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The internal structure of forced fountains

Published online by Cambridge University Press:  24 April 2023

Jingzi Huang*
Affiliation:
Department of Civil and Environmental Engineering, Imperial College London, London SW7 2AZ, UK
Henry C. Burridge
Affiliation:
Department of Civil and Environmental Engineering, Imperial College London, London SW7 2AZ, UK
Maarten van Reeuwijk
Affiliation:
Department of Civil and Environmental Engineering, Imperial College London, London SW7 2AZ, UK
*
Email address for correspondence: jingzi.huang17@imperial.ac.uk

Abstract

We study the mixing processes inside a forced fountain using data from direct numerical simulation. The outer boundary of the fountain with the ambient is a turbulent/non-turbulent interface. Inside the fountain, two internal boundaries, both turbulent/turbulent interfaces, are identified: (i) the classical boundary between upflow and downflow which is composed of the loci of points of zero mean vertical velocity; and (ii) the streamline that separates the mean flow emitted by the source from the entrained fluid from the ambient (the separatrix). We show that entrainment due to turbulent fluxes across the internal boundary is at least as important as that by the mean flow. However, entrainment by the turbulence behaves substantively differently from that by the mean flow and cannot be modelled using the same assumptions. This presents a challenge for existing models of turbulent fountains and other environmental flows that evolve inside turbulent environments.

Type
JFM Papers
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 (http://creativecommons.org/licenses/by/4.0), which permits unrestricted re-use, distribution and reproduction, provided the original article is properly cited.
Copyright
© The Author(s), 2023. Published by Cambridge University Press.

1. Introduction

Understanding the process of turbulent mixing within fluid flows is a ubiquitous challenge in the modelling of environmental processes, and in our exploitation of similar physical processes to meet societal needs and demands (Fernando Reference Fernando1991). Frequently, the understanding of the process of turbulent mixing between distinct bodies of fluid is approached by seeking to investigate the exchanges of the physical properties between these fluid bodies. In some circumstances, the region where these exchanges occur is robustly defined by the constraints imposed by the presence of solid boundaries; with the fluid behaviour in the proximity of that region being significantly altered by these boundaries. Examples range in scale, at least, from the flow through the windows of our buildings (Gladstone & Woods Reference Gladstone and Woods2001) to the regions that occur when continental landmasses and the ocean floor conspire to create so-called ‘straits’, which affect the dynamics of our global oceans (Finnigan & Ivey Reference Finnigan and Ivey1999, Reference Finnigan and Ivey2000). However, an even wider range of exchanges between distinct bodies of fluid can be driven by turbulence in the absence of any solid boundary. The study of such exchanges is long standing and ongoing (see Dimotakis (Reference Dimotakis2005) for a broad review). It is this type of exchange, specifically that within a canonical turbulent forced fountain, which forms the focus of this study.

The term ‘turbulent fountain’ describes the flow in which the buoyancy force opposes the initial momentum flux of an ejection from a localised source; for example, a negatively buoyant high-Reynolds-number jet continuously injected upwards into a uniform quiescent environment will produce a turbulent fountain (Hunt & Burridge Reference Hunt and Burridge2015). In this frame of reference, quasi-steady fountains consist of an inner core, herein the ‘upflow’, shrouded by a returning counterflow, herein the ‘downflow’ (see, for e.g. Turner Reference Turner1966; Mcdougall Reference Mcdougall1981). Amongst other applications (see Hunt & Burridge Reference Hunt and Burridge2015), turbulent fountains play important roles in determining the environment within our buildings (e.g. Lin & Linden Reference Lin and Linden2005), water recirculation and purification (e.g. Bloomfield & Kerr Reference Bloomfield and Kerr2000) and the forced heating or cooling of enclosed spaces (Baines, Turner & Campbell Reference Baines, Turner and Campbell1990). The dynamics of high-Reynolds-number high-Péclet-number miscible fountains can be described by consideration of a single dimensionless parameter (Burridge & Hunt Reference Burridge and Hunt2014), the source Froude number

(1.1)\begin{equation} Fr_0 = \frac{{M_0}^{5/4}}{Q_0 {|F_0|}^{1/2}} = \frac{w_0}{\sqrt{|b_0| r_0}}, \end{equation}

where $Q_0, M_0, F_0$ are the integral source fluxes, per unit ${\rm \pi}$, of volume, momentum and buoyancy, respectively; $b_0 = F_0/Q_0$ is the source buoyancy scale, $r_0 = Q_0/M_0^{1/2}$ is the source radial scale and $w_0 = M_0/Q_0$ is the characteristic vertical velocity at the source. Note that $r_0$ is the physical radius of the source only if one takes the velocity profile at the source to be uniform (i.e. top-hat). These fountains: (a) offer a rich variety of turbulent exchanges across non-solid boundaries, (b) are canonical flows and as such can inform our fundamental understanding of the physics of these processes and (c) have been relatively unexplored, compared with other canonical flows, like plumes or jets.

Exchanges driven by turbulence, in the absence of a solid boundary, have traditionally been studied from perspectives driven by two distinct motivations. Firstly, that of understanding, and often modelling, the fundamental physics of these processes, e.g. the modelling of gravitational convection of turbulent plumes and jets (e.g. Morton, Taylor & Turner Reference Morton, Taylor and Turner1956); or secondly, from a need to account for the effects of these physical processes within societal applications, e.g. the modelling of atmospheric dynamics for weather prediction (for e.g. Neggers, Siebesma & Jonker Reference Neggers, Siebesma and Jonker2002). These different motivations have led to subtly different meanings of the same key terms within different fields of scientific literature. As such, we devote some effort to clarifying first the history, and then our usage of these terms, in particular ‘entrainment’.

When driven by the desire to develop widely applicable models for the effects of turbulence, the term ‘entrainment’ has classically referred exclusively to the drawing in of mass (volume) by a region of turbulent fluid from an ambient background (Morton et al. Reference Morton, Taylor and Turner1956); implicitly this occurs across what is now termed a ‘turbulent/non-turbulent interface (TNTI)’. This physical process is relevant to a broad class of canonical flows, e.g. jets (Abramovich et al. Reference Abramovich, Girshovich, Krasheninnikov, Sekundov and Smirnova1984), plumes (Priestley & Ball Reference Priestley and Ball1955; Morton et al. Reference Morton, Taylor and Turner1956), temporal jets (Van Reeuwijk & Holzner Reference Van Reeuwijk and Holzner2014), clouds (De Rooy et al. Reference De Rooy, Bechtold, Fröhlich, Hohenegger, Jonker, Mironov, Pier Siebesma, Teixeira and Yano2013), growing regions of turbulence driven by an oscillating grid (Thompson & Turner Reference Thompson and Turner1975) and between fountain flows and the environment at their envelope (Burridge & Hunt Reference Burridge and Hunt2016); for a thorough review see Da Silva et al. (Reference Da Silva, Hunt, Eames and Westerweel2014). By definition, a quantity that is exchanged from the background into the region of interest is referred to as being entrained, or ‘entrainment’; if it leaves the region of interest it is often referred to as being detrained or ‘detrainment’ – we adhere to this usage of these terms.

In the context of these scientific endeavours, the term ‘turbulent entrainment’ has historically been used to emphasise the physical mechanism by which this process occurs. However, this ‘entrainment’ is classically associated with a mean inflow velocity across the TNTI which is related to a characteristic velocity of the flow within the region of interest, in this case, the only region of turbulent fluid, via an entrainment coefficient (Turner Reference Turner1986). This inflow might not only be associated with fluxes of mass (volume), but also with other quantities such as momentum and buoyancy (Talluru, Williamson & Armfield Reference Talluru, Williamson and Armfield2022). This can be insignificant, as in the canonical cases of plumes or jets when the background is a quiescent uniform environment, but becomes significant, for example, whenever the background is stratified or in motion. These considerations are pertinent to the modelling of the momentum and buoyancy exchanges between the upflow and downflow within fountains (Bloomfield & Kerr Reference Bloomfield and Kerr2000; Shrinivas & Hunt Reference Shrinivas and Hunt2014, hereafter referred to as BK00 and SH14, respectively).

More recently, some studies have focused on cases where the background fluid is also turbulent (rotational) so that the exchanges occur across a turbulent/turbulent interface (TTI) (Kankanwadi & Buxton Reference Kankanwadi and Buxton2020; Van Reeuwijk, Vassilicos & Craske Reference Van Reeuwijk, Vassilicos and Craske2021). In cases that feature a TTI, the use of the term ‘turbulent entrainment’ referring to the transport by the mean properties of a turbulent flow region is no longer helpful, since the flow is turbulent on both sides of the interface (TTI).

An unambiguous terminology is thus needed to describe the different exchanges when dealing with TTIs. We will refer to the exchanges into our region of interest (which must be defined explicitly in each case) due to the mean flow properties as ‘mean entrainment’ and the exchanges due to turbulence as ‘turbulent entrainment’. However, to avoid a conflict with the classical usage of the terms, we shall not use the term ‘turbulent entrainment’ in isolation, instead we always explicitly specify the quantity that is being exchanged, e.g. ‘mean volume entrainment’ and ‘turbulent momentum entrainment’, etc.

