3.1. Measurement of bubble cloud depth $H$

Figure 2 illustrates the variation of $H$ for the $D_n=2.7$ mm and $D_n=8$ mm nozzles, as a function of $\sqrt {V_iV_n}\,D_n$, which is proportional to the square root of the impact momentum flux, up to a factor of $\rho$, as in (1.2). Note that the largest bubble cloud obtained for our conditions is $45$ cm deep, which is significantly smaller than the tank depth ($1.25$ m). We therefore assume that there is no significant pressure gradient caused by confinement effects in our experiments. The bubble cloud size $H$ for jets issued from the $D_n =2.7$ mm nozzle (red and black discs) varies linearly with $\sqrt {V_iV_n}\,D_n$. This is consistent with the model proposed by Clanet & Lasheras (Reference Clanet and Lasheras1997) (solid line; see (1.1)), since for this small-scale jet and for the experimental range considered here, $V_i\approx V_n$ and $D_i\approx D_n$. When $Z_f/D_n$ is increased for this $D_n =2.7$ mm nozzle, a negligible change in $H$ is observed. For the larger $D_n = 8$ mm nozzle (open symbols), (1.1) predicts accurately the behaviour of $H$ up to $\sqrt {V_iV_n}\,D_n \approx 0.02\ {\rm m}^2\ {\rm s}^{-1}$. Beyond this threshold, a transition occurs, and $H$ scales as $(V_iV_n)^{1/3}D_n^{2/3}$, in accordance with the model of Guyot et al. (Reference Guyot, Cartellier and Matas2020) ($2/3$ power law shown by dashed line). This suggests that beyond a threshold, the buoyancy force becomes dominant over the outgoing momentum flux, leading to a decrease in cloud depth $H$ compared with what (1.1) would predict. Also, figure 2 shows the coexistence of two regimes in a narrow range, $\sqrt {V_iV_n}\,D_n= 0.02$–$0.03$ m$^2$ s$^{-1}$, wherein the inertia-dominated regime occurs for $D_n = 2.7$ mm while buoyancy forces become important for the bigger nozzle diameter. This is perhaps a signature of the dependence of the transition threshold on the void fraction at different jet diameters. Finally, in the buoyancy-dominated zone for $D_n = 8$ mm, some dispersion in the values of $H$ is observed when $Z_f/D_n$ is varied. As mentioned in the Introduction, this dispersion arises from the variations in the net air/water void fraction, as will be discussed in the next subsection.

Figure 2. Variation of $H$ with the square root of the impact momentum $\sqrt {V_iV_n}\,D_n$ for $D_n = 2.7$ and 8 mm at various $Z_f/D_n$. The dotted line shows the trend expected from (1.1). The dashed line shows the $2/3$ scaling law expected at large scales. The inset graph is a blow-up of the $D_n=8$ mm data showing that increasing $Z_f$ at constant impact momentum leads to a decrease in $H$. The data points I–VI correspond to the flow conditions that are compared in § 3.2.

3.2. Local void fraction measurements

The aim of this subsection is to present measurements of the local void fraction $\phi$ within the bubble cloud and discuss them in relation to the bubble cloud size. We discuss first $\phi$ measurements along the jet axis and then radial profiles of $\phi$ at a given depth within the cloud. Finally, general remarks on the void fraction profiles are presented.

3.2.1. Axial measurements

Figure 3(a) presents the air-to-water volume fraction at the jet axis, $\phi (r = 0, z)$, denoted here by $\phi _0$. These measurements correspond to the bubble cloud generated by the $D_n = 2.7$ mm nozzle for two distinct values of jet fall height to diameter ratio $Z_f/D_n$ while maintaining nearly identical impact momentum. The values of $\phi _{0}$ are nearly constant with depth $z$, until they decrease sharply at the end of the cloud, as reported previously by van de Donk (Reference van de Donk1981), McKeogh & Ervine (Reference McKeogh and Ervine1981), Chanson & Manasseh (Reference Chanson and Manasseh2003) and Hoque & Aoki (Reference Hoque and Aoki2008). When $Z_f/D_n$ is increased, a similar axial profile is observed, but $\phi _{0}$ is increased by almost $26\,\%$.

Figure 3. (a) Axial evolution of the void fraction $\phi _0 (z)$ for two different ratios $Z_f/D_n$ at a fixed jet diameter $D_n = 2.7$ mm and $\sqrt {V_iV_n}\,D_n = 0.016\pm 0.0002\ {\rm m}^2\ {\rm s}^{-1}$. Instantaneous images of the freely falling jet just before impact: (b) $Z_f /D_n = 20$; (c) $Z_f /D_n = 50$.

