donaldson et al. [3] classified the flow patterns of sub and supersonic underexpanded jets into three, depending on the pressure ratio of the supply pressure to the ambient pressure. Kojima et al. [4], Zapryagaev et al. [5], and André et al. [6] studied the structure of shock waves, the pressure and velocity distribution of supersonic underexpanded jets. Shadow et al. [7] and Zaman [8] showed the compressible spreading rates and mixing characteristics of supersonic coaxial jets. Katanoda et al. [9] [10] explained the effects of the nozzle divergence angle and Mach number on the shock cell length, and Sugawara et al. [11] showed the structure of threedimensional microjet with a Mach disc by MachZender in interferometer. Zaman [8] examined the flow characteristics of sub and supersonic jets from special nozzles, whereas Shakouchi [12] studied those from an orifice nozzle. Franquet et al. [13] reviewed the studies on free underexpanded jets in a quiescent medium. However, studies regarding supersonic underexpanded Coandareattached jet flows and their flow characteristics are rare [14] [15].
For example, supersonic underexpanded jets are used in gasatomization, producing fine metal particles of several micrometers to several tens of micrometers [16] [17] [18]. The molten metal from a circular nozzle is broken, subdivided, and refined by a shearing force caused by the large velocity gradient outside the supersonic underexpanded jet issued from a coaxial annular nozzle installed near the circular nozzle, and high frequency fluctuations caused by the flow (Figure 1). The atomized molten metal, which is spherical owing to surface tension, is subsequently cooled to produce fine metal powder particles. In this case, the supersonic underexpanded jet from the annular nozzle curves inward, deflects, and flows over the cone shape collectively because the pressure inside the annular jet decreases owing to jet entrainment, and the jet flow at the center section of the xy plane of the annular jet resembles a 2D Coandareattached jet that deflects and attaches on the central axis. To improve the production efficiency of the gasatomization and control the particle size and distribution, the flow characteristics of the supersonic underexpanded Coandareattached jet from an annular nozzle must be studied.
In this study, the flow characteristics of a supersonic underexpanded Coanda air jet from a 2D nozzle that reattaches to an offset side wall are elucidated through experimental and numerical analyses. For numerical analysis, we show how much it can express experimental results. The effects of supply pressure P_{0} on the flow characteristics such as the flow pattern, size of shock cell, reattachment distance, and velocity and pressure distributions are examined. The flow pattern was visualized using the Schlieren method and the velocity distribution was measured using a Pitot tube. P_{0} was changed between 0.2 MPa to 0.5 MPa. These results will also be useful in understanding the flow characteristics of a gasatomization annular nozzle approximately.
2. Flow Model
Figure 2 shows the flow model and an illustration of how the 2D air jet issued from the nozzle of width b reattaches to the side wall with an offset distance D at the reattaching distance x_{R} while surrounding a separation bubble region of pressure P_{b}. In this case, the jet centerline can be approximated by a circular arc of radius R with its origin on the yaxis [1].
3. Numerical Analysis
The CFD program, SOLIDWORKS Flow Simulation, was used for the numerical analysis. The governing equations obtained using the kε turbulence model, and the Favreaveraged NavierStokes equation were analyzed based on the finite sedimentation and participation methods.
Figure 3 shows the schematic of the calculation model and the calculation mesh. An orthogonal coordinate system was used, and the control volume was a rectangular parallelepiped. The cells in the vicinity of the shape boundary, domain region, narrow nozzle passage, center of the jet, and the entrainment region of the jet are subdivided into different levels. The cells are arbitrarily cut by the shape boundary, and one parallel sixspecimen cell has a plurality of different control volumes, such as one solid and one fluid. In addition, the nozzle width, the length of the parallel section of the nozzle, and offset distance were b, L_{w}/b = 4.0, and D/b = 5.0, respectively. The upper left of the flow channel contained an opening, for the molten metal for gasatomization, but it was closed and calculated in this study. This was assumed not to affect the flow characteristics of the reattached jet. Calculations were performed primarily for the 2D channel and the channel with a nozzle AR = 4.0. The supply boundary entrance condition, that is, the supply air setting, was set to P_{0} = 0.2  0.5 MPa at the static pressure setting. The exit boundary condition was set to atmospheric pressure. After investigated the effects of the number of cells on the flow, 1.13 × 10^{6} cells were used.