The aforementioned entrainment terms can be defined rigorously using the example of a slender axisymmetric steady-state jet/plume/fountain developing in the direction of the coordinate $z$, for which the integral continuity equation and transport equation of a generic scalar, or vector component, $X$ in the absence of sources are given by (see Van Reeuwijk et al. Reference Van Reeuwijk, Vassilicos and Craske2021)

(1.2)$$\begin{gather} \frac{\textrm{d}}{\textrm{d} z} \int_{\bar{\varOmega}} \bar{w} \, \textrm{d} A ={-}\oint_{\partial \bar{\varOmega}} \bar{V}_{g} \, \textrm{d} \ell, \end{gather}$$
(1.3)$$\begin{gather}\frac{\textrm{d}}{\textrm{d} z} \int_{\bar{\varOmega}} \left( \bar{w} \bar{X} + \overline{w'X'} \right) \textrm{d} A ={-} \oint_{\partial \bar{\varOmega}} \left( \bar{V}_{g} \,\bar{X} + \overline{V_{g}' X'} \right) \textrm{d} \ell. \end{gather}$$

Here, the velocity component in the $z$-direction is denoted $w$, and integration is performed over a domain $\bar {\varOmega }$, orthogonal to the $z$-direction, that encompasses the flow within the region of interest; $\partial \bar {\varOmega }$ denotes the boundary of $\bar {\varOmega }$. The overbar indicates the domain is chosen based on a Reynolds-averaged quantity: in the case of jets/plumes, this Reynolds-averaged quantity is typically a small fraction $\epsilon$ of the centreline velocity $\bar {w}_c$ (Van Reeuwijk et al. Reference Van Reeuwijk, Sallizoni, Hunt and Craske2016), i.e. $\bar {\varOmega }$ is the domain for which $\bar {w}>\epsilon \bar {w}_c$. Since the flow is statistically axisymmetric and time independent, the interface can equally be described using a single-valued function $r=h_t(z)$.

The instantaneous entrainment velocity across the interface is denoted $V_g$, which is the difference between the local fluid velocity and the boundary velocity. Following Van Reeuwijk et al. (Reference Van Reeuwijk, Vassilicos and Craske2021), we write this as

(1.4)\begin{equation} V_g = u - \frac{\textrm{D} h_t}{\textrm{D} t} = u - w \frac{\textrm{d} h_t}{\textrm{d} z} , \end{equation}

where $\textrm{D} h_t/\textrm{D} t$ is the material derivative representing the boundary velocity, $u$ and $w$ are the instantaneous radial and streamwise velocity components of fluid on the interface $\partial \bar {\varOmega }$, respectively. For the case under consideration, $h_t$ is time independent due to consideration of a boundary defined by a Reynolds-averaged quantity, in which case this term then simplifies as per the right-hand side of (1.4). Reynolds averaging the expression above results in $\bar {V}_g = \bar {u} - \bar {w} ({\textrm{d} h_t}/{\textrm{d} z})$. Note that, since we choose the interface based on a threshold of velocity, the last term is negligibly small compared with the first, and we recover the classical entrainment velocity $\bar{V}_g = \bar {u}$ for jets/plumes.

The right-hand side of (1.2) represents the mean volume entrainment, as the transport is due to the mean quantity $\bar{V}_g$, in this case $\bar{V}_g = \bar{u}$. The first term on the right-hand side of (1.3) represents the mean scalar entrainment term $\bar{V}_g \bar {X}$ and the second term of the right-hand side is the turbulent scalar entrainment term $\overline {V_{g}' X'}$ (by definition $X$ can also be a vector component, e.g. $w$; we omit the ‘vector’ in the name here for simplicity). Note that volume entrainment can only be caused by the mean flow, but all other transported properties (momentum, buoyancy, etc.) can have both a mean and a turbulent component.

The terms for entrainment are illustrated schematically in figure 1. The figure illustrates the entrainment from an ambient of two cases: (a) the ambient is non-turbulent so that the interface is a TNTI, for which only mean volume entrainment and mean scalar entrainment can occur at the interface (e.g. the interface between a turbulent fountain and the quiescent environment); (b) the ambient is turbulent so that the interface is a TTI (e.g. the interface between the upflow and downflow inside a turbulent fountain), for which, besides mean volume entrainment and mean scalar entrainment, turbulent scalar entrainment can occur at the interface. Instantaneous exchanges at the TTI can and do occur in both directions (as allowed in the BK00 model of a fountain or measured at the cloud edge De Rooy et al. Reference De Rooy, Bechtold, Fröhlich, Hohenegger, Jonker, Mironov, Pier Siebesma, Teixeira and Yano2013), but the Reynolds-averaged quantities discussed here are the net value of these bi-directional exchanges.

Figure 1. Schematic illustrating the entrainment of volume and scalars across interfaces separating the flow within the chosen region of interest, which is by definition turbulent, and the environment. Two different cases emphasise our chosen terminology: (a) a non-turbulent environment, and (b) a turbulent environment. Transport or exchanges across the interface, here all termed ‘entrainment’, are illustrated by arrows; for each entrainment, the associated transport term and its naming convention are highlighted. Black arrows represent the entrainment that is associated with the mean flow, while the red arrow represents that associated with the turbulence.

In some circumstances, the fluid on one particular side of the TTI has a larger turbulence intensity and so the choice of the ‘region of interest’ (or ‘flow region’) and ‘background’ is obvious. However, for more complex fluid flows this is not so straightforward. For example, in a fountain one can distinguish between an upflow and a downflow, which are modelled separately (BK00). Here, in the upflow and in the downflow, turbulence levels can be of comparable turbulence intensity, with standard metrics switching from being typically larger in the upflow near the source, to the downflow further from the source. Another example is a cumulus cloud, where it is also difficult to distinguish on which side of the interface between the cloud core and descending shell the turbulence intensity is largest (Heus & Jonker Reference Heus and Jonker2008; De Rooy et al. Reference De Rooy, Bechtold, Fröhlich, Hohenegger, Jonker, Mironov, Pier Siebesma, Teixeira and Yano2013; Nair, Heus & van Reeuwijk Reference Nair, Heus and van Reeuwijk2020). Thus, in order to distinguish ‘entrainment’ and ‘detrainment’, one must always clearly define the ‘region of interest’, as this will determine whether one should use the term entrainment (exchange into the region) or detrainment (exchange out of the region). For completeness, we note that, should the exchanges illustrated in figure 1(b) be evaluated to be negative then, following our convention, this would result in the reversal of the direction of the arrows, and the exchanges would thus be termed ‘detrainment’.

The aim of this work is to study the internal structure of a turbulent forced fountain; to do so, we use direct numerical simulation (DNS) to investigate a highly forced fountain. The structure of the paper is as follows: in § 2 we describe the numerical simulation details. In § 3 we describe the instantaneous fountain observation and discuss the internal structure of a Reynolds-averaged fountain, we divide the fountain into three regions of interest with two TTIs. In § 4 we introduce the integral quantities of a fountain and appropriate conservation equations in order to find the flux and entrainment budgets of mass, momentum and buoyancy. In § 5 we examine the vertical variation in fluxes within the three flow regions. In § 6 we discuss entrainment across the interfaces, including that near the fountain top; ending with a comparison of the entrainment coefficients from our DNS with those of other studies. Concluding remarks are made in § 7.

2. Simulation details

We simulate an axisymmetric fountain driven by an isolated source of uniform (top-hat) vertical upwards velocity $w_0$ and opposing (negative) buoyancy $b_0$ where buoyancy is defined as $b = g(\rho _e - \rho )/\rho _a$, in which $\rho$ and $\rho _e$ denote the density of fountain flow and environment, respectively, $\rho _a$ is a reference density, and g is the gravity. The domain has size $L_x \times L_y \times L_z = 160\,r_0 \times 160\,r_0 \times 100\,r_0$ where $r_0$ is the source radius. The coordinate system has its origin in the bottom corner with the $z$-direction upwards (figure 2), and the source is located in the centre at $(L_x/2, L_y/2, 0)$. The source fluxes, per unit ${\rm \pi}$, of volume $Q_0$, momentum $M_0$, buoyancy $F_0$ and (again per unit ${\rm \pi}$) the integral buoyancy $B_0$, can be defined as

(2.1ad)\begin{equation} Q_0 = w_0r_0^2, \quad M_0 = w_0^2r_0^2, \quad F_0 = w_0b_0r_0^2, \quad B_0 = b_0r_0^2. \end{equation}

The fountain source is such that the source Froude number is $Fr_0 = 21$ which sits well above the threshold ($Fr_0 \gtrsim 4.0$) for the region described as forced fountains (Burridge & Hunt Reference Burridge and Hunt2012). The Reynolds number is $Re_0 =w_0r_0/\nu =1667$, sufficient such that our simulations sit within a Reynolds-number regime ($Re_0 \gtrsim 1000$) for which the experiments of Burridge, Mistry & Hunt (Reference Burridge, Mistry and Hunt2015) demonstrate that the bulk behaviour of the fountain, in particular the fountain rise height, is broadly independent of $Re_0$, and the flow can be regarded as high Reynolds number, or ‘turbulent’.

Figure 2. The whole simulation domain with an illustration of an instantaneous fountain depicted by plotting an isosurface of buoyancy, coloured according to the local vertical velocity. The unit of the length is the number of nodes.

For these turbulent highly forced fountains universal scalings exist based on consideration of a point source fountain of momentum flux, $M_0$, and opposing buoyancy flux, $F_0$. By consideration of the length scale $L_{F} = M_0^{3/4}/|F_0|^{1/2}= r_0 Fr_0$ (cf. Turner (Reference Turner1966), who originally defined the length scale based on physical fluxes, rather than the fluxes per unit ${\rm \pi}$, i.e. there is a ratio of ${\rm \pi} ^{1/4}$ between the two length scales) and time scale $T_{F} = M_0/|F_0| = \sqrt {r_0/|b_0|} \, Fr_0$ (Burridge & Hunt Reference Burridge and Hunt2013), results for forced fountains are therefore universal when scaled on $Fr_0$. Herein, we use these scales to normalise all quantities, making our findings directly applicable to all turbulent fountain flows with source Froude number $Fr_0 \gtrsim 4$ (Hunt & Burridge Reference Hunt and Burridge2015). For example, we normalise all volume fluxes using $Q_F = L_F^3 / T_F = M_0^{5/4}/|F_0|^{1/2}$ ($Q_F \propto Q_0 Fr_0$ Baines, Corriveau & Reedman Reference Baines, Corriveau and Reedman1993) and for all quantities concerning the entrainment of volume, momentum and buoyancy, we use $q_F = Q_F/L_F = M_0^{1/2}$, $m_F = M_0/L_F$ and $f_F = F_0/L_F$, respectively. The size of our cuboidal domain in these units, is $L_x \times L_y \times L_z = 7.55\, L_F \times 7.55\, L_F \times 4.72\, L_F$.