The jet morphology just before impact is illustrated in figure 3(b,c) for $Z_f/D_n = 20$ and $50$, and it shows a slightly larger amplitude of the jet undulations for the larger $Z_f/D_n$ case. Using the algorithm introduced in § 2, we measure that the undulations on the jet surface exhibit roughness $\epsilon = 170\ \mathrm {\mu }{\rm m}$ for figure 3(b) and $\epsilon = 225\ \mathrm {\mu }{\rm m}$ for figure 3(c). As discussed by McKeogh & Ervine (Reference McKeogh and Ervine1981) and Sene (Reference Sene1988), we expect the air entrainment rate and therefore the void fraction to be proportional to the volume enclosed by the corrugations observed on the jet surface. The increase in the size of these undulations is therefore certainly what leads to the increase in void fraction observed in figure 3(a). Supplementary movies 1 and 2 (available at https://doi.org/10.1017/jfm.2023.1019) provide additional visualizations of the jets of figure 3(b,c), respectively (frame rate 300 images s$^{-1}$). These two conditions are indicated by labels I and II in figure 2. They are both situated in the inertia-dominated regime, where buoyancy effects are still negligible. As a result, the effect of the void fraction on $H$ is negligible, even though $\phi$ increases.

3.2.2. Radial measurements

Radial profiles of the void fraction are measured for three nozzle diameters, and two heights of fall, at a constant impact momentum. The radial profiles are taken at depths larger than $4D_i$, in order to ensure that they are in the developed region (Ervine & Falvey Reference Ervine and Falvey1987). Figure 4(a) shows the bubble cloud generated by a jet of nozzle diameter $D_n=2.7$ mm. In comparison, the bubble cloud depth issued from the jet of larger diameter $D_n = 8$ mm, as shown in figure 4(c), is significantly smaller (see also labels III and IV in figure 2). The visualizations of figure 4(a,c) are illustrated more extensively in supplementary movies 3–6. The void fraction profiles for the 2.7 and 8 mm injectors are shown in figure 4(b,d), respectively. They are measured for three different depths. Dispersion in $\phi$ profiles is relatively small in the developed region. These profiles can be well approximated using a Gaussian distribution (solid lines) as previously reported by van de Donk (Reference van de Donk1981). This finding is similar to the case where an air jet is injected into the pool (Kobus Reference Kobus1968; Freire et al. Reference Freire, Miranda, Luz and França2002). When our data are compared with fits based on air/bubble diffusivity and air-to-water volume flux ratio, as in Cummings & Chanson (Reference Cummings and Chanson1997), the best fit was found for an air-to-water entrainment ratio of $\mathcal {O}$(10)! This unrealistic value results perhaps from their constant diffusivity assumption for the advection–diffusion process in the two-phase mixing layer. In our case, and as described by Clanet & Lasheras (Reference Clanet and Lasheras1997), the bubbles are convected by the large-scale eddies dominating the evolution of the submerged jet.

Figure 4. (a,c) Instantaneous pictures of the falling jet just before impact for $D_n = 2.7$ and $8$ mm, respectively, at constant $\sqrt {V_iV_n}\,D_n = 0.028\ {\rm m}^2\ {\rm s}^{-1}$ and $Z_f/D_n = 20$. Corresponding bubble clouds are shown as well. (b,d) The radial variation of $\phi (r, z)$ at three different depths in the bubble cloud, for the $2.7$ mm and $8$ mm jets, respectively.

Note that the maximum void fraction $\phi (r = 0, z)$ is significantly smaller for the thinner jet (up to $18\,\%$ along the axis; see figure 4b) than for the larger jet (up to 27 % in figure 4d). The impact of the nozzle diameter on the maximum void fraction has already been demonstrated by Chanson et al. (Reference Chanson, Aoki and Hoque2004). The larger void fraction, and hence buoyancy force, is consistent with the observation that the bubble cloud is smaller for the larger diameter. Furthermore, this increase in void fraction is very likely caused by the larger length scales associated with the corrugation and its amplitude occurring on the jet surface when the jet diameter $D_n$ is increased at a constant $Z_f/D_n = 20$ and constant impact momentum (Sene Reference Sene1988; Liu, Gao & Hu Reference Liu, Gao and Hu2022). Measurements of $\epsilon$ show that the roughness goes from 225 $\mathrm {\mu }$m for figure 4(b) to 445 $\mathrm {\mu }$m for figure 4(d). These points are indicated by labels III and IV in figure 2. It is clear that III belongs to the momentum-dominated regime, while IV belongs to the buoyancy-dominated regime.

Figure 5 illustrates the influence of a change in the dimensionless jet fall height $Z_f/D_n$, for a constant impact momentum and constant diameter $D_n = 8$ mm. Photographs of the jet before impact show that the jet issued at $Z_f/D_n = 100$ (figure 5c) is more corrugated than that issued at $Z_f/D_n = 20$ (figure 5a), for the same $\sqrt {V_iV_n}\,D_n=0.075\ {\rm m}^2\ {\rm s}^{-1}$. This is corroborated by the data in figure 6, which show the variation of roughness of the jet at impact ($\epsilon$) and the variation of $\bar {\phi }_{0}$, the average over depth of the maximum void fraction measured along the axis, as a function of $\sqrt {V_iV_n}\,D_n$ for different $Z_f$. The data show a strong increase in $\epsilon$ and $\bar {\phi }_{0}$ as $Z_f$ is increased for a constant momentum. The visualizations of figure 5(a,c) are illustrated more extensively in supplementary movies 7–10. The bubble cloud generated below the surface is smaller for the larger $Z_f/D_n$. Again, this is likely due to the fact that this jet captures more air within its cavities during free-fall, leading to a higher $\phi$. This is confirmed by the radial profiles given in figure 5(b,d), which show that $\phi _0$ for $Z_f/D_n = 100$ is approximately $3.2$ times that for $Z_f/D_n = 20$. Note that these cases are referred to by labels V and VI, respectively, in figure 2. They both correspond to the buoyancy-dominated regime. In addition, the inset displayed in figure 2 illustrates a zoomed-in view of the change in $H$ at higher $\sqrt {V_i V_n}\,D_n$, revealing that an increase in $Z_f /D_n$ results in a reduction of ${H}$, with a decrease of approximately 20 % observed when $Z_f /D_n$ is raised from 20 to 100. This ascertains that the observed dispersion for the cloud depth in figure 2 – and also in previous investigations reported in Guyot et al. (Reference Guyot, Cartellier and Matas2020) for this regime, at higher impact momentum and larger diameter – is due to differences in jet fall height.

Figure 5. Images of the $D_n = 8$ mm jet just before impact for (a) $Z_f/D_n = 20$ and (c) $Z_f/D_n =100$, for a constant $\sqrt {V_iV_n}\,D_n = 0.075\ {\rm m}^2\ {\rm s}^{-1}$. Corresponding bubble clouds are shown as well. (b,d) The radial variation of $\phi$ at various depths in the bubble clouds for $Z_f/D_n = 20$ and 100, respectively.

Figure 6. Variation of $\epsilon$ and $\bar {\phi }_{0}$ with $\sqrt {V_iV_n}\,D_n$ for $D_n = 8$ mm, where $\bar {\phi }_{0}$ is the average over depth of the maximum void fraction measured along the axis. Both $\epsilon$ and $\bar {\phi }_{0}$ increase when $Z_f$ is increased for a constant jet momentum.

Finally, general trends of local void fraction profiles are depicted in figure 7 for the case of $D_n = 8$ mm. Each plot presents data at different vertical locations $z$ underneath the surface, normalized with respect to the cloud depth $H$. In all cases shown here, the data fit reasonably well with a Gaussian profile $\phi = \phi _0(z)\,\mbox {e}^{- r^2/\sigma ^2(z)}$ whose peak and width do not vary much as $z/H$ is changed. Plots in figure 7(a) correspond to data for the shortest jet fall height to diameter ratio $Z_f/D_n = 20$ at various $\sqrt {V_iV_n}\,D_n$, a measure of the jet impact momentum up to a factor of liquid density. As $\sqrt {V_iV_n}\,D_n$ increases, the centreline peak void fraction $\phi _0$ slightly decreases, while the width of the best-fitting Gaussian profiles increases. On the other hand, at a given $\sqrt {V_iV_n}\,D_n$, the peak void fraction $\phi _0$ is almost doubled when the jet's fall height is quintupled. In the next subsection, these observations on the air-to-water volume fraction in the biphasic region are developed further to capture properly the effect of buoyancy on the bubble cloud depth.

Figure 7. Measured profiles of air/water void fraction for the nozzle diameter $D_n = 8$ mm and different fall heights (a) $Z_f/D_n = 20$, (b) $Z_f/D_n = 50$ and (c) $Z_f/D_n = 100$, at various values of Q = $\sqrt {V_iV_n}\,D_n$. Gaussian fits are represented by continuous lines.

3.3. Prediction of bubble cloud depth

Guyot et al. (Reference Guyot, Cartellier and Matas2020) proposed a prediction for the bubble cloud depth $H$ via (1.2) by assuming a uniform void fraction within the bubble cloud and a constant cone angle $\gamma$, based on single-phase turbulent jets. As mentioned earlier, the void fraction in the biphasic jet underneath the free surface can be well approximated by a Gaussian profile. These profiles are characterized by a maximum void fraction $\phi _0(z)$ on the axis and a variance $\sigma (z)$. It is then easy to show that the buoyancy force on a slice of bubble cloud of thickness ${\rm d}z$ at depth $z$ is ${\rm d}F_b = \phi _{0}(z)\,\rho g {\rm \pi}\,\sigma (z)^2 \,{\rm d}z$. We take $\phi _0(z)$ to be equal to its average value $\bar {\phi }_{0}$, since the peak void fraction $\phi _0(z)$ exhibits little variation with depth $z$, as already shown in figures 3–5. It now remains to provide $\sigma (z)$ in order to integrate this buoyancy force over $z$.

Indeed, it is expected that $\sigma (z)$ increases linearly with depth as the bubble cloud widens up as a cone, as evidenced by visualization and previous observations (Suciu & Smigelschi Reference Suciu and Smigelschi1976; McKeogh & Ervine Reference McKeogh and Ervine1981; Clanet & Lasheras Reference Clanet and Lasheras1997; Guyot et al. Reference Guyot, Cartellier and Matas2020). We propose to measure the angle of this cone based on the experimental void fraction profiles. However, rising bubbles can be detected outside the conical jet region by the optical probe. This may lead to overestimation of the width of the void fraction profiles and hence the resulting buoyancy force on the bubble cloud. This is particularly true for the measurements at shallower depths, $z < 0.5H$, a problem also encountered by van de Donk (Reference van de Donk1981). In order to circumvent this difficulty, the conical jet hypothesis is maintained in accordance with previous authors so that $\sigma (z) = D_i/2+ z \tan \gamma _{0}$, where the cone angle $\gamma _0$ is computed as $\tan \gamma _{0} = (\sigma (\tilde {z}) - D_i/2 ) /\tilde {z}$ at a chosen reference depth $\tilde {z} = 0.8 H$. The latter depth was chosen to avoid both rising bubbles and the steep decrease in bubble void fraction in the neighbourhood of the cloud's tail at $z = H$.

Thereby, the net buoyancy force $F_b$ on the bubble cloud of depth $H_b$ can then be expressed as

(3.1)\begin{equation} F_b = \bar{\phi}_{0} \rho g {\rm \pi}\left( {\frac{1}{3}}\,H_b^3 \tan^2 \gamma_{0} + {\dfrac{D_i}{2}}\, H_b^2 \tan \gamma_{0} + {\dfrac{D_i^2}{4}}\,H_b \right)\!, \end{equation}

which is identical to the volume term in (1.2) if $\bar {\phi } = \bar {\phi }_{0}$ and $\gamma = \gamma _{0}$. The above expression indicates that the buoyancy force on a conical biphasic jet exhibiting a Gaussian void fraction profile can be interpreted as the buoyancy force exerted on an equivalent biphasic jet with a constant void fraction $\bar {\phi }$ equal to the maximum void fraction $\bar {\phi }_{0}$ of the Gaussian profile and with a width defined by the variance of the Gaussian profile at some reference depth, here chosen at $z = 0.8H$. This buoyancy force $F_b$ can now be injected into the momentum balance equation (1.2) in order to solve for $H_b$. The value of $\bar {\phi }$ in the outgoing momentum term can be taken equal to $\bar {\phi }_{0}$ for the sake of simplicity.

Experimental depths $H$ from the present study and predictions $H_b$ are compared in figure 8(a) for the different nozzle sizes and jet fall heights. Good agreement is found between the model and measurements for both the inertia-controlled bubble clouds ($D_n = 2.7$ mm) and the buoyancy-controlled ($D_n = 8$ mm and 10 mm) ones. A measurement for nozzle diameter $D_n=10$ mm (same length-to-diameter ratio 50), $V_n=5.5\ {\rm m}\ {\rm s}^{-1}$ and $Z_f/D_n=50$ has been included in the data for this figure. For comparison, two previous investigations, namely, those conducted by van de Donk (Reference van de Donk1981) and McKeogh & Ervine (Reference McKeogh and Ervine1981), are presented in figure 8(a) as well. They provided both $H$ measurements and radial profiles of $\phi$ for jets with diameters of $D_n = 6$ and $9$ mm. The calculated $H_b$ values based on their measurements show very good consistency with the model.

Figure 8. (a) Comparison of the experimental depth $H$ with values predicted by the model $H_b$. (b) Normalized depth $H/H_i$ at various values of $Fr$ for injectors from current and past studies whose void fraction is known. Equation (3.2) is represented by the continuous line.

In what follows, the question of the role of the void fraction in the transition from the inertia-dominated to the buoyancy-dominated regime is discussed. This transition is expected to be dominated by the ratio of the outgoing momentum to the buoyancy force, respectively the second and third terms in (1.2). The square root of the ratio of these terms defines a dimensionless grouping similar to a Froude number, given by $Fr = \sqrt {3( 1-\bar {\phi }_{0} )/\bar {\phi }_{0}}\,U_t/\sqrt {g H_b}$. In fact, when the nozzle diameter is small relative to the cloud width $2 H_b \tan \gamma _0$, the cubic polynomial for $H_b$ in (1.2) can be rewritten in terms of $Fr$ as

(3.2)\begin{equation} \dfrac{H_b}{H_i} = \dfrac{Fr}{\sqrt{1 + Fr^2}} + \mathcal{O}\left( \dfrac{D_i}{2 H_b \tan \gamma_0}\, Fr^2\right)\!, \end{equation}

where $H_i$ is the cloud depth when the buoyancy force is absent, as given by (1.1). When $Fr$ is large, we expect the cloud to be in the inertia-dominated regime and hence $H_b$ to be close to $H_i$, the simple prediction by Clanet & Lasheras (Reference Clanet and Lasheras1997). When, on the contrary, $Fr$ is small, $H$ is expected to be controlled by buoyancy and hence to be significantly smaller than $H_i$. Figure 8(b) illustrates the variation of $H/H_i$ with $Fr$ for data from figure 8(a). Indeed, all experimental data points fall on a single curve given by (3.2), for which $H/H_i$ falls steeply when $Fr$ is decreased. For a constant velocity, using larger nozzles will lead to bigger bubble clouds, thus larger $H$ and smaller $Fr$, thereby favouring the buoyancy-dominated regime. Note also that the influence of jet velocity is counterintuitive here, since a larger jet velocity for a given nozzle diameter will generate a larger $H$ and therefore also favour the buoyancy-dominated regime, instead of the inertial regime. This is because the relevant velocity scale in $Fr$ is the terminal bubble velocity $U_t$, which is a constant, and not the jet impact velocity. Note that (3.2) is obtained from (1.2) by assuming $\bar {\phi } = \bar {\phi }_{0}$ and $\gamma = \gamma _{0}$. This choice simplifies the expression of the Froude number, but obviously underestimates the jet angle and mean void fraction in the inertial contribution. This is partly the reason why $H/H_i$ does not reach the limit $H/H_i = 1$ in figure 8(b), even for data points that corresponded to the inertia-dominated regime in figure 2. Furthermore, previous authors have proposed adding a hemispherical dome to the truncated cone modelling the bubble cloud, as in figure 1 (Clanet & Lasheras Reference Clanet and Lasheras1997; Guyot et al. Reference Guyot, Cartellier and Matas2020). This small correction would introduce a factor of $1 + \tan \gamma _0$ (of the order of 10 %) to both the modelled heights $H_i$ and $H_b$, but it is not considered in the present data for the sake of simplicity.

For most studies for which bubble cloud depths data are available, the void fraction has not been measured concomitantly. We plot in figure 9(a) $H$ as a function of $\sqrt {V_iV_n}\,D_n$, the square root of the impact momentum over the liquid density $\rho$, for five past studies covering a wide range of scales, plus the present data. The scaling laws observed in figure 2 for the inertia-dominated and buoyancy-dominated regimes can be observed in the limits of low momentum and large momentum, respectively. The void fraction is not known for these past works, but we can still estimate the bubble cloud Froude number as $Fr^* = U_t/\sqrt {gH}$. Figure 9(b) shows that when $H/H_i$ is plotted as a function of $Fr^*$ for several past studies, the cloud sizes are clearly sorted into two regimes: (i) one for larger $Fr^*>0.2$, for which $H/H_i$ is close to 1 and for which there is little dispersion; and (ii) a second regime for $Fr^*<0.2$ where $H/H_i$ varies between $0.15$ and $0.5$, and for which significant dispersion is obtained. This dispersion is very likely due to the role of the void fraction, which has been omitted in $Fr^*$. These observations ascertain further that $Fr$ is a good parameter for monitoring the transition between the inertia-dominated and buoyancy-dominated regimes.

Figure 9. (a) Bubble cloud depth ($H$) data from previous investigations are presented here as a function of $\sqrt {V_iV_n}\,D_n$, a measure of the impact momentum, to illustrate the two distinct dynamical regimes identified in our study over a wide range of scales. (b) When the void fraction is not known, $Fr^*$ can still sort past experiments into inertia- or buoyancy-dominated regimes, even though more dispersion is observed.

3.4. Equivalent bubble cloud void fraction $\phi _{b}$

Whereas Guyot et al. (Reference Guyot, Cartellier and Matas2020) took a uniform void fraction within the cloud to express the momentum balance, $\phi$ profiles were observed here to follow a Gaussian distribution in the radial direction. In this subsection, an equivalent constant void fraction $\phi _{b}$ is proposed in order to provide a bulk quantity for a bubble cloud and to discuss its variations with the jet fall height and impact momentum. At first, for a fixed depth $z$, the edge of this constant-void-fraction cone of bubble cloud is defined by assuming that its radius $R_{b}(z)$, beyond which the void fraction becomes zero, is the radius at which $80\,\%$ of the surface-integrated void fraction is attained based on a Gaussian profile $\phi = \bar {\phi }_0(z)\, {\rm e}^{-r^2/\sigma (z)^2}$. This simply gives the relation $R_{b}(z) = \sigma (z)\,\sqrt {\log {5}} \approx 1.27 \sigma$. Thereafter, in order to avoid overestimation of the bubble cloud volume due to rising bubbles, the truncated cone angle $\gamma _{b}$ for this constant-void-fraction cloud is taken as $\tan \gamma _{b} = (\tilde {R}_{b}- D_i/2)/\tilde {z}$, where $\tilde {R}_{b} \approx 1.27\, \sigma (\tilde {z})$ is this cloud's radius at the reference depth $\tilde {z} = 0.8H$. As already mentioned in § 3.3, the influence of rising bubbles is minimal at the reference depth $\tilde {z} = 0.8H$, measured close to the bottom of the cloud, while the peak void fraction ${\phi }_0$ is still comparable to those obtained in the bulk. Finally, the equivalent void fraction $\phi _b$ is then computed such that the net buoyancy force is the same on both the uniform-void-fraction cloud and the Gaussian-void-fraction cloud.

Figure 10(b,d) depict the evolution of this equivalent void fraction $\phi _{b}$ as a function of $Z_f/D_n$, for different values of impact momentum (represented by the colour) for the two injectors. Experimental results show that $\phi _{b}$ increases steeply for both injectors as $Z_f/D_n$ increases, as already illustrated in figure 5 for a particular case. As mentioned in § 3.2.2, this is likely due to the jet's capacity to entrain more air once perturbations have grown larger on its surface for higher fall heights $Z_f$ (Sene Reference Sene1988). These plots also show that $\phi _{b}$ decreases for a constant $Z_f/D_n$ as the impact momentum is increased, in particular for low $Z_f/D_n$.

Figure 10. (a) Definition of $\phi _{b}$ and $R_{b}$. (b–e) Variation of $\phi _{b}$ and $\gamma _{b}$ with $Z_f/D_n$ for the two injector sizes at various impact momentum values. Two colour bars are provided for the two ranges of $\sqrt {V_iV_n}\,D_n$, corresponding to both $D_n$ values.

Figure 10(c,e) illustrate the variations of the cone angle $\gamma _{b}$ of the equivalent constant-$\phi$ jet with respect to $Z_f/D_n$, for different $\sqrt {V_iV_n}\,D_n$. Results for both nozzles show that $\gamma _{b}$ decreases with $Z_f/D_n$ for a constant impact momentum. This change in the bubble cloud shape may be related to the strong increase in the amplitude of surface perturbations at larger $Z_f$, and to the larger void fractions observed for these conditions ($\phi _0$ up to $50\,\%$ for $Z_f/D_n = 100$, compared with $20\,\%$ for $Z_f/D_n = 20$). The simple assumptions made regarding the shape of the bubble cloud, which are valid at moderate void fractions, probably no longer hold in such conditions.