4. TwoDimensional Jet
Figure 4(a) shows the density distribution ρ/ρ_{0} from numerical analysis, on the xy plane of the supersonic underexpanded reattached jet issued from the 2D nozzle of width b. The offset distance is D/b = 5.0 and the supply pressure is P_{0} = 0.4 MPa. In Figure 4(a), the length C_{L} and width C_{W} of the 1^{st} shock cell are also shown. Their details will be shown in the section 6.2. The jet from the 2D nozzle expands and compresses to form shock cells while generating shock waves and then flows away. In this case, owing to flow entrainment, the pressure on the side wall of the supersonic underexpanded jet decreases, and the jet is deflected and reattached to the side wall and flows down while forming a separation bubble. The reattaching distance x_{R}, i.e., the value of x at the reattachment point (Figure 2), also known as the reattaching distance, is x_{R}/b = 16.1. Furthermore, the minimum pressure and the position on the side wall are P_{wmin}/P_{0} = −0.046, and x/b = 8.5, respectively. In addition, the jet centerline can be expressed by an arc of radius R/b = 35.0.
Figure 4(b) shows the density distribution ρ/ρ_{0}, from numerical analysis, of the xy plane at the center height of the flow channel of the supersonic underexpanded reattached air jet issued from a rectangular nozzle with aspect ratio AR = H/b = 4.0 (H: nozzle height). The flow patterns in Figure 4(a) and Figure 4(b) are approximately the same, and the reattaching distance x_{R}, minimum bubble pressure P_{b}, and radius R are also approximately the same; x_{R}/b = 16.1, 15.8, P_{wmin} = −0.046, −0.046, and R/b = 35.0, 36.5, respectively. Consequently, it may be assumed that the flow state in the xy section at the center height of the flow channel with AR = 4.0 in Figure 4(b) is twodimensional. The experiments are carried out using the flow channel of AR = 4.0, as shown in Figure 5.
5. Experimental Apparatus and Procedure
Figure 5 illustrates the experimental apparatus. The elements comprise brass nozzle walls, a side wall, and transparent upper and lower glass end plates. The air from the compressor passes through the reservoir, dryer, and flow meter (Azbil, air flow monitor, CMG500) and flows in the element; subsequently, it flows from the rectangular nozzle of width b = 2.5 mm (AR = 4.0) and parallel length L_{w}/b = 4.0 to the ambient. In this case, a equal amount of compressed air was introduced through the φ = 8.5 mm inflow holes provided on the upper and lower end plates of the element. The jet reattaches to the side wall at an offset distance of D/b = 5.0 by the Coanda effect and flows while forming a circulating separation bubble region between the jet and the side wall.
A static pressure hole, φ = 0.8 mm, was provided at the center height of the channel before the nozzle, which was used to measure the supply pressure P_{0}. The supply pressure varied to a maximum of P_{0} = 0.5 MPa; subsequently, flow visualization and velocity and pressure measurements were performed.
A Schlieren optical system (Kato Koken, Japan, SS150) was used for flow visualization. A total or static Pitot tube with a diameter of 1.0 mm was used to
measure the velocity at the center height of the element. The velocity distribution was obtained by the total and static pressure measurements while considering the compressibility. The Bourdon tube and mercury column manometers were used for pressure measurements. A threedimensional (3D) traverse device was used to move the Pitot tube. The pressure distribution on the side wall was measured through pressure holes of φ = 0.8 mm, installed every 3.0 mm in the xdirection at the center height of the side wall. The reattachment point of the jet was obtained using the tuft method [1]. Since the flow direction on the side wall changes back and forth with reattachment point as the boundary (Figure 2), the reattachment point can be estimated from the direction of a small tuft or thin thread slowly moved on the wall.