The incompressible Navier–Stokes equations under the Boussinesq approximation are solved numerically using DNS on a uniform Cartesian grid of $N_x \times N_y \times N_z = 1280^3$ cells. The grid size is resolved smaller than two Kolmogorov scales, such as $\Delta x = L_x/N_x < 2\eta _K$. Here, the Kolmogorov scale $\eta _K=(\nu ^3/\epsilon )^{1/4}$, where $\epsilon$ is the averaged integral dissipation rate of turbulent kinetic energy over the entire fountain height. The code employed is SPARKLE, which uses a spatial discretisation of fourth-order accuracy and a third-order Adams–Bashforth time integration scheme. Details of the numerical method used in SPARKLE can be found in Craske & van Reeuwijk (Reference Craske and van Reeuwijk2015).

A Dirichlet boundary condition $w=w_0, b=b_0$ is applied at the source to ensure the uniform source value. We initiate the turbulence by applying an uncorrelated perturbation of 1 % to the velocities in the first cell above the source. The boundary condition at the domain top has a Neumann condition on velocity and buoyancy, and at the domain bottom, the boundary condition is ‘free slip’ with a Neumann condition on buoyancy (except at the source). The four sidewalls of the domain are periodic, raising potential concerns that fluid leaving from one side and re-entering at the opposite can potentially influence the fountain flow – we mitigate this concern in two ways. First, we ensure that the domain is sufficiently large that the dynamics of the fountain is unaffected by any transport at the domain edges. To do this, we checked a variety of fountain flow statistics for a domain that is approximately 50 % smaller. We found no substantial differences between the domain in terms of the fountain (outer boundary) and the exchanges across the internal boundaries (defined later on). These results are presented in Appendix A. Second, to avoid any accumulation of buoyancy within the domain affecting our results, a buoyancy ‘sink’ region is set within a thin region (of height $r_0$) at the bottom of the domain and, to avoid affecting the source, only within the region $r \geqslant 9r_0$ – within this sink region the fluid buoyancy is gradually adjusted by a ‘nudging’ process towards the environmental value, i.e. the buoyancy is nudged to zero in this region (Stevens, Graham & Meneveau Reference Stevens, Graham and Meneveau2014).

Observations show that the longest time scales in a forced fountain flow are the time scale required to establish a statistically steady state (found here to be approximately $5T_F$), followed by the time scales of the large-scale low-frequency fluctuations near the fountain top. The latter time scale is approximately $2T_F$ (Burridge & Hunt Reference Burridge and Hunt2013). We ran our simulations for a duration of $16T_F$ in order to allow sufficient time for the flow to reach a statistically steady state and then experience a number of the largest-scale fluctuations in the region near the top of the fountain, a region which we describe as the ‘fountain cap’. Instantaneous statistics were obtained at a vertical plane at the centre of the domain with time increments of $0.09T_F$. Azimuthally Reynolds-averaged data were computed and stored every $0.14T_F$ once the fountain was in a statistically steady state by partitioning the domain into concentric cylindrical shells and averaging over all cells lying within a given shell (Craske & van Reeuwijk Reference Craske and van Reeuwijk2015; Van Reeuwijk et al. Reference Van Reeuwijk, Sallizoni, Hunt and Craske2016).

3. Flow observations and internal structure

3.1. Observations of instantaneous fountain

A movie showing the fountain from the initial transient state to the statistically steady state can be found within the supplementary material available at https://doi.org/10.1017/jfm.2023.210. Figure 3 shows a time series of the evolution of the vertical distribution of the horizontally integral buoyancy within the fountain $\mathcal {B}$ (per unit ${\rm \pi}$), which is defined as

(3.1)\begin{equation} \mathcal{B}(z,t) = \frac{1}{\rm \pi}\int_0^{L_x}\int_0^{L_y} b(x,y,z,t) \, \textrm{d}\kern0.06em x \, \textrm{d} y \approx \int_{0}^{L_x} b(x,z,t) \left|x-\frac{L_x}{2}\right| \textrm{d}\kern0.06em x, \end{equation}

for practical reasons (namely, instantaneous data are taken at a central vertical plane), our evaluation comes via the approximation in (3.1).

Figure 3. Time series of normalised local integral buoyancy, $\mathcal {B}(z,t)/\mathcal {B}_0$, within the fountain. The instantaneous fountain height is outlined by the solid line. The horizontal dashed line marks the initial height and the dash-dotted line marks mean steady height. Within the figure, the darker shades of blue represent the greater negative buoyancy.

Fountain flows typically feature a region at the fountain cap which is characterised by the formation and collapse of large-scale structures within the fountain flow as is observed in figure 3. The fountain height is determined by a threshold $0.01\,\mathcal {B}(z_b)$, where $\mathcal {B}(z_b)$ is the time-averaged integral buoyancy at a height $z_b/L_F = 1.63$, which we define as the fountain cap base (see § 3.2). During $t/T_F \lesssim 5.0$, which we regard as the initial transient period, the upflow reaches an initial height at $t/T_F \approx 2.2$, and the downflow is yet to be fully developed until $t/T_F \approx 4.0$. After $t/T_F \approx 5.0$, the fountain can be said to have reached a statistically steady state, and the fountain height fluctuates around a mean steady height. The ratio of initial to steady heights is approximately 3 : 2, in line with experimental measurements (Turner Reference Turner1966; Burridge & Hunt Reference Burridge and Hunt2012). Note that the heights referred to here are taken from measurements only in the central vertical plane. Figure 3 shows the characteristic (dark blue) inclined stripes that indicate the falling of distinct negatively buoyant fluid structures within the downflow, as previously discussed for fountains in statistically steady state by Burridge & Hunt (Reference Burridge and Hunt2013) and Mingotti & Woods (Reference Mingotti and Woods2016). The thin region, $z/L_F \lesssim 0.05$ in which the local buoyancy is nudged to the environmental value in order to avoid the accumulation of buoyancy in the domain can also be observed.

3.2. Internal structure of Reynolds-averaged fountain

Once the fountain has reached a statistically steady state, its averaged form is governed by the axisymmetric Reynolds-averaged Navier–Stokes equations in the high-Reynolds-number limit, namely

(3.2a)$$\begin{gather} \frac{1}{r}\frac{\partial (r\bar{u})}{\partial r}+\frac{\partial \bar{w}}{\partial z}=0 , \end{gather}$$
(3.2b)$$\begin{gather}\frac{1}{r}\frac{\partial}{\partial r}(r\bar{u}\,\bar{w}+r\overline{u'w'})+\frac{\partial}{\partial z}({\bar{w}}\,\bar{w}+\overline{w'w'})={-}\frac{\partial \overline{p}}{\partial z} + \bar{b} , \end{gather}$$
(3.2c)$$\begin{gather}\frac{1}{r}\frac{\partial}{\partial r}(r\bar{u}\,\bar{b}+r\overline{u'b'})+\frac{\partial}{\partial z}({\bar{w}}\,\bar{b}+\overline{w'b'})=0, \end{gather}$$

where $\bar {{\cdot }}$ represents the time average (mean): $\bar {b}$ is the mean buoyancy. The mean velocity components ($\bar {u}, \bar {w}$) correspond to the radial direction $r$ and vertical direction $z$, respectively. The mean pressure $\bar {p}$ is the kinematic pressure from which the hydrostatic pressure field resulting from the environmental density has been subtracted.

Figure 4(a) shows the internal structure of the Reynolds-averaged fountain in its statistically steady state with the shaded colour indicating the mean vertical velocity, $\bar {w}=\bar {w}(r,z)$, at that location. We define the point at which the mean vertical velocity on the centreline first falls to zero to be the ‘height of the upflow’, denoted $z_i$ and we find $z_i/L_F \approx 2.22$. Some works (e.g. BK00) attempted to model fountains only via the application of ‘plume-like’ flow theory, whilst others acknowledged the need to model a ‘cap’ region near the fountain top via distinct considerations (e.g. Mcdougall (Reference Mcdougall1981) and SH14). The fountain cap region can be considered to be the region of flow enclosed by the outer boundary above some height $z_b$, which we term the fountain cap base. The definition used to determine the height of the fountain cap base varies between studies; for example, Mcdougall (Reference Mcdougall1981) theoretically modelled the cap region as a hemisphere whose radius is half of its base vertical height, SH14 and Hunt & Debugne (Reference Hunt and Debugne2016) defined the cap base location as where the local Froude number of upflow is equal to $\sqrt {2}$. In their experimental study of fountains, Talluru et al. (Reference Talluru, Williamson and Armfield2022) investigated the sensitivity of their findings to the choice cap base definition, dependent on a local Froude-number condition (in the upflow); they found that the ratio of the volume flux entrained within the cap to that in the upflow at the cap base was insensitive to the location of the cap base when the local Froude-number condition was chosen to be in the range 1.2–1.8. The numerical study of Awin et al. (Reference Awin, Armfield, Kirkpatrick, Williamson and Lin2018) defined the cap base at the location where the radius of upflow is the widest. Specifically for our fountain, the locations of the cap base following each of the three above definitions from the existing literature are all within the region $1.60 \leqslant z/L_F \leqslant 1.65$. Therefore, our precise choice of definition is of little significance and, somewhat arbitrarily, we choose to define the fountain cap base as the point of maximum upflow radius, giving, $z_b/L_F = 1.63$.

Figure 4. The normalised mean vertical velocity $\bar {w}/w_F$, where $w_F = M_0^{1/4}|F_0|^{1/2}$, within the time-averaged fountain marked by colour with regions of: upward velocities shaded red, downward shaded blue and zero vertical velocity being white. (a) Highlights the internal structure of the fountain by overlaying the vertical velocities with relevant boundaries: the inner boundary (blue line), outer boundary (red line) and the separatrix (purple line). The thin dash-dotted line marks the loci of points where the maximum downflow vertical velocity occurs. (b) The vertical velocities are overlaid with velocity streamlines. The fountain cap base is marked by the horizontal dashed line.

The downflow of the steady fountain and the environment are separated by the outer boundary of radius $r_f=r_f(z)$, this also constitutes the boundary of fountain flow. The outer boundary is defined by the loci of points at which the mean buoyancy $\bar {b} = 0.01 \bar {b}_{cc}$, where $\bar {b}_{cc}=\bar {b}(0, z_b)$ is the centreline mean buoyancy at the fountain cap base level which is approximately $0.36 b_0$. The sensitivity of our results to the constant within the threshold $\bar {b} = 0.01 \bar {b}_{cc}$ that was used to determine the outer boundary is presented in Appendix A; this sensitivity is not deemed significant. The top of the outer boundary (also the final steady height of the entire time-averaged fountain) is located at $z_f/L_F \approx 2.45$, i.e. $z_f/r_0 \approx 2.45Fr_0$, which is close to the value $2.46$ reported by Burridge & Hunt (Reference Burridge and Hunt2012), and also agrees well with other experimental literature (see Turner Reference Turner1966; Mizushina, Ogino & Takeuchi Reference Mizushina, Ogino and Takeuchi1982; Baines et al. Reference Baines, Turner and Campbell1990). The outer boundary generally increases from the top to bottom as, too, does the area of downflow. We find that the height of the cap region (from cap base to the top) is $z_f-z_b = 0.82L_F$, which comprises approximately one third of the total fountain height. We note that the fountain cap region is not our primary focus but we do include some analysis in § 6.2, and we mark the location of the fountain cap base in all relevant figures for completeness.

Below the cap, the flow can be divided into two regions separated by an internal boundary, or interface. Herein, we investigate two different definitions of this internal boundary. The first is to decompose the fountain into an upflow region where $\bar {w}$ is positive (shaded red in figure 4) and a downflow region where $\bar {w}$ is negative (shaded blue), that are separated by the inner velocity boundary $r_i$ defined by the loci of points at which $\bar {w} = 0$. The radial position of this inner velocity boundary (hereinafter ‘inner boundary’) $r_i$ increases to a maximum width at $z/L_F \approx 1.63$ (in fact the definition of cap base) and decreases to zero above, at the point at which the mean centreline velocity reduces to zero. Shown in figure 4(b) are the streamlines of the mean velocity, $\{\bar {u},\bar {w}\}$. By construction, the streamlines are horizontal on the inner boundary since the vertical velocity is zero.

The streamlines in figure 4(b) then provide our second definition of the internal boundary. The streamlines illustrate that the flow being injected from the source is, in the mean, separated from the entrained ambient flow by a streamline that originates from the stagnation point at the top of the inner boundary. This separatrix, which we denote $r_s(z)$, is highlighted by the purple line in figure 4(a) and defines our second internal boundary. The streamlines outside the separatrix show the environmental fluid is entrained into the downflow and eventually leaves the domain from the side. The streamlines cross the outer boundary at some angle to the horizontal indicating that the entrainment velocity has some vertical component. The streamlines inside the separatrix either originate from the source or are closed loops within the upflow, crossing the inner boundary twice – this highlights that, in the mean, the upflowing core entrains near the source and then detrains fluid into downflow further from the source (above $z/L_F \approx 1.20$).

By construction, there is no mean exchange across the separatrix, and so the volume flux inside $r_s$ is conserved. Exchange across the separatrix $r_s$ can thus only occur by turbulence. By definition, the separatrix intersects the centreline at the height $z=z_i$, i.e. $r_s(z_i) = r_i(z_i) = 0$. The separatrix divides the downflow into an ‘inner downflow region’ (the region between the inner boundary and separatrix), and an ‘outer downflow region’ (the region between the separatrix and outer boundary). The outer downflow region contains all mass (volume) that has been entrained from the environment. These regions and boundaries are all shown in figure 4(a). Except close to the fountain top, the location of the separatrix (purple line) is very similar to that of the vertical velocity maximum (thin black dashed line). This suggests that the fluid beyond the vertical velocity maximum is entrained from the environment.

The relevance of the separatrix $r_s$ to fountain flows is highlighted by consideration of the field lines of mean buoyancy flux $\{\bar {u}\bar {b},\bar {w}\bar {b}\}$, and total buoyancy flux $\{ \bar {u}\bar {b}+\overline {u'b'}, \bar {w}\bar {b}+\overline {w'b'}\}$, plotted in figures 5(a) and 5(b), respectively, both with the buoyancy field overlaid. Here, we note that, as (3.2c) demonstrates, only the total buoyancy flux is a conserved quantity. This implies that for the field lines of mean buoyancy, there is a sink–source term and the total buoyancy between the two field lines need not be conserved. As the mean buoyancy flux is the product of the velocity field and the scalar buoyancy field, the field lines of mean buoyancy flux are similar to the streamlines inside the fountain presented in figure 4(b) within the separatrix. As the environment has neutral (zero) buoyancy, the fountain source is the only source of (negative) buoyancy. Therefore, it is worth noting from figure 5(a) that: firstly, no field lines exist outside the outer boundary $r_f$; and secondly, the buoyancy injected from the source cannot be transported outside of the separatrix $r_s$ by the mean buoyancy fluxes. However, we can observe there is mean transport of (negative) buoyancy flux within the outer downflow beyond, as indicated by the grey field lines between the purple boundary, $r_s$, and red boundary, $r_f$. Combining observations from figures 5(a) and 5(b) highlights that it is only turbulence that transfers the negative buoyancy across $r_s$ into the outer downflow region, i.e. all the negative buoyancy within the outer downflow is the result of turbulent exchange across $r_s$. The field lines of total buoyancy flux in figure 5(b) evidence the transfer of buoyancy across the separatrix due to turbulence. Since the total buoyancy flux within the fountain is conserved, the buoyancy flux in the upflow equals the buoyancy flux in the downflow.

Figure 5. The normalised mean buoyancy field $\bar {b}/b_F$, $b_F =M_0^{-5/4}|F_0|^{3/2}$, overlaid with three fountain boundaries presented in figure 4 and: (a) field lines of mean buoyancy flux $\{\bar {u}\bar {b},\bar {w}\bar {b}\}$, where the grey lines mark the field lines outside the separatrix; (b) field lines of total buoyancy flux $\{ \bar {u}\bar {b}+\overline {u'b'}, \bar {w}\bar {b}+\overline {w'b'} \}$.

Note that the streamlines and field lines indicate that, as expected, the dynamics of the outer downflow below $z/L_F \approx 0.5$ is visibly affected by the (free-slip) bottom boundary, e.g. the flow is forced radially outwards in that region. To ensure the absence of boundary effects in the data presented herein, we therefore only display data from the outer downflow region for $z/L_F > 0.66$ in all further analyses. However, the inner downflow region is not likely to be significantly affected since this fluid is entrained by the upflow. We, therefore, consider our results for the inner downflow region to be valid over the full height.

4. Integral equations

The theoretical work in this section presents exact transport budgets for each flow region. We integrate (3.2a)–(3.2c) over the radial coordinate $r$ between two radial locations $r_1(z)$ and $r_2(z)$ and employ the Leibniz integration rule to give conservation equations (per unit ${\rm \pi}$) for the fluxes of volume, momentum and buoyancy as

(4.1a)$$\begin{gather} \frac{\textrm{d} Q}{\textrm{d} z} = q_1-q_2 , \end{gather}$$
(4.1b)$$\begin{gather}\frac{\textrm{d} (M + M' + P)}{\textrm{d} z} = B+ m_1 -m_2 , \end{gather}$$
(4.1c)$$\begin{gather}\frac{\textrm{d} (F+F')}{\textrm{d} z} = f_1-f_2 . \end{gather}$$

The integral quantities, per unit ${\rm \pi}$, are defined as

(4.2)\begin{equation} \left.\begin{gathered} Q \equiv 2 \int_{r_1}^{r_2}\bar{w}r\,\textrm{d} r, \quad B \equiv 2 \int_{r_1}^{r_2}\bar{b}r\,\textrm{d} r, \\ M \equiv 2 \int_{r_1}^{r_2}\bar{w}^2r\,\textrm{d} r, \quad M' \equiv 2 \int_{r_1}^{r_2}\overline{w'^2}r\,\textrm{d} r, \quad P \equiv 2 \int_{r_1}^{r_2}\bar{p}r\,\textrm{d} r,\\ F \equiv 2 \int_{r_1}^{r_2}\bar{w}\bar{b}r\,\textrm{d} r, \quad F' \equiv 2 \int_{r_1}^{r_2}\overline{w' b'}r\,\textrm{d} r, \end{gathered}\right\} \end{equation}

where $B$ is the integral mean buoyancy. The quantities $M$, $M'$ and $P$ correspond to the integral mean momentum flux, turbulent momentum flux and pressure. Moreover, $F$ and $F'$ denote the integral mean buoyancy flux and turbulent buoyancy flux. Depending on the region of interest, the inner boundary can take the locations $r_1(z) = \{0, r_i(z), r_s(z) \}$, and the outer boundaries $r_2(z) = \{r_i(z), r_s(z), r_f(z) \}$, with the only condition being that $r_2(z) > r_1(z)$. The perpendicular exchanges of volume, momentum and buoyancy across the boundary $r_j$ (with $j=i,f,\textrm { or }s$) are defined as

(4.3a)$$\begin{gather} q_j = \left.2r\left(\bar{u}-\bar{w}\frac{\textrm{d} r}{\textrm{d} z}\right)\right|_{r_j}, \end{gather}$$
(4.3b)$$\begin{gather}m_j = \left.2r \left( \bar{u}\,\bar{w}-{\bar{w}}^2\frac{\textrm{d} r}{\textrm{d} z} \right)\right|_{r_j}+ 2r\left.\left( \overline{u'w'}-\overline{w'^2}\frac{\textrm{d} r}{\textrm{d} z}\right)\right|_{r_j} +2r\left.\left( -\bar{p}\frac{\textrm{d} r}{\textrm{d} z}\right) \right|_{r_j} \quad \textrm{and}, \end{gather}$$
(4.3c)$$\begin{gather}f_j = 2r \left.\left( \bar{u}\,\bar{b}-{\bar{w}\,\bar{b}}\frac{\textrm{d} r}{\textrm{d} z} \right)\right|_{r_j} + \left.2r\left(\overline{u'b'}-\overline{w'b'}\frac{\textrm{d} r}{\textrm{d} z}\right)\right|_{r_j} , \end{gather}$$

respectively. The terms associated with the radial change, i.e. $\textrm{d} r/\textrm{d} z$, are ‘Leibniz terms’. As discussed in § 1, the perpendicular exchange of volume flux $q_j$ (4.3a) only comprises a mean contribution, and the mean entrainment velocity $\bar{V}_g$, see (1.4), is clearly recognisable. The term $m_j$, (4.3b), is the perpendicular exchange of momentum flux which comprises a mean momentum flux (the first term on the right-hand side; note that this term is equal to $2 r \bar{V}_g \bar {w}$ evaluated at $r_j$) and turbulent momentum flux terms (the second and third terms on the right-hand side; with the second term equal to $2r \overline {V_g'w'}$ evaluated at $r_j$ and the third term accounting for the effects of pressure which are typically small compared with the second term). The term $f_j$, (4.3c), is referred to as the perpendicular exchange of buoyancy flux which comprises one term for mean buoyancy entrainment (the first term on the right-hand side; equal to $2 r \bar{V}_g \, \bar {b}$ evaluated at $r_j$) and one for turbulent buoyancy entrainment (the second term on the right-hand side; equal to $2r \overline {V_g'b'}$ evaluated at $r_j$). Whether these exchanges are termed ‘entrainment’ or ‘detrainment’ depends solely on the chosen ‘region of interest’ and the sign of the flux.

In the remainder of this section, the budgets for the upflow, downflow and inner downflow are presented by substituting appropriate boundaries into the equations above. For completeness, we note that, since we use a buoyancy that is consistently defined relative to the uniform ambient fluid, our buoyancy formulation corresponds to both that termed ‘BFI’ by BK00, which is also that used by SH14.

4.1. Upflow region

The upflow budgets can be obtained by integrating from the centreline to the inner boundary, i.e. $r_1(z)= 0$ and $r_2(z) = r_i(z)$. Denoting upflow quantities with subscript ‘$u$’, it immediately follows that (4.1a)–(4.1c) for the upflow region become

(4.4a)$$\begin{gather} \frac{\textrm{d} Q_u}{\textrm{d} z} ={-}q_i , \end{gather}$$
(4.4b)$$\begin{gather}\frac{\textrm{d} (M_u + M'_u + P_{u})}{\textrm{d} z} = B_u -m_i , \end{gather}$$
(4.4c)$$\begin{gather}\frac{\textrm{d} (F_u+F'_u)}{\textrm{d} z} ={-}f_i . \end{gather}$$

By stipulating that $Q_u = r_u^2 w_u$, $M_u = r_u^2 w_u^2$ and $B_u = r_u^2 b_u$, the characteristic (top-hat) upflow vertical velocity $w_u$, buoyancy $b_u$ and radius $r_u$ are defined

(4.5ac)\begin{equation} w_{u} \equiv \frac{M_u}{Q_u}, \quad b_{u} \equiv \frac{B_u M_u}{Q_u^2}, \quad \textrm{and} \quad r_{u} \equiv \frac{Q_u}{M_u^{1/2}}. \end{equation}

These natural characteristic scales will be used to investigate the entrainment coefficients in § 6.3.

4.2. Downflow region

The downflow budget (i.e. including both the inner and outer downflows), can be obtained by integrating from the inner boundary to the fountain edge, i.e. $r_1(z)= r_i(z)$ and $r_2(z) = r_f(z)$. As the flow direction is opposite to the upflow, we define a downward coordinate $z_d$. A transformation $z\rightarrow -z$ implies that $w \rightarrow -w$, $b \rightarrow -b$ in order to achieve invariance of the equations (3.2a)–(3.2c). From the definitions, (4.2), it now follows that the integral downflow quantities are given by $Q_d = -Q$, $M_d = M$, $F_d = F$, $B_d = -B$ and ${\textrm{d}}/{\textrm{d} z_d} = -{\textrm{d}}/{\textrm{d} z}$, with the transformation of the turbulent quantities following an equivalent form. Substitution into (4.1a)–(4.1c) results in

(4.6a)$$\begin{gather} \frac{\textrm{d} Q_d}{\textrm{d} z_d} = q_i-q_f, \end{gather}$$
(4.6b)$$\begin{gather}\frac{\textrm{d} (M_d + M'_d + P_{d})}{\textrm{d} z_d} = B_d + m_f -m_i, \end{gather}$$
(4.6c)$$\begin{gather}\frac{\textrm{d} (F_d+F'_d)}{\textrm{d} z_d} = f_f-f_i. \end{gather}$$

The radial coordinate remains unchanged in this transformation. Therefore, a positive volume flux $q_f$ contributes negatively to the downflow budget. Note that, at the outer boundary, the term ‘$m_f$’ can be interpreted as $-(-m_f)$, where $-m_f$ is an outwards flux of downward momentum (consider (4.3b) at $r_j = r_f$ under coordinate $z_d$). Similar understanding holds true for the buoyancy flux term $f_f$ in (4.6c). At the inner boundary, the exchange of volume flux, $q_i$, contributes oppositely to the upflow and downflow (4.4a), (4.6a) as the volume flux exchanged out of the upflow will increase the volume flux in the downflow and vice versa. However, in terms of the upflow, $m_i$ represents an outward flux of upward momentum which reduces the upflow momentum flux, so that a negative sign is correctly associated with $m_i$ in (4.4b); with respect to the downflow and the coordinate $z_d$, $-m_i$ denotes a flux of downward momentum into the downflow (radially outward) at the inner boundary, this contributes positively to the downflow momentum. Hence the sign convention in (4.4b) and (4.6b), with equivalence, for the term $f_i$ in (4.4c) and (4.6c).

The downflow region has a characteristic annular cross-sectional area, which can be denoted (per unit ${\rm \pi}$) as $r_d^2 - r_u^2$ (BK00); thus, the fluxes can be written as $Q_d = (r_d^2-r_u^2) w_d$, $M_d = (r_d^2-r_u^2) w_d^2$, $B_d = (r_d^2-r_u^2) b_d$ and it follows that the natural characteristic scales are

(4.7ac)\begin{equation} w_{d} \equiv \frac{M_d}{Q_d}, \quad b_{d} \equiv \frac{B_d M_d}{Q_d^2},\quad \textrm{and} \quad r_{d} \equiv \sqrt{\frac{Q_u^2}{M_u}+ \frac{Q_d^2}{M_d}}. \end{equation}

4.3. Inner downflow region

The transport budgets for the inner downflow region can be obtained by integrating from the inner boundary to the separatrix, i.e. $r_1(z)= r_i(z)$ and $r_2(z) = r_s(z)$. As the flow in this region is by definition downward, the transformation applied to § 4.2 is required. Denoting inner downflow quantities with subscript ‘$id$’, we obtain

(4.8a)$$\begin{gather} \frac{\textrm{d} Q_{id}}{\textrm{d} z_d} = q_i-q_s, \end{gather}$$
(4.8b)$$\begin{gather}\frac{\textrm{d} (M_{id}+ M'_{id} + P_{id})}{\textrm{d} z_d} = B_{id} + m_s -m_i, \end{gather}$$
(4.8c)$$\begin{gather}\frac{\textrm{d} (F_{id}+F'_{id})}{\textrm{d} z_d} = f_s-f_i. \end{gather}$$

5. Integral quantities

The vertical variation in the normalised integral quantities in the upflow, downflow and inner downflow (the portion of the downflow that falls within the separatrix) are shown in figure 6. Buoyancy fluxes and integral buoyancy are normalised by absolute values of $B_F$ and $F_0$, respectively, in order to accurately reflect the opposing or assisting action of the buoyancy force on each of the flows. We choose to discuss any flow regions in the direction of their flow, i.e. we discuss any downward flowing regions from top to bottom (that is in the direction of the downwards coordinate $z_d$).

Figure 6. Integral quantities for the upflow, downflow and inner downflow region, each normalised by the relevant source scales. The vertical dashed line marks fluxes of zero where appropriate.

Figure 6(a) shows that below $z/L_F \approx 1.11$, the upflow volume flux increases, suggesting a net volume entrainment into the upflow in this region. Above $z/L_F \approx 1.11$ the volume flux in the upflow decreases due to the volume detrainment into the downflow. The figure also shows that the volume flux in the upflow is identical to that within the inner downflow; this confirms that, by construction, the volume flux is conserved within the separatrix. The volume flux in the downflow increases from the top of the fountain showing net volume entrainment by the downflow. Noting that the downflow consists of both inner and outer downflow regions, the difference between the downflow and the inner downflow, reassuringly, confirms that fluid from the environment is entrained into the fountain outer downflow over the full height of the outer boundary. Careful observation of the streamlines in figure 4(a) confirms these above observations.

Figure 6(b) plots the normalised vertical evolution of mean vertical momentum fluxes. The mean momentum flux in the upflow, $M_u$, decreases to zero at the top of the upflow $z_i$, as the buoyancy acts to decelerate the flow; whilst this buoyancy then acts to enhance the mean momentum flux in the downflow $M_d$. The momentum flux within the inner downflow $M_{id}$ is also shown to increase from the top of the fountain until the height $z/L_F \approx 0.88$, below which $M_{id}$ then decreases back towards zero. The magnitudes of the mean momentum flux $M_u$ and $M_d$ are, perhaps surprisingly, approximately equal (despite the significant differences between the characteristic velocity and radial scales within the two flows); this suggests that, broadly speaking, fountain fluid roughly attains the same momentum flux on the way back down that it originally had on the way up.

Figure 6(c) plots the normalised turbulent vertical momentum flux. The maximum turbulent momentum flux in upflow $M'_u$ occurs relatively low down within the fountain ($z/L_F \approx 0.88$, i.e. approximately a third of the height of the fountain), the reason for this is unclear. The turbulent momentum flux in the downflow $M'_d$ continuously increases from the fountain top, in line with the suggestion that, since the buoyancy increases the mean momentum flux, the turbulent momentum flux broadly scales with the mean momentum flux. Again, for heights $z/L_F \lesssim 1.92$, there is a surprisingly close agreement between the magnitude of the turbulent momentum fluxes in the upflow and downflow, perhaps suggesting that both these turbulent fluxes might be predominantly driven by the mean momentum fluxes over much of the fountain height. In-depth analysis of the data in figures 6(b) and 6(c) shows that the ratio of turbulent and mean momentum flux $M'/M$ is greatest near the fountain top, suggesting analysis of the dynamics via mean flow statistics might be insufficient in this region.

Figure 6(d) shows that the integral buoyancy in the upflow $B_u$ is negative, while in the downflow $B_d$ is positive. Combining (4.4b) and (4.6b), confirms that the integral buoyancy is, in fact, a sink for $M_u$ but a source for $M_d$. The magnitudes of all the three flow regions peak near $z/L_F \approx 1.50$. The inner downflow region contains nearly half of the integral buoyancy in the downflow, evidence that the buoyancy within the inner downflow is more concentrated than the outer downflow (i.e. the inner downflow is denser than the outer downflow).

Figures 6(e) and 6f) show the mean and turbulent vertical buoyancy fluxes, respectively. Unlike the momentum fluxes, the turbulent buoyancy fluxes are much smaller than the mean in all flow regions, suggesting that the turbulence affects the buoyancy fluxes less than it does the momentum fluxes. The upflow mean buoyancy flux $F_u$ is negative due to its opposing buoyancy; it is noteworthy that, for $z/L_F \lesssim 1.20$, the mean buoyancy flux in the upflow is approximately constant, suggesting that, in this region, whilst the integral buoyancy within the upflow is increasing (figure 6d), a particular interplay between radial growth, upflow velocity and entrainment from the downflow, must exist to maintain this approximately constant flux which then breaks down at greater heights. When looking at the mean quantities, the inner downflow buoyancy flux is approximately half that of the total downflow. However, the turbulent buoyancy flux in the inner downflow region is a much smaller fraction of the total, implying that most of the downflowing turbulent buoyancy flux is transported in the outer downflow region. Finally, figures 6(e) and 6f) show that, although relatively weak, the turbulent buoyancy fluxes act in the same direction as the mean buoyancy fluxes within both the upflow and downflow.

6. Entrainment

The rich variety of exchanges, herein ‘entrainment’, between the fountain upflow, the returning downflow and the fountain cap is crucial in determining the bulk dynamics of fountain flows, including the interactions with the environment. We now examine these in detail.

6.1. Vertical evolution of entrainment

Figure 7 shows the entrainment terms, see (4.3), at each of the defined internal boundaries $r_i$, $r_s$ and the outer boundary $r_f$. As expected, all entrainment terms approach zero at the top of their respective boundaries (i.e. where these boundaries also approach $r=0$).

Figure 7. The vertical variation of the normalised (ac) volume entrainment, (df) total momentum entrainment and (gi) total buoyancy entrainment at the (a,d,g) inner boundary, (b,e,h) outer boundary and (cf,i) the separatrix, respectively. The mean and turbulent components of momentum and buoyancy entrainment are included. The total volume entrainment is also the mean. The dash-dotted line in (b) shows the vertical component of mean volume entrainment. The horizontal dashed line marks the fountain cap base. The vertical dashed line marks the line of zero exchange.

Results for the volume exchange at the inner boundary (the term $q_i$, figure 7a) are reassuringly supportive of the observation of the fluxes in figure 6(a). We note that, for the upflow region, there is a change from net entrainment to net detrainment at $z/L_F \approx 1.11$, where the local Froude number of upflow is $2.87$, approximately twice of the value at the fountain cap base. By construction, the mean momentum entrainment is close to zero at the inner boundary (figure 7d), but the momentum exchange associated with turbulence by the upflow is significant over much of the fountain height – this acts to reduce both the momentum fluxes of the upflow (4.4b) and downflow (4.6b), either by entrainment of downward momentum fluctuations into, or detrainment of upward momentum fluctuations from the upflow; which of these is dominant could be rigorously determined by investigations of the instantaneous transports, for example, via a quadrant plot, but this is beyond the scope of the current study. Alternatively, in terms of the turbulent stress $-\overline {u'w'}$ on the boundary, the interpretation of the reduction of upflow momentum flux is that it experiences substantial shear by the downflow, thereby decelerating the upflow. As the upflow and downflow are opposite to one another, the shear will also decelerate the downflow.

The buoyancy exchange at the inner boundary (figure 7g) exhibits significant contributions from both the mean flow and turbulence. The mean component of $f_i$ exhibits a similar variation to that of $q_i$ (figure 7a), consistent with the view that buoyancy can be both entrained and detrained by the mean flow at different heights according to $\bar{V}_g \bar {b}$. By contrast, the turbulent component of $f_i$ is negative at all heights; suggesting that, with respect to the upflow, there is either detrainment of negative buoyancy fluctuations, or entrainment of positive buoyancy fluctuations.

A schematic illustration of the net flux $q_j$, $m_j$ and $f_j$ (with $j=i,f,\textrm { or }s$) shown in figure 8 is intended to clarify the sign of the exchanges. During the following discussion, this sketch is intended to act as a useful visual reference of the exchanges. The arrows indicate the sign of the exchanges of volume, momentum and buoyancy between the vertical fluxes of relevant flow regions, at various heights within the fountain. Taking the above inner boundary as an example, in figure 8(a), the volume exchange across the inner boundary (blue line) $q_i$ below $z/L_f = 1.11$ has a leftward arrow which denotes a negative flux (in this case radially inward). Combined with (4.4a), this illustrates that $q_i$ increases the volume flux in the upflow in that region.

Figure 8. Schematic illustration depicting the sign of the exchange fluxes across the identified boundaries: right being positive and left being negative of the exchanges across the relevant boundaries within the fountain: (a) volume exchange, (b) momentum exchange and (c) buoyancy exchange. From left to right, each panel contains vertical lines: black marks the fountain's centre line, blue illustrates the inner boundary, purple the separatrix and orange the outer boundary. Green horizontal solid arrows represent the fluxes associated with the mean flow, while green dashed arrows represent those associated with turbulence. The dashed black lines mark any height at which the exchange changes sign. The grey areas represent the fountain cap region. The vertical coordinate is drawn approximately to scale, but the scale of the arrows itself does not represent the magnitude of the entrainment exchanges.

At the outer boundary (figure 7b), there is mean volume entrainment from the environment into the downflow. Inspired by the streamline patterns shown in figure 4(b), we include results for the vertical component of volume entrainment at the outer boundary within figure 7(b) for which the contribution is significant within the region $z/L_F \gtrsim 1.63$, i.e. within the fountain cap region. Our results highlight that the volume entrainment into the fountain from the environment is generally greater than the volume exchange within the fountain (see figure 7a). Figure 7(e) shows there is very low momentum entrainment into the downflow at the outer boundary due to low velocities and levels of turbulence beyond; reassuringly, the buoyancy entrainment at the outer boundary, $f_f$, is shown to be negligible (figure 7h).

Along the separatrix there is, by construction, no volume exchange associated with the mean flow (see figure 7cf,i). For $z/L_F \gtrsim 1.77$, $m_s$ is positive, becoming negative at lower heights and lessening the inner downflow momentum flux (4.8b). Despite the separatrix being at larger radial locations, the magnitude of turbulent momentum exchange there (figure 7f) is still markedly smaller than that at the inner boundary (figure 7d), suggesting weaker turbulence at the separatrix than at the inner boundary. Figure 7(i) shows that $f_s$ acts to reduce the buoyancy flux in the inner downflow. Note that the figure shows $f_s$ exhibits a linear decrease with the height up to $z/L_F \approx 1.95$, which by adding the integral buoyancy conservation equation (4.4c) and (4.8c), implies that the total vertical buoyancy flux $F+F'$ of the fountain inside the separatrix grows quadratically with the height (for which, in figure 6(e) one would need to combine the mean buoyancy flux in the upflow, blue line, with that of the inner downflow, purple line).

6.2. Integral entrainment in the fountain cap region

As one might expect, the vertical evolution of entrainment of the various quantities (figure 7) shows significant changes within the fountain cap region, e.g. sharp peaks in volume and buoyancy exchanges, and the momentum exchange $m_s$ changes the sign around the cap base (figure 7f). Note that, in this region, Williamson, Armfield & Lin (Reference Williamson, Armfield and Lin2011) suggested that the momentum transport is significantly affected by the pressure gradient, and is also the region dominated by low-frequency fluctuations that complicate the flow dynamics (e.g. Williamson et al. Reference Williamson, Armfield and Lin2011; Burridge & Hunt Reference Burridge and Hunt2013). In this subsection, we focus on fluxes apparent upon integrating the entrainment over the height of this fountain cap region.

The integral entrainment across the boundaries over the fountain cap is

(6.1ac)\begin{equation} Q_{cap,j} = \int_{z_b}^{z_t} q_j \,\textrm{d} z, \quad M_{cap,j} = \int_{z_b}^{z_t} m_j \,\textrm{d} z, \quad F_{cap,j} = \int_{z_b}^{z_t} f_j \,\textrm{d} z, \end{equation}

where $z_t=z_i$ for the inner boundary and separatrix, while $z_t=z_f$ for the outer boundary. These quantities show the volume, momentum and buoyancy exchanges, respectively, across the corresponding boundary integrated over the cap region. The values are presented in table 1 with two normalisations: firstly, by the relevant forced fountain scales, e.g. $Q_F$, $M_0$ and $|F_0|$, and secondly, by the upflowing fluxes at the cap base, namely,

(6.2)$$\begin{gather} Q_{ub} = Q_u(z_{b}) \approx 0.09Q_F, \end{gather}$$
(6.3)$$\begin{gather}M_{ub} = M_u(z_{b}) + M'_u(z_{b}) \approx 0.36M_0\quad \textrm{and}, \end{gather}$$
(6.4)$$\begin{gather}F_{ub} = F_u(z_{b}) + F'_u(z_{b}) \approx{-}0.71|F_0|. \end{gather}$$

These upflowing fluxes at the cap base highlight that around one third of the source momentum flux reaches the cap region; and nearly three quarters of the fountain's total buoyancy flux passes through the cap region. These facts, combined with the results in table 1, highlight the importance of the cap region for the dynamics of fountains. Figure 8 is intended to aid interpretation of table 1 by indicating the directions of $Q_{cap,j}$, $M_{cap,j}$ and $F_{cap,j}$.

Table 1. Integral volume, momentum and buoyancy entrainment across the boundaries within the fountain cap region, normalisation both by the relevant forced fountain scales and by the upflowing fluxes across at the cap base are presented for convenience.

Table 1 shows that the integral volume entrainment by the cap is $Q_{cap,f} = -0.22 Q_F$, combining this with the results for the bulk fountain entrainment (i.e. that the total entrainment flux for these highly forced fountains is approximately $0.77Q_F$ Burridge & Hunt Reference Burridge and Hunt2016) would suggest that more than a quarter of all the fountain's volume entrainment occurs within the cap (we note that our bottom boundary condition prohibits us making our own estimates of the bulk volume entrainment by the fountain). Meanwhile, $Q_{cap,f} = -2.40 Q_{ub}$ shows that the integral volume entrainment from the environment is approximately two and a half times larger than that injected at the cap base, agreeing with the data taken from Awin et al. (Reference Awin, Armfield, Kirkpatrick, Williamson and Lin2018) and from Talluru et al. (Reference Talluru, Williamson and Armfield2022) for a turbulent forced fountain.

Considering the exchanges across the inner boundary within the cap region, we note that $Q_{cap,i}/Q_{ub} = 1.00$ confirms that, as expected, all upcoming volume flux is detrained into the downflow region. The momentum flux detrained out of upflow, $M_{cap,i}$, is approximately 35 % of the upflowing momentum flux, suggesting around two thirds of the vertical momentum flux that enters the cap is acted on by the pressure gradient and opposing buoyancy. The integral buoyancy detrainment $F_{cap,i}/|F_{ub}| = -1.00$ shows the buoyancy flux injected into the cap is all detrained into the downflow; furthermore, more than half of this is then detrained from the inner downflow to the outer downflow ($F_{cap,s}/ |F_{ub}| = -0.60$).

6.3. Entrainment coefficients

In this section, we calculate the entrainment coefficients from our DNS data, and compare them with those employed in other studies, in particular the fountain model BK00. Classically, entrainment coefficients have been used to represent the rate of dilution of a flow; this approach has proved valuable to the modelling of a broad set of classes of turbulent free-shear flows. This concept was popularised by Morton et al. (Reference Morton, Taylor and Turner1956) (referred to as the MTT entrainment model), who successfully characterised the bulk entrainment of mass by a plume by relating the fluid entrainment velocity across the plume edge to local characteristic scales via a constant entrainment coefficient. The application of this concept to bulk-averaged models of fountains came somewhat later (Mcdougall Reference Mcdougall1981) and continues to be developed, e.g. BK00 and SH14. The most general case presented to date applies the entrainment coefficients to estimate the mass, momentum and buoyancy exchanges of the upflow and the downflow. Typically, the entrainment coefficients in models were either assumed constant with values determined by analogy to a more simple canonical flow (e.g. a jet and or a line plume, as in the case of Mcdougall (Reference Mcdougall1981), BK00), or approximated empirically based on either experimental or numerical studies of fountains (e.g. SH14).

Notably, BK00 represented the fountain upflow and downflow as two separate flows: an upward negatively buoyant jet, and a downward (annular) line plume, respectively; which both entrain via their boundaries. As a result, unlike our Reynolds-averaged statistics, they parameterised two-way entrainment at the inner boundary: the upflow entrains from the downflow with a velocity $\omega _{i}$ while the downflow entrains from the upflow with a velocity $\omega _{d}$. Meanwhile, the downflow also entrains from the environment via the outer boundary with a velocity $\omega _{f}$, see figure 12; DNS simulations, or high fidelity experiments, could enable conditionally sampled data to directly inform such a parameterisation (e.g. to parameterise simultaneous entrainment and detrainment of the upflow), should use of such a parameterisation be deemed necessary. In order that readers can check consistency with relative ease, the BK00 model and governing equations are reproduced in Appendix B using the notation and coordinate system presented herein.

BK00 considered two formulations of the body force acting on the upflow, and two formulations of the velocity scale characteristic of entrainment; in combination, this leads to four different cases to consider. In terms of the body force, the first formulation (BFI) assumed the buoyancy force acting on the upflow depends directly on the density of the environment, that is in our notation $B_u$ as evident in (4.4b) and (B1c). The second, BFII, assumed the buoyancy force is relative to the local density difference between the upflow and downflow, that is in our notation $B_u+B_d$. In agreement with SH14, we assert that BFI is a uniquely appropriate formulation for the body force; we, therefore, consider only BFI. In terms of the characteristic entrainment velocity, the first formulation considered by BK00, which we denote ‘EI’, assumed the mean entrainment velocity should be proportional to the difference in velocity between the upflow and downflow, so that the three entrainment velocities in BK00 can be written as

(6.5ac)\begin{equation} -\omega_{i}^I = \alpha_{i_{00}} (w_u+w_d) , \quad \omega_{d}^I = \alpha_{f_{00}} w_d , \quad -\omega_{f}^I = \alpha_{f_{00}} w_d , \end{equation}

where $\alpha _i$ and $\alpha _f$ are the mean volume entrainment coefficients of the upflow and downflow, respectively, the subscript ‘$00$’ denotes the variables as used in BK00 and the superscript ‘I’ denotes the entrainment formulation EI. The negative sign in $\omega _{i}$ and $\omega _{f}$ indicates entrainment velocity into upflow and downflow (see Appendix B for details). Note that BK00 parameterised the downflow as having the same entrainment coefficient $\alpha _{f_{00}}$ at both boundaries – the physical reasoning for this remains unclear.

Neglecting all the turbulent and Leibniz terms, and taking entrainment parameterisation EI, (4.4a) becomes

(6.6a,b)\begin{equation} q_i = 2\alpha_i^I r_u (w_u+w_d) , \quad q_f = 2\alpha_f^I r_d w_d , \end{equation}

where $\alpha _i^I$ and $\alpha _f^I$ are the entrainment coefficients for the upflow and downflow, respectively, that are evident from our DNS data under entrainment formulation EI. When applying entrainment formulations presented here, it should be clarified that BK00 prescribed the same constant entrainment coefficients, $\alpha _{i_{00}}$ and $\alpha _{f_{00}}$, and then applied two formulations to calculate entertainment velocities apparent within their fountain model; for our DNS data we measured the actual fluxes entrained and then directly determined the relevant entrainment coefficients. Substituting (6.5ac) into (B1a) and combining with (4.4a), provides the relationships between our entrainment coefficients and those of BK00, under formation EI, as

(6.7a,b)\begin{equation} \alpha_i^I = \alpha_{i_{00}} - \alpha_{f_{00}} \frac{w_d}{w_u+w_d}\quad \textrm{and} \quad \alpha_f^I = \alpha_f = \alpha_{f_{00}} . \end{equation}

In their second entrainment formulation ‘EII’, BK00 assumed the mean entrainment velocity is related to a characteristic velocity depending only on the relevant fraction of the total shear, i.e. the sum of the magnitude of velocity on either side of the interface. Thus the entrainment equations of BK00 under EII are

(6.8ac)\begin{equation} -\omega_{i}^{II} = \alpha_{i_{00}} w_u , \quad \omega_{d}^{II} = \alpha_{f_{00}} w_d , \quad -\omega_{f}^{II} = \alpha_{f_{00}} w_d , \end{equation}

with the relevant equations for our data being

(6.9a,b)\begin{equation} q_i = 2\alpha_i^{II} r_u w_u , \quad q_f = 2\alpha_f^{II} r_d w_d . \end{equation}

Therefore, the relationships between our entrainment coefficients and those of BK00, under formation EII, become

(6.10a,b)\begin{equation} \alpha_i^{II} = \alpha_{i_{00}} - \alpha_{f_{00}} \frac{w_d}{w_u} \quad \textrm{and} \quad \alpha_f^{II} = \alpha_f = \alpha_{f_{00}} . \end{equation}

We note that BK00 assumed constant entrainment coefficients throughout the height of the fountain and calibrated their model (against a single statistic of fountain behaviour; namely, the fountain rise height), for the four combinations of body forces and entrainment formulations, always taking the same values for each of their two entrainment coefficients, specifically $\alpha _{i_{00}} = 0.085$ and $\alpha _{f_{00}} = 0.147$ – for this reason our notation does not distinguish between entrainment formulations when denoting the coefficients of the BK00 model.

The other fountain model worthy of consideration is that of SH14; they assumed that only entrainment by the upflow occurred at the inner boundary (i.e. only inward exchanges over the full height of their upflow $z/L_F \leqslant 1.62$). With this assumption, (6.7a,b) and (6.10a,b) reduce to $\alpha _i^{I} = \alpha _i^{II} = \alpha _{i_{00}}$. SH14 took the inner boundary entrainment coefficient to be $\alpha _i =0.06$, and $\alpha _f = 0.15$ for the entrainment coefficient at downflow at outer boundary (these values being loosely based on those reported in the studies of Williamson et al. Reference Williamson, Armfield and Lin2011; Burridge & Hunt Reference Burridge and Hunt2013) – the precedents set by SH14's model were followed by Debugne & Hunt (Reference Debugne and Hunt2016).

Examination of figure 9, which plots our measurements of the entrainment coefficients and those used in fountain models thus far, challenges the validity of the entrainment assumptions that underpin the important contributions to the fountain modelling of BK00, SH14 and Debugne & Hunt (Reference Debugne and Hunt2016). The figure plots the values of $\alpha _{i}$ and $\alpha _{f}$, according to both entrainment formulations, i.e. calculated from our DNS data according to (6.6a,b) and (6.9a,b). Firstly, comparison of our data with those of Milton-McGurk et al. (Reference Milton-McGurk, Williamson, Armfield and Kirkpatrick2022) yields similar values – Milton-McGurk et al. (Reference Milton-McGurk, Williamson, Armfield and Kirkpatrick2022), to our knowledge, being the only other study to report the vertical variation of entrainment coefficient at the inner boundary of highly forced fountains ($Fr \geqslant 15$) based on measurements (therein under entrainment formulation EI and reported as a variation with the local Richardson number of the upflow). Both studies determine that the entrainment coefficient changes sign at a particular height within the upflow. Secondly, irrespective of the entrainment formulation chosen, the notable variation in our measurements of $\alpha _{i}$ and $\alpha _{f}$ with height renders the assumption of constant $\alpha _{f}$ in BK00, and constant $\alpha _{i}$ and $\alpha _{f}$ in SH14, as questionable. Thirdly, (6.7a,b) and (6.10a,b) provide the relationships that must hold true for the entrainment modelling at the inner boundary of BK00 to be valid.

Figure 9. The vertical evolution of entrainment coefficients both calculated based on Reynolds averaging our DNS data ($\alpha _{i}^{I}$, $\alpha _{i}^{II}$ and $\alpha _{f}$, see (6.6a,b) and (6.9a,b)) and, for direct comparison, the appropriately adjusted entrainment coefficients used in BK00, SH14 and Debugne & Hunt (Reference Debugne and Hunt2016) (who used same entrainment coefficients as SH14) are also plotted. (a) The entrainment coefficients of the upflow at the inner boundary ($\alpha _{i}^{I}$ and $\alpha _{i}^{II}$, shown as blue dashed line and solid line, respectively), the entrainment coefficients of BK00 presented in adjusted form (lines with mark, using velocity scales from our DNS and taking the entrainment constants from BK00, namely $\alpha _{i_{00}} = 0.085$ and $\alpha _{f_{00}} = 0.147$, see (6.7a,b) and (6.10a,b)) and the value used in both SH14 and Debugne & Hunt (Reference Debugne and Hunt2016), $\alpha _{i}=0.06$ (vertical black line). The vertical dashed line marks zero coefficient. (b) The entrainment coefficient of the downflow at the outer (orange line) calculated from (6.6a,b) and (6.9a,b) – which give the identical result, and the entrainment coefficients used in BK00 and SH14 (thin black solid line and dashed line, respectively).

Figure 9(a) plots the left-hand side of (6.7a,b) and (6.10a,b), i.e. the equivalent entrainment coefficients calculated from our data, namely, $\alpha _i^I$ and $\alpha _i^{II}$. In addition, it shows the profiles that follow from the existing theory, by substituting the constants used in BK00, i.e. $\alpha _{i_{00}} = 0.085$ and $\alpha _{f_{00}} = 0.147$ into the right-hand side of (6.7a,b) and (6.10a,b), and using our measured values of the velocity scales. It is clear from the figure that these relationships do not hold true for the values taken; furthermore, we have tested various other choices for the entrainment constants within the BK00 formulation and there is an equally poor agreement for all physically reasonable entrainment constants. These facts highlight that an integral model of fountains, that captures the exchanges within the fountain, is yet to be developed, or at least parameterised appropriately. Integral models, to date, have been parameterised based on matching a single measurable statistic of fountain behaviour, the fountain height (albeit sometimes both the initial and steady rise heights, e.g. Debugne & Hunt Reference Debugne and Hunt2016), but our results suggest that no integral model has even been able to qualitatively captured the appropriate exchanges within fountains. As such, the agreement with the calibrated metric might be unique and all other fountain metrics from such models may be questionable. We have shown, § 6.1, that the total buoyancy exchanges, and the mean volume entrainment at the inner boundary, broadly follow a similar dependence of the vertical coordinate (see figure 7a,g); combined with figure 9, it shows that fountain models are yet to provide the capability to predict these fundamental exchanges which must affect the total weight of fountain fluid supported by a given source momentum flux. This highlights a major research challenge in fountain modelling, future models of fountains should seek validation via multiple statistics, not a single criterion (e.g. fountain height) as has been carried out previously.

In addition, by their very construction, bulk-averaged fountain models (e.g. BK00 and SH14) did not account for the turbulent exchanges within fountains, e.g. turbulent momentum entrainment and turbulent buoyancy entrainment. We have shown in §§ 5 and 6.1 that there is significant integral vertical turbulent momentum flux ($M'$, see figure 6c), and turbulent momentum exchanges and turbulent buoyancy exchanges at the inner boundary (turbulent component of $m_i$ and $f_i$, respectively, see figure 7d,g). Hence, we challenge future models of fountains to account for these exchanges driven by turbulence, at the very least implicitly, within their parameterisation.

Following the BK00 model, but considering entire budgets (we choose to consider only EII, a choice of little consequence), the total momentum entrainment (4.4b) and total buoyancy entrainment (4.4c) are

(6.11a)$$\begin{gather} m_i = 2 \alpha_{i,m} r_u w_u^2 , \end{gather}$$
(6.11b)$$\begin{gather}f_i = 2 \alpha_{i,f} r_u w_u b_u . \end{gather}$$

Figure 10 shows entrainment coefficients for momentum $\alpha _{i,m}$ and buoyancy $\alpha _{i,f}$ given by (6.11), respectively. The figure, for contrast, also re-plots $\alpha _i^{II}$, from (6.10a,b), the plot clearly highlights that taking the same entrainment coefficient to parameterise exchanges of volume, momentum and buoyancy is inappropriate. More research is clearly needed to determine a suitable route to developing appropriate models of turbulent fountains; our leading suggestion is that the latest understanding of transports across both TNTIs and TTIs be considered in depth. Note that we do not present the entrainment coefficients decomposed into mean and turbulent components due to the lack of self-similarity of the radial profiles within the fountain (cf. Milton-McGurk et al. Reference Milton-McGurk, Williamson, Armfield and Kirkpatrick2022).

Figure 10. The entrainment coefficients for the upflow from our data: volume entrainment $\alpha _i$ from (6.10a,b), momentum $\alpha _{m,i}$ obtained from the budget (6.11a) and buoyancy $\alpha _{f,i}$ from the budget (6.11b); i.e. all consistent with BK00's EII formulation.

7. Conclusion

The structure of a forced fountain was investigated by decomposing the fountain into regions based on two distinct internal boundaries. The first comprised the classical decomposition into an upflow and a downflow, via the internal boundary $r_i(z)$ characterised by the loci of zero vertical velocity. The second exploited a separatrix, a streamline $r_s(z)$ that forms the boundary between the flow emitted from the source and entrained from the environment. Both of these boundaries are TTIs, which can have both mean and turbulent entrainment across their boundary. For the internal boundaries investigated here, we showed that, for the boundary $r_i$, entrainment fluxes are large and consist both of mean and turbulent components. However, the boundary $r_s$ by construction exhibits zero mean entrainment, since it is a streamline; hence, only turbulent exchanges can occur.

The findings reported herein indicate that turbulent entrainment fluxes across the internal boundary are of similar magnitude to, and sometimes larger than, the mean entrainment fluxes. This has important implications for the modelling of turbulent entrainment. Indeed, the classical view of entrainment considers mean entrainment only, which then implies that an associated entrainment velocity can be defined across the interface, and entrainment of all other quantities (e.g. momentum, buoyancy) can then simply be obtained by multiplying that entrainment velocity by some local characteristic value of that quantity. The DNS data broadly supported this observation, in that the vertical variation of the fluxes of mean volume entrainment and mean buoyancy entrainment across $r_i$ exhibited a similar form (note the mean momentum entrainment which was zero by construction on $r_i$). However, the vertical variation of turbulent entrainment fluxes across $r_i$ exhibits an entirely different form to the mean entrainment fluxes and therefore requires different modelling. Even for the ‘classical’ (mean volume) entrainment flux, the agreement between our DNS data and existing models was poor when the entrainment flux was normalised by suitable local characteristic scales, suggesting that parameterisation following MTT and deploying a constant entrainment coefficient is inappropriate for fountains and needs to be reconsidered. We further showed that different magnitudes of values are required for the respective entrainment coefficients to appropriately parameterise either mean entrainment, turbulent momentum entrainment or turbulent buoyancy entrainment. This reinforces our suggestion that alternative modelling strategies, perhaps guided by more detailed studies of the transport across TNTIs and TTIs, might be fruitful if predictions of fountain behaviour, beyond their rise heights, are required. This is of relevance to many applications of fountains, for example, those produced within under floor air distribution systems (Lin & Linden Reference Lin and Linden2005) where predictions of fountain rise height only determine the vertical extent within the room that the cool air might rise; the cooling effect that occupants feel is further affected by the temperature of the rising and falling cooler air – this depends both on the fountain's mixing with the environment and the mixing within the fountain's internal structure.

Finally, we assert that, without greater regard to the modelling of the fountain cap region, insufficient progress might be made. In this region the flow is entirely dominated by the formation and collapse of large-scale turbulent structures – characterised by periodic fluctuations in fountain rