Hostname: page-component-cd9895bd7-q99xh Total loading time: 0 Render date: 2024-12-23T13:00:49.132Z Has data issue: false hasContentIssue false

Estimating the non-dimensional energy of vortex rings by modelling their roll-up

Published online by Cambridge University Press:  20 April 2022

Guillaume de Guyon
Affiliation:
Institute of Mechanical Engineering, École Polytechnique Fédérale de Lausanne, 1015 Lausanne, Switzerland
Karen Mulleners*
Affiliation:
Institute of Mechanical Engineering, École Polytechnique Fédérale de Lausanne, 1015 Lausanne, Switzerland
*
Email address for correspondence: [email protected]

Abstract

The non-dimensional energy of starting vortex rings typically converges to values around 0.33 when they are created by a piston-cylinder or a bluff body translating at a constant speed. To explore the limits of the universality of this value and to analyse the variations that occur outside of those limits, we present an alternative approach to the slug-flow model to predict the non-dimensional energy of a vortex ring. Our approach is based on the self-similar vortex sheet roll-up described by Pullin (J. Fluid Mech., vol. 88, 1978, pp. 401–430). We derive the vorticity distribution for the vortex core resulting from a spiralling shear layer roll-up and compute the associated non-dimensional energy. To demonstrate the validity of our model for vortex rings generated through circular nozzles and in the wake of disks, we consider different velocity profiles of the vortex generator that follow a power law with a variable time exponent $m$. Higher values of $m$ indicate a more uniform vorticity distribution. For a constant velocity ($m=0$), our model yields a non-dimensional energy of ${{E}^{{*}}}=0.33$. For a constant acceleration ($m=1$), we find ${{E}^{{*}}}=0.19$. The limiting value $m \rightarrow \infty$ corresponds to a uniform vorticity distribution and leads to ${{E}^{{*}}}=0.16$, which is close to values found in the literature for Hill's spherical vortex. The radial diffusion of the vorticity within the vortex core results in the decrease of the non-dimensional energy. For a constant velocity, we obtain realistic vorticity distributions by radially diffusing the vorticity distribution of the Pullin spiral and predict a decrease of the non-dimensional energy from 0.33 to 0.28, in accordance with experimental results. Our proposed model offers a practical alternative to the existing slug flow model to predict the minimum non-dimensional energy of a vortex ring. The model is applicable to piston-generated and wake vortex rings and only requires the kinematics of the vortex generator as input.

Type
JFM Rapids
Creative Commons
Creative Common License - CCCreative Common License - BY
This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (https://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution, and reproduction in any medium, provided the original work is properly cited.
Copyright
© The Author(s), 2022. Published by Cambridge University Press

1. Introduction

The vorticity distribution within a vortex ring can be quantified by its non-dimensional energy ${{E}^{{*}}}=E/\sqrt {I \varGamma ^{3}}$, where $E$ and $I$ are the energy and impulse per unit of mass, and $\varGamma$ the circulation of the vortex. Vortices with a uniform vorticity distribution, such as Hill's spherical vortex (Hill Reference Hill1894), can have a non-dimensional energy as low as ${{E}^{{*}}}=0.16$. Vortices with a concentrated core of vorticity reach higher non-dimensional energy (Friedman & Turkington Reference Friedman and Turkington1981). Vortex rings are often produced by ejecting a volume of fluid through a circular nozzle. If the ejection velocity is constant, the non-dimensional energy of the generated vortex converges to values ranging from 0.27 to 0.35 (Gharib, Rambod & Shariff Reference Gharib, Rambod and Shariff1998; Mohseni, Ran & Colonius Reference Mohseni, Ran and Colonius2001; Danaila & Hélie Reference Danaila and Hélie2008; Limbourg & Nedić Reference Limbourg and Nedić2021a). The non-dimensional energy of vortex rings that are produced in the wake of disks or cones translating at a constant speed also converges towards ${{E}^{{*}}} \approx 0.3$ (Yang, Jia & Yin Reference Yang, Jia and Yin2012; de Guyon & Mulleners Reference de Guyon and Mulleners2021). The main topological difference between the formation of propulsive vortex rings through a circular nozzle or drag vortex rings behind a translating object is the location of the feeding shear layer with respect to the main axis of symmetry. The shear layer that feeds propulsive vortices is located close to the axis of symmetry, and propulsive vortices are basically fed from the inside. Drag vortices are fed from the outside as these vortices form in the wake of bluff bodies and the shear layer is located at the edge of the body. Despite this fundamental difference in the feeding of propulsive and drag vortices, they reach similar non-dimensional energy values and vorticity distributions.

The main factors that influence the vorticity distribution of vortex rings are the velocity profile in the nozzle and the diffusive effects in the vortex. The results cited above were obtained for Reynolds number above 2000. For these Reynolds numbers, the flow in the nozzle is considered turbulent and the velocity profile across the nozzle diameter is rather uniform. The more uniform the velocity profile across the outlet, the thinner the shear layer between the nozzle jet and the outer fluid. This typically leads to vortex rings with a concentrated core of vorticity and a non-dimensional energy ${{E}^{{*}}} >0.25$. For laminar flows, the velocity profile is parabolic and the non-dimensional energy decreases below 0.2 (Rosenfeld, Rambod & Gharib Reference Rosenfeld, Rambod and Gharib1998; Kaplanski, Fukumoto & Rudi Reference Kaplanski, Fukumoto and Rudi2012).

A few convective times after the emergence of the vortex ring, its self-induced velocity exceeds the velocity of the shear layer that feeds it, and the vortex separates or pinches off (Shusser & Gharib Reference Shusser and Gharib2000). After vortex pinch-off, the circulation ceases to increase and the vorticity distribution remains constant at first, before diffusion becomes effective. The non-dimensional time or stroke ratio at which the vortex separates is referred to as the vortex formation number. The formation number refers to a limiting formation time above which an isolated vortex ring cannot be formed. The formation number of a vortex ring can be altered by progressively varying the fluid velocity at the exit of the nozzle (Mohseni et al. Reference Mohseni, Ran and Colonius2001; Dabiri & Gharib Reference Dabiri and Gharib2005; Shusser et al. Reference Shusser, Rosenfeld, Dabiri and Gharib2006). As the nozzle velocity increases in time, the shear layer velocity increases and remains higher than the vortex self-induced velocity for a longer time, increasing its formation number. During the longer formation process, the circulation is distributed more uniformly within the vortex core region, yielding a lower non-dimensional energy. Higher formation numbers are thus associated with lower values of E* and vice versa. With a velocity programme that increases linearly in time, a piston–cylinder apparatus can create vortex rings with a non-dimensional energy ${{E}^{{*}}}$ between 0.17 and 0.22 (Mohseni et al. Reference Mohseni, Ran and Colonius2001; Dabiri & Gharib Reference Dabiri and Gharib2005).

The most commonly used procedure to estimate the vortex formation number relying on the piston temporal velocity profile is based on the slug-flow model (Mohseni & Gharib Reference Mohseni and Gharib1998; Shusser, Gharib & Mohseni Reference Shusser, Gharib and Mohseni1999; Linden & Turner Reference Linden and Turner2001; Krieg & Mohseni Reference Krieg and Mohseni2021; Limbourg & Nedić Reference Limbourg and Nedić2021b). The slug-flow model predicts the invariants of the fluid injected in the system based on the nozzle geometry and the piston velocity. It assumes that the bulk of fluid ejected from the nozzle has a spatially uniform velocity profile. Based on the predicted values of the circulation, impulse and energy of the ejected fluid from the slug-flow model, we can calculate the translation velocity $U$ of a generated vortex ring using the thin core approximation (Saffman Reference Saffman1975):

(1.1)\begin{equation} U = \frac{E}{2I} + \frac{3}{8} \sqrt{\frac{\varGamma^{3}}{{\rm \pi} I}}. \end{equation}

The formation number can now be identified as the formation time at which the vortex translational velocity exceeds the velocity of the shear layer that feeds it. This is a purely kinematic argument for vortex pinch-off. It requires an accurate estimate of the shear layer velocity. A rough approximation is to consider the shear layer velocity to be half of the piston velocity, which leads to a slightly underestimated formation number of 3. More accurate approximations have been performed based on the spatial velocity profile at the nozzle exit and the contraction ratio of the starting jet (Weigand & Gharib Reference Weigand and Gharib1997; Limbourg & Nedić Reference Limbourg and Nedić2021b). This procedure for estimating the formation number is known as the asymptotic matching procedure and was recently reviewed and extended for application to orifice-generated vortices by Limbourg & Nedić (Reference Limbourg and Nedić2021c). The kinematic argument for vortex pinch-off is only suitable for propulsive vortices, which move away from the region where they are created. Vortex rings that form in the wake of a bluff body have a self-induced velocity that allows them to follow the body even beyond their formation number (de Guyon & Mulleners Reference de Guyon and Mulleners2021).

To identify the formation number and the minimal value of the non-dimensional energy for both propulsive and drag vortices, we revert to the energetic argument for vortex pinch-off. According to the Kelvin–Benjamin variational principle, we can identify the formation number as the formation time at which the non-dimensional energy of the fluid injected in the system falls below the non-dimensional energy of the vortex ring (Benjamin Reference Benjamin1976; Gharib et al. Reference Gharib, Rambod and Shariff1998). The non-dimensional energy of the fluid injected to create propulsive vortices is again estimated using the slug-flow model. For a piston moving at a constant velocity, Shusser & Gharib (Reference Shusser and Gharib2000) found a value of ${{E}^{{*}}}=0.31$ at vortex pinch-off. The same authors extended their analysis to situations where the temporal evolution of the piston velocity follows a power law (Shusser et al. Reference Shusser, Gharib and Mohseni1999). When the piston velocity profile is given by $u(t) \propto t^{m}$, with $m\geq 0$, vortices are generated with a non-dimensional energy of

(1.2)\begin{equation} {{E}^{{*}}}=\frac{3}{4 \sqrt{\rm \pi}} \frac{2m+1}{4m+1}. \end{equation}

The results of the slug-flow model for E* are in good agreement with experimental data for propulsive vortex rings (Shusser et al. Reference Shusser, Gharib and Mohseni1999). But the slug-flow model is not able to describe the non-dimensional energy of the fluid injected in vortex rings forming in the wake of bluff bodies, as the volume and the velocity of the fluid injected in the drag vortices are not known a priori.

Here, we propose a different approach to estimate the minimum non-dimensional energy of vortex rings. We specifically build upon the work of Pullin (Reference Pullin1978). Pullin studied the roll-up of a shear layer that is created at the tip of a semi-infinite object that is translated from rest by different velocity profiles $u(t) \propto t^{m}$. By modelling the self-similar roll-up of the vortex sheet, Pullin derived the temporal growth of the vortex circulation. For $m=0$, the circulation of the vortex grows with $t^{{1}/{3}}$ and its radius with $t^{{2}/{3}}$. Although this model was developed for two-dimensional flows, it matches experimental observations on vortex rings (Maxworthy Reference Maxworthy1977; Pullin Reference Pullin1979). Nitsche & Krasny (Reference Nitsche and Krasny1994) present numerical simulations of the roll-up of a shear layer into a vortex ring and confirm that Pullin's asymptotic analysis can indeed be extended to vortex rings and yield correct predictions of the vortex radius. To predict the resulting non-dimensional energy of vortex rings, we adopt Pullin's model to derive the vorticity distribution within the vortex core. We demonstrate that the current approach is valid for vortex rings generated through circular nozzles and in the wake of disks.

2. Pullin's spiral and its integral quantities

The roll-up of a shear layer past translating or rotating semi-infinite flat plates exhibits self-similar behaviour (Kaden Reference Kaden1931; Pullin Reference Pullin1978; Lepage, Leweke & Verga Reference Lepage, Leweke and Verga2005; Xu & Nitsche Reference Xu and Nitsche2014; Pullin & Sader Reference Pullin and Sader2020; Francescangeli & Mulleners Reference Francescangeli and Mulleners2021). Here, we focus our attention on parallel shear layers emanating from a piston–cylinder vortex generator or in the wake of a translating disk. The main parameter governing the roll-up is the velocity profile of the piston or of the disk, given by $u(t) \propto t^{m}$. If $m=0$, the object moves with a constant speed. If $m=1$, the object moves with a constant acceleration. The vortex behind a disk (figure 1a) and the vortex at the exit of the circular nozzle (figure 1b) both originate from the roll-up of a shear layer into a spiral. The drag vortex behind the disk is fed by the shear layer from the outside, whereas the propulsive vortex at the nozzle exit is fed by the shear layer from the inside. The vortex core is characterised in a local polar coordinate system $(s,\theta )$, centred on the spiral point (figure 1c). The vortex core coordinates are related to the original cylindrical coordinates $(x,r)$ by

(2.1a,b)\begin{equation} x=s R \sin \theta \quad \text{and} \quad r=L+sR\cos \theta, \end{equation}

with $L$ the distance from the centre of the spiral to the $x$-axis and $R$ the radius of the vortex core. The coordinate $s$ is the radial coordinate relative to the core radius $R$. Pullin derived an asymptotic solution for the circulation within a circular region of radius $s$ centred on the spiral:

(2.2)\begin{equation} \varGamma\left(s\right) = \dfrac{2 {\rm \pi}{{\omega}_{{0}}} R^{2}}{p} s^{p}, \end{equation}

with

(2.3)\begin{equation} p=2-\dfrac{3}{2(1+m)}, \end{equation}

and ${{\omega }_{{0}}}$ a reference vorticity. The circulation follows a radial power law distribution with an exponent $p$ that can range between 0.5 and 2. The vorticity distribution corresponding to this circulation is given by

(2.4)\begin{equation} \omega(s)=\begin{cases} {{\omega}_{{0}}} s^{p-2} & \text{if } s\leq 1,\\ 0 & \text{if } s> 1. \end{cases} \end{equation}

We now compute the non-dimensional energy associated with this distribution. The non-dimensional energy is defined as

(2.5)\begin{equation} {{E}^{{*}}}=\dfrac{E}{\sqrt{I\varGamma^{3}}}, \end{equation}

with

(2.6ac)\begin{equation} E= {\rm \pi}\iint_{\mathcal{D}}\psi \omega ,\quad I = {\rm \pi}\iint_{\mathcal{D}} \omega r^{2} ,\quad \varGamma = \iint_{\mathcal{D}} \omega. \end{equation}

Here, $\mathcal {D}$ is the disk of radius $R$ centred on the vortex core (figure 1c). The integration of the circulation and impulse associated with the vorticity distribution (2.3) leads to

(2.7a,b)\begin{equation} \varGamma = \dfrac{2 {\rm \pi}{{\omega}_{{0}}} R^{2}}{p} \quad {{\rm and}}\quad I=\dfrac{{{\omega}_{{0}}} {\rm \pi}^{2} R^{4}}{p}\left(\dfrac{2}{\varepsilon^{2}}+\dfrac{p}{p+2} \right). \end{equation}

The energy is expressed as a function of the stream function $\psi$,

(2.8)\begin{equation} \psi(x,r) = \iint_{\mathcal{D}}G(x,r,x',r')\,\omega(x',r')\,{\rm d}{x'} \,{\rm d}{r'} , \end{equation}

with $G$ the Green function

(2.9)\begin{equation} G(x,r,x',r')=\dfrac{\sqrt{rr'}}{2 {\rm \pi}}\left[\left(\dfrac{2}{k}-k\right)K(k)-\dfrac{2}{k}E(k)\right], \end{equation}

and

(2.10)\begin{equation} k^{2}=\dfrac{4rr'}{\left(x-x'\right)^{2}+\left(r+r'\right)^{2}} . \end{equation}

The relative vortex core radius is defined as $\varepsilon =R/L$. Pullin's model was initially derived for the roll-up of a vortex sheet that develops near the edge of a semi-infinite plate or wing which corresponds to $\varepsilon \rightarrow 0$. Through numerical simulations, it was shown that Pullin's asymptotic analysis can be extended to vortex rings where $\varepsilon =1$ (Nitsche & Krasny Reference Nitsche and Krasny1994). The self-similar roll-up of the vortex sheet seems to be minorly affected by the geometric constraint as most of the vorticity in the core is concentrated in a viscous sub-core that is much smaller than the main vortex core (Pullin Reference Pullin1979).

Figure 1. Representation of vortex rings by the roll-up of a shear layer in cylindrical coordinates $(x,r)$. Vortex rings forming (a) behind a disk, or (b) at the exit of a circular nozzle. (c) Sketch and definition of the parameters used to model the vortex ring.

A non-dimensional Green function $\mathcal {G}_{\varepsilon }$, depending on $\varepsilon$, is defined as a function of the polar coordinates $s$ and $\theta$:

(2.11)\begin{equation} G(x,r,x',r')=R \mathcal{G}_{\varepsilon}(s,\theta,s',\theta'). \end{equation}

We now define the non-dimensional integral ${\mathcal {I}}_{\varepsilon,p}$,

(2.12)\begin{equation} {{\mathcal{I}}_{{$\varepsilon,p$}}}=\int^{1}_0 \int^{1}_0 \int^{2 {\rm \pi}}_0 \int^{2{\rm \pi}}_0 \left(ss'\right)^{p-1} \mathcal{G}_{\varepsilon}(s,\theta,s',\theta') \,{\rm d}{s} \,{\rm d}{s'} \,{\rm d}{\theta} \,{\rm d}{\theta'}, \end{equation}

and use it to express the energy:

(2.13)\begin{equation} E={\rm \pi} {{\omega}_{{0}}}^{2} R^{5} \,{{\mathcal{I}}_{{$\varepsilon,p$}}} . \end{equation}

The non-dimensional energy is derived from (2.7a,b) and (2.13):

(2.14)\begin{equation} {{E}^{{*}}}=\dfrac{p^{2}}{2 {\rm \pi}\sqrt{2 {\rm \pi}} }\left(\dfrac{2}{\varepsilon^{2}}+\dfrac{p}{p+2}\right)^{{-1}/{2}} \,{{\mathcal{I}}_{{$\varepsilon,p$}}} \quad . \end{equation}

This relationship depends only on the relative core radius $\varepsilon$ and the parameter $p$, which is directly related to the velocity profile of the incoming flow. The integral $\mathcal{I}_{\varepsilon,p}$ is computed numerically.

The evolution of the non-dimensional energy as a function of the relative core radius is presented in figure 2, for different flow velocity profiles. With a relative core radius $\varepsilon =1$, the vorticity spreads to the axis of symmetry. Yet, for low values of $m$, the majority of the vorticity remains concentrated near the centre of the vortex, in a viscous sub-core region that is an order of magnitude smaller than the overall core radius. This is a characteristic feature of most experimentally observed vorticity distributions, which are often fitted with Gaussian profiles (Weigand & Gharib Reference Weigand and Gharib1997). For larger values of $m$, the distribution becomes smoother and ultimately reaches uniformity for $m\rightarrow \infty$. Such uniform distributions are nearly impossible to produce experimentally, but they can be compared to theoretical distributions such as those corresponding to the Norbury family of vortices.

Figure 2. (a) Non-dimensional energy as a function of the relative core radius for different velocity profiles described by $u(t)\propto t^{m}$. (b) Non-dimensional energy as a function of $m$ according to (1.2).

A vortex ring behind an axisymmetric object cannot grow beyond $\varepsilon =1$, and the minimum non-dimensional energy ${{E}_{\varepsilon =1}^{*}}$ is reached at this limit. For a constant velocity ($m=0$), we compute ${{E}_{\varepsilon =1}^{*}=0.328}$. Experimentally, ${{E}^{{*}}}$ converges to approximately $0.3$ when the vorticity spreads to the axis of symmetry for ring vortices created by constant-velocity jets or behind cones translating with constant velocity (Gharib et al. Reference Gharib, Rambod and Shariff1998; de Guyon & Mulleners Reference de Guyon and Mulleners2021). For a constant acceleration ($m=1$), ${{E}_{\varepsilon =1}^{*}=0.187}$, which is in the range of the values measured by Dabiri & Gharib (Reference Dabiri and Gharib2005) and Mohseni et al. (Reference Mohseni, Ran and Colonius2001). When $m$ tends to infinity, the vorticity distribution becomes uniform and ${{E}_{\varepsilon =1}^{*}=0.16}$, which is the non-dimensional energy associated with Hill's spherical vortex. For comparison, using the slug-flow model (1.2), ${{E}^{{*}}}=0.21$ when $m\rightarrow \infty$. The non-dimensional energy obtained with (1.2) overestimates ${{E}^{{*}}}$ by approximately 30 % for all values of $m$, because of inaccurate assumptions on the shear layer velocity. Both the slug-flow model and our Pullin’s-spiral-based model predict a value of ${{E}^{{*}}}$ for $m=0$ that is twice the value of ${{E}^{{*}}}$ for $m=\infty$. This is an interesting result given that each model has a different approach. The presented model thus provides an accurate approximation of the non-dimensional energy for both propulsive and drag vortices, regardless of any assumption on the shear layer velocity.

3. Diffusion of the Pullin distribution

The vorticity distribution that we derived in the previous section is valid for inviscid flows and is not representative of true vorticity distributions. The inviscid vorticity distribution $\omega (s)={{\omega }_{{0}}} s^{p-2}$ (2.4) has a singularity at the vortex centre $s=0$, as the exponent $p-2$ is negative (2.3). The vorticity is also discontinuous at $s=1$ by construction (2.4). To estimate the influence of viscosity, we propose here to radially diffuse the vorticity. The vorticity is highly concentrated near the vortex centre in a viscous sub-core that is an order of magnitude smaller than the full core size (Pullin Reference Pullin1979). As a consequence, diffusion dominates convection in the sub-core for a vortex ring with $\varepsilon =1$, and the vorticity transport equation can be approximated by the two-dimensional equation

(3.1)\begin{equation} \dfrac{\partial \omega}{\partial t}=\dfrac{\nu}{R^{2}} \dfrac{1}{s} \dfrac{\partial}{\partial s}\left(s \dfrac{\partial \omega}{\partial s} \right) \end{equation}

with the boundary conditions

(3.2)\begin{gather} \left.\dfrac{\partial \omega}{\partial s}\right|_{\substack{s=0}}=0, \end{gather}
(3.3)\begin{gather}\omega(s=1)=0. \end{gather}

The diffusion is integrated numerically during a non-dimensional diffusion time $\sigma =\sqrt {\nu t}/R$ with $\nu$ the kinematic viscosity of the fluid and $t$ the time. Note that we are not considering the initial growth of the vortex ring, which is primarily dominated by convective time scales (de Guyon & Mulleners Reference de Guyon and Mulleners2021). Instead, we consider only the vorticity distributions corresponding to $\varepsilon =1$, as it is the limiting value of the vortex formation process. The non-dimensional quantity $\sigma$ should not be interpreted as a non-dimensional diffusion time but rather as the relative size of the viscous sub-core with respect to the ring size. It is a measure for the centre region that contains the majority of the vorticity distributed within the vortex core. The diffused vorticity profiles for different values of $\sigma$ and the corresponding evolution of the non-dimensional energy are presented in figure 3. Overall, the maximum vorticity in the vortex centre decreases and the vorticity distribution widens with increasing values of the non-dimensional diffusion time (figure 3a). The broader, more uniform vorticity distributions at higher values of $\sigma$ correspond to lower values of the minimum non-dimensional energy (figure 3b). For a constant velocity ($m=0$), the non-dimensional energy drops from ${{E}_{\varepsilon =1}^{*}=0.328}$ to ${{E}_{\varepsilon =1}^{*}=0.281}$ when the viscous core size is increased from $\sigma =0$ to $\sigma =0.1$. These minimum values of the non-dimensional energy remain in agreement with the values measured by Gharib et al. (Reference Gharib, Rambod and Shariff1998), Mohseni et al. (Reference Mohseni, Ran and Colonius2001) and de Guyon & Mulleners (Reference de Guyon and Mulleners2021). In the case of a constant acceleration motion ($m=1$), the inviscid vorticity profile already has a low non-dimensional energy of $0.187$ for $\sigma =0$, which is close to the limiting value of $0.16$ obtained with a uniform vorticity distribution. The diffusion during a non-dimensional time of $\sigma =0.3$ leads to a decrease of ${{E}_{\varepsilon =1}^{*}}$ of less than 5 % for motions with a constant acceleration.

Figure 3. (a) Vorticity distribution in the vortex core for $m=0$ and for different diffusion times $\sigma$. (b) The evolution of the minimum non-dimensional energy for $m=0$ and $m=1$ as a function of the viscous core size $\sigma$, compared with the minimum non-dimensional energy of a Lamb–Oseen vortex of similar core size.

We now compare the results of the Pullin distribution with a time varying Lamb–Oseen distribution:

(3.4)\begin{equation} \omega(s)={{\omega}_{{0}}} {\rm e}^{-(sR)^{2}/4\nu t}, \end{equation}

where ${{\omega }_{{0}}}$ is again the reference vorticity. Using $\sigma =\sqrt {\nu t}/R$, this is equivalent to

(3.5)\begin{equation} \omega(s)=\begin{cases} {{\omega}_{{0}}} {\rm e}^{{-}s^{2}/4\sigma^{2}} & \text{if } s\leq 1,\\ 0 & \text{if } s> 1. \end{cases} \end{equation}

The Lamb–Oseen distribution is often used to fit experimental or numerical vortex core distributions (Weigand & Gharib Reference Weigand and Gharib1997; Johari & Stein Reference Johari and Stein2002). It corresponds to the diffusion of a point vortex or a highly concentrated vorticity distribution. Therefore, the Lamb–Oseen vortex has a higher non-dimensional energy than the diffused rolled-up Pullin spiral (figure 3b). The differences between the Pullin and the Lamb–Oseen distribution vanish when $\sigma$ increases, and for $\sigma =0.3$ the two solutions have similar non-dimensional energies. A Pullin vortex with $\sigma =0.1$ and a Lamb–Oseen vortex with $\sigma =0.2$ produce an equivalent ${{E}_{\varepsilon =1}^{*}=0.28}$. Their vorticity distribution is shown in figure 4, and compared to the experimentally measured vorticity profiles of a vortex ring forming behind a disk, presented by de Guyon & Mulleners (Reference de Guyon and Mulleners2021). The diffused Pullin profile matches the experimental profiles better than the Gaussian Lamb–Oseen profile, which has a core that is too wide and a tail that is too low compared to the experimental results. A better fit of the core region can be achieved with a Lamb–Oseen distribution of parameter $\sigma =0.12$, but this distribution drops too quickly to zero and yields a value of the non-dimensional energy that is substantially overestimated.

Figure 4. Vorticity distribution for the diffused Pullin profile for $m=0$ and $\sigma =0.1$; the experimental vorticity profiles from de Guyon & Mulleners (Reference de Guyon and Mulleners2021), measured between the vortex core and the $x$-axis of symmetry; and the Lamb–Oseen profile of equivalent non-dimensional energy ($\sigma =0.2$). The experimental data are presented by the average vorticity profile (solid line) and its range (shaded region).

4. Conclusion

The non-dimensional energy of vortex rings produced by the impulsive start of a piston converges to 0.33. Values around 0.3 were also obtained for various experiments and simulations, including for vortex rings generated behind disks. Here, we explored the limits of the universality of this value and analysed the variations that occur outside of those limits based on the self-similar vortex sheet roll-up described by Pullin. We derived the vorticity distribution that emerges when an inviscid shear layer rolls up into a spiral. Even though the vorticity distribution is singular, this approach yields a finite non-dimensional energy of 0.33 for a piston moving at a constant velocity.

The distribution of vorticity is strongly influenced by the kinematics of the vortex generator. Switching from a constant velocity profile to a linearly increasing velocity profile reduces the non-dimensional energy to 0.19. This behaviour was observed for vortex rings generated by piston–cylinders and results in delayed vortex pinch-off. This offers opportunities to control the vortex development and improve fluid transport or thrust production. Further increasing the acceleration, i.e. increasing $m$ in the velocity program $u(t) \propto t^{m}$, only reduces ${{E}^{{*}}}$ to 0.16. In addition to being impractical to achieve, increasing the acceleration does not yield much improvement in the tuning of the vortex characteristics.

The influence of viscosity on the limiting minimum value of the non-dimensional energy is analysed by radially diffusing the vorticity in the vortex core. The radial diffusion of vorticity from the rolled-up shear layer removes the singularity in the distribution and yields vorticity profiles that, compared to a traditional Gaussian distribution, describe more accurately the profiles measured in previous work. The diffused Pullin profile predicts a value of 0.28 for the non-dimensional energy, in accordance with the experimental observations.

The proposed model offers a practical alternative to the existing slug-flow model. It is more broadly applicable than the slug-flow model and requires only the kinematics of the vortex generator as input.

Declaration of interests

The authors report no conflict of interest.

References

REFERENCES

Benjamin, T.B. 1976 The alliance of practical and analytical insights into the nonlinear problems of fluid mechanics. In Applications of Methods of Functional Analysis to Problems in Mechanics (ed. P. Germain & B. Nayroles), pp. 8–29. Springer.CrossRefGoogle Scholar
Dabiri, J.O. & Gharib, M. 2005 Starting flow through nozzles with temporally variable exit diameter. J. Fluid Mech. 538, 111136.CrossRefGoogle Scholar
Danaila, I. & Hélie, J. 2008 Numerical simulation of the postformation evolution of a laminar vortex ring. Phys. Fluids 20 (7), 073602.CrossRefGoogle Scholar
Francescangeli, D. & Mulleners, K. 2021 Discrete shedding of secondary vortices along a modified Kaden spiral. J. Fluid Mech. 917, A44.CrossRefGoogle Scholar
Friedman, A. & Turkington, B. 1981 Vortex rings: existence and asymptotic estimates. Trans. Am. Math. Soc. 268 (1), 137.CrossRefGoogle Scholar
Gharib, M., Rambod, E. & Shariff, K. 1998 A universal time scale for vortex ring formation. J. Fluid Mech. 360, 121140.CrossRefGoogle Scholar
de Guyon, G. & Mulleners, K. 2021 Scaling of the translational velocity of vortex rings behind conical objects. Phys. Rev. Fluids 6 (2), 024701.CrossRefGoogle Scholar
Hill, M.J.M. 1894 VI. On a spherical vortex. Trans. R. Soc. Lond. A 185, 213245.Google Scholar
Johari, H. & Stein, K. 2002 Near wake of an impulsively started disk. Phys. Fluids 14 (10), 34593474.CrossRefGoogle Scholar
Kaden, H. 1931 Aufwicklung einer unstabilen Unstetigkeitsfl. Ing.-Arch. 2, 140168.CrossRefGoogle Scholar
Kaplanski, F., Fukumoto, Y. & Rudi, Y. 2012 Reynolds-number effect on vortex ring evolution in a viscous fluid. Phys. Fluids 24 (3), 033101.CrossRefGoogle Scholar
Krieg, M. & Mohseni, K. 2021 A new kinematic criterion for vortex ring pinch-off. Phys. Fluids 33 (3), 037120.CrossRefGoogle Scholar
Lepage, C., Leweke, T. & Verga, A. 2005 Spiral shear layers: roll-up and incipient instability. Phys. Fluids 17 (3), 031705.CrossRefGoogle Scholar
Limbourg, R. & Nedić, J. 2021 a Formation of an orifice-generated vortex ring. J. Fluid Mech. 913, A29.CrossRefGoogle Scholar
Limbourg, R. & Nedić, J. 2021 b An extended model for orifice starting jets. Phys. Fluids 33 (6), 067109.CrossRefGoogle Scholar
Limbourg, R. & Nedić, J. 2021 c On the asymptotic matching procedure predicting the formation number. Phys. Fluids 33 (11), 117103.CrossRefGoogle Scholar
Linden, P.F. & Turner, J.S. 2001 The formation of ‘optimal’ vortex rings, and the efficiency of propulsion devices. J. Fluid Mech. 427, 6172.CrossRefGoogle Scholar
Maxworthy, T. 1977 Some experimental studies of vortex rings. J. Fluid Mech. 81 (3), 465495.CrossRefGoogle Scholar
Mohseni, K. & Gharib, M. 1998 A model for universal time scale of vortex ring formation. Phys. Fluids 10 (10), 24362438.CrossRefGoogle Scholar
Mohseni, K., Ran, H. & Colonius, T. 2001 Numerical experiments on vortex ring formation. J. Fluid Mech. 430, 267282.CrossRefGoogle Scholar
Nitsche, M. & Krasny, R. 1994 A numerical study of vortex ring formation at the edge of a circular tube. J. Fluid Mech. 276, 139161.CrossRefGoogle Scholar
Norbury, J. 1973 A family of steady vortex rings. J. Fluid Mech. 57 (3), 417431.CrossRefGoogle Scholar
Pullin, D.I. 1978 The large-scale structure of unsteady self-similar rolled-up vortex sheets. J. Fluid Mech. 88 (3), 401430.CrossRefGoogle Scholar
Pullin, D.I. 1979 Vortex ring formation at tube and orifice openings. Phys. Fluids 22 (3), 401403.CrossRefGoogle Scholar
Pullin, D.I. & Sader, J.E. 2020 On the starting vortex generated by a translating and rotating flat plate. J. Fluid Mech. 906, A9.Google Scholar
Rosenfeld, M., Rambod, E. & Gharib, M. 1998 Circulation and formation number of laminar vortex rings. J. Fluid Mech. 376, 297318.CrossRefGoogle Scholar
Saffman, P.G. 1975 on the formation of vortex rings. Stud. Appl. Maths 54 (3), 261268.CrossRefGoogle Scholar
Shusser, M. & Gharib, M. 2000 Energy and velocity of a forming vortex ring. Phys. Fluids 12 (3), 618621.CrossRefGoogle Scholar
Shusser, M., Gharib, M. & Mohseni, K. 1999 A new model for inviscid vortex ring formation. In 30th Fluid Dynamics Conference, AIAA 99-3805.Google Scholar
Shusser, M., Rosenfeld, M., Dabiri, J.O. & Gharib, M. 2006 Effect of time-dependent piston velocity program on vortex ring formation in a piston/cylinder arrangement. Phys. Fluids 18 (3), 033601.CrossRefGoogle Scholar
Weigand, A. & Gharib, M. 1997 On the evolution of laminar vortex rings. Exp. Fluids 22 (6), 447457.CrossRefGoogle Scholar
Xu, L. & Nitsche, M. 2014 Scaling behaviour in impulsively started viscous flow past a finite flat plate. J. Fluid Mech. 756 (4), 689715.CrossRefGoogle Scholar
Yang, A.L., Jia, L.B. & Yin, X.Z. 2012 Formation process of the vortex ring generated by an impulsively started circular disc. J. Fluid Mech. 713, 6185.CrossRefGoogle Scholar
Figure 0

Figure 1. Representation of vortex rings by the roll-up of a shear layer in cylindrical coordinates $(x,r)$. Vortex rings forming (a) behind a disk, or (b) at the exit of a circular nozzle. (c) Sketch and definition of the parameters used to model the vortex ring.

Figure 1

Figure 2. (a) Non-dimensional energy as a function of the relative core radius for different velocity profiles described by $u(t)\propto t^{m}$. (b) Non-dimensional energy as a function of $m$ according to (1.2).

Figure 2

Figure 3. (a) Vorticity distribution in the vortex core for $m=0$ and for different diffusion times $\sigma$. (b) The evolution of the minimum non-dimensional energy for $m=0$ and $m=1$ as a function of the viscous core size $\sigma$, compared with the minimum non-dimensional energy of a Lamb–Oseen vortex of similar core size.

Figure 3

Figure 4. Vorticity distribution for the diffused Pullin profile for $m=0$ and $\sigma =0.1$; the experimental vorticity profiles from de Guyon & Mulleners (2021), measured between the vortex core and the $x$-axis of symmetry; and the Lamb–Oseen profile of equivalent non-dimensional energy ($\sigma =0.2$). The experimental data are presented by the average vorticity profile (solid line) and its range (shaded region).