6. Results and Discussions6.1. Flow Patterns
Figure6(a)(1) shows the visualized Schlieren image of the supersonic reattached jet with b = 2.5 mm (AR = 4.0), D/b = 5.0, and P_{0} = 0.2 MPa. The jet issued from the nozzle expanded in the ydirection and then compressed; subsequently, the shock cell was formed in the underexpanded jet. The white and dark colored areas in the shock cell approximately correspond to the expansion and compression regions, respectively. The jet forms a group of shock cells and then curves and reattaches to the side wall by the Coanda effect. The chainline in the Figureshows the jet centerline with the origin on the yaxis when the jet center was approximated using a circular arc. Bourque et al. [1] showed that the centerline of a 2D incompressible reattached jet can be approximated by a circular arc. It is assumed that the jet centerline of the supersonic underexpanded reattached jet can also be approximated using a circular arc.
Figures 6(a)(2)(4) show the results for P_{0} = 0.3  0.5 MPa, respectively. The length C_{L} and width C_{W} [Figure 6(b)(3)] of the shock cell increases with P_{0}, radius R of the circular arc, and the reattachment distance x_{R}. Figures 6(b)(1)(4) show the density distributions ρ/ρ_{0} (from numerical analysis) for P_{0} = 0.2  0.5 MPa, respectively. Like the density distribution, the flow pattern, C_{L}, C_{W}, R, and x_{R} agree with the experimental results (details will be described later). That is, the flow characteristics of the supersonic underexpanded reattached jet for the flow passage with AR = 4.0 are approximately represented by the numerical analysis.
6.2. Shock Cell Size
The jet issued from the nozzle formed a shock cell after expansion and compression; thereafter, while expansion and compression continued, it curved and reattached to the side wall and flowed downstream. Figure 7 shows the size, length C_{L}, and maximum width C_{W} of the first shock cell (Figure 4(a)). The abscissa is P_{0} and P_{0a}/P_{aa}, where P_{0a} and P_{aa} are supply and ambient pressures expressed in the absolute pressure, respectively. The C_{L} was obtained as the distance from the nozzle exit to the position where the measured jet centerline velocity is initially minimal (Figure 11). The C_{W} was obtained from the visualized flow pattern and the density distribution. At that time, the jet boundary was set at the position where the shade suddenly changed in the jet width direction. Both C_{L} and C_{W} increase almost linearly with P_{0}. The numerical analysis is consistent with the experimental results. In addition, the sizes of the second and third shock cells were similar to the first one.
6.3. Centerline of the Jet and Reattached Distance
As mentioned in Section 5.1, the jet centerline can be represented by a circular arc.
Figure 8 shows the radius R of a circular arc, along with the numerical analysis. The centerlines for the numerical analysis and the experimental result when P_{0} = 0.4 MPa were obtained using the leastsquares method by specifying the position of the maximum velocity from the velocity distribution of each jet crosssection. The R increases with P_{0} and is almost constant at R/b = 34.6 after reaching the maximum at P_{0} = 0.4 MPa. Thus, in a supersonic underexpanded reattached jet, the centerline can be approximated by a circular arc. Furthermore, the numerical analysis of R and x_{R} reflects the experimental results accurately for P_{0} ≥ 0.4 MPa. The reattachment distance x_{R}/b, shown in Figure 8 increases with P_{0} and then remains constant at 16.1. However, the numerical calculations for P_{0} = 0.2, 0.3 don’t reflect the experimental results well.
6.4. Pressure Distribution on Side Wall
Figure 9 shows the pressure distribution P_{w}/P_{0} on the side wall for P_{0} = 0.2  0.5 MPa. The jet issued from the nozzle entrains the surrounding fluid owing to the large velocity gradient and the fluid viscosity. When a solid wall exists near the jet, it entrains and removes the fluid from the finite area between the jet and the wall. Consequently, the pressure decreases, and the jet deflects and reattaches, enclosing the circulating separation bubble to the side wall. The pressure P_{w}/P_{0} on the side wall has a negative value corresponding to the separation bubble; it decreases with increasing x/b and reaches a minimum and approaches the ambient pressure. The minimum of the negative value and maximum of P_{w}/P_{0} increase with P_{0}, and are almost the same at P_{0} ≥ 0.4 MPa. This is because increasing the velocity owing to the increase in P_{0} hinders the jet from entraining the surrounding fluid [12], jet flows penetrates. The numerical analysis reflected the experimental well, particularly when P_{0} ≥ 0.3 MPa, that is, when P_{0} is large.
Figure 10 shows the minimum pressure P_{wmin}/P_{0} on the side wall. P_{wmin}/P_{0} decreases with increasing P_{0} and approaches a constant at P_{0} ≥ 0.4 MPa, and the numerical analysis reflects the experiment effectively. In addition, according to Bourque et al. [1], the position x of the minimum pressure on the side wall of a 2D incompressible reattached jet corresponds to the position x of the minimum bubble pressure. This is reflected in the numerical analysis of the supersonic underexpanded reattached jet investigated in this study.
6.5. Pressure Difference between Both Sides of Reattached Jet and Jet Circular Motion
Bourque et al. [1] reported that when a 2D incompressible jet flow reattaches to a side wall set parallel to the nozzle axis at an offset distance, the jet centerline can be approximated to a circular arc of radius R (Figure 2). The relationship between the pressure difference ΔP on both sides of the jet and the centrifugal force exerted on the jet can be expressed as follows, where the inside pressure of the reattached jet is the minimum pressure of the separation bubble.
Δ P = J / R . (1)
where J is the jet momentum.
Equation (1) can be rewritten as
Δ P = ρ 0 Q 2 b H 2 R . (2)
where Q and ρ_{0} are the flow rate and density of air at standard conditions, respectively.
This relationship was investigated for a supersonic underexpanded reattached jet of P_{0} = 0.4 MPa, assuming that the jet momentum was conserved, as in Bourque et al. [1]. Here, because the minimum pressure on the side wall, flow rate, and arc radius were P_{wmin} = 1.58 × 10^{4} [Pa], Q = 58.0 [Nm^{3}/h], and R = 86.5 mm, respectively. Inserting the jet momentum derived from Q and R into Equation (1) yields ΔP = 1.55 × 10^{4} [Pa]. This is almost the same as P_{wmin}, which is reflected in the case of the supersonic reattached jet. Therefore, the relationship shown in Equation (1) holds well.
6.6. Centerline Velocity of Supersonic Reattached Jet
Figure 11 shows the numerical calculations of the centerline velocity u_{c} of the supersonic reattached jet. The abscissa is the angle θ (angle in the circumferential direction with nozzle exit set at θ = 0˚, Figure 2.) when the jet centerline is approximated by a circular arc. The case of experiment for P_{0} = 0.4 MPa is also shown in Figure 11. Based on the numerical results for P_{0} = 0.4 MPa, the jet issues from the nozzle initially expanding and the u_{c} reaches a maximum at θ = 3.25˚ and then decreases by compression to a minimum at θ = 6.0˚. It is assumed that the region from θ = 0˚ to 6.0˚ corresponds to the first shock cell. Thereafter, the u_{c} decays gradually while repeating expansion and compression. The amplitude of the increase/decrease in u_{c} reduces, but the amplitude of u_{c} is moderate. The same is applicable to the second and third shock cells, and their positions θ are almost the same based on numerical analysis and experiment. However, the behavior of velocity u_{c} in the shock cells differs, and the values from the numerical analysis are larger and smaller than those of the experiments in the back and front halves of the shock cell, respectively. The numerical analysis for P_{0} = 0.4 MPa expresses the experimental results qualitatively. However, it does not represent the reality of the experiments. In addition, the maximum of u_{c} and the length of the shock cell increased with P_{0}.
6.7. EquiVelocity Distribution and Velocity Distribution at CrossSection
Figure 12 shows an example of the equivelocity diagram and flow direction for the case, P_{0} = 0.4 MPa. The jet from the nozzle expands and the velocity increases (red colored area), and then compresses and the velocity decreases. The jet flow decreases downstream, while expansion and compression are repeated. The jet reattaches to the side wall, and recirculation flow is in the separation bubble.
Figure 13 shows the experimental results of the velocity distribution u at the crosssections of (a): θ = 3.25˚ in the middle of the compression region; (b): θ = 6.5˚ in the maximum compressed region of the first shock cell; and (c), (d): θ = 12.5˚ and 18.25˚ in the second and third most compressed regions (Figure 12), respectively. The y’ on the vertical axis in Figure 13 is the distance in the radius direction from the centerline of the reattached jet (Figure 2). The crosssectional velocity profile of a supersonic underexpanded jet differs depending on the expansion or compression regions. Kojima, T. et al. [4] showed that the velocity profile in the shock cell of a supersonic underexpanded free jet was concave initially, convex in the middle, and nippleshaped at the end. The velocity profile at θ = 3.25˚ was concave and asymmetric, with a minimum at the jet center, which differs from Kojima’s classification of convex. This could because this jet was a reattached jet, and the pressure on the separation bubble side was negative. The profiles at θ = 6.5˚, 12.5˚, and 18.25˚ are convex at the most compressed the first shock cell is convex, that at θ = 6.5˚ (“1st Com.”) is concave, and those at θ˚ = 12.5˚, 18.25˚ (“2nd and 3rd Com.”) are convex. As shown by the jet centerline velocity in point of the local minimum. Additionally, numerical calculations are
shown in Figure 13. The jet width and range of the numerical results are smaller than those of the experimental results, however, the numerical calculation reflects the approximate distribution of the experiment.
7. Conclusions
In this study, flow characteristics, such as shock cell formations, moving trajectory of reattached centerline approximated by a circular arc, reattachment distance, pressure distribution on a side wall, jet centerline velocity, and velocity
distribution at the crosssection of a 2D supersonic underexpanded jet reattached were studied through experiment and numerical analyses. For numerical analysis, we showed how much it could represent experimental results. The findings are as follows:
1) A supersonic underexpanded jet reattached to the side wall with an offset distance, surrounding the separation bubble region, as in a 2D incompressible reattached jet. Additionally, expansion and compression shock waves and shock cells were formed in this jet.
2) The centerline of a 2D supersonic underexpanded reattached jet can be approximated by a circular arc of radius R, in which R and the reattachment distance x_{R} increased with supply pressure P_{0}. Furthermore, the numerical calculations for supersonic reattached jet represent the experimental results fairly well.
The relationship ΔP = J/R, obtained by assuming that the force owing to the pressure difference ΔP applied to both sides of the jet and the centrifugal force applied to the jet element were balanced, was applicable.
3) The length and width of the shock cell of the supersonic reattached jet increased with P_{0}, and the minimum pressure on the side wall decreased with increasing P_{0}. The numerical calculations represented the experimental outcomes well.
4) The jet centerline velocity fluctuated with its maximum and minimum values according to the expansion and compression of the jet, and the values increased with P_{0}. The numerical calculations for the supersonic reattached jet represented the experimental outcomes fairly well. The experimental and numerical results of the crosssectional velocity distribution and jet width differed a little, however, the numerical calculations represented the experimental results fairly well.
5) The above results for the 2D reattached jet will also be useful in understanding the flow characteristics from a gasatomization nozzle approximately.
Conflicts of Interest
The authors declare no conflicts of interest regarding the publication of this paper.
Cite this paper
Ohmura, T., Shakouchi, T., Fukushima, S. and Tsujimoto, K. (2021) Flow Characteristics of TwoDimensional Supersonic UnderExpanded CoandaReattached Jet. Journal of Flow Control, Measurement & Visualization, 9, 114. https://doi.org/10.4236/jfcmv.2021.91001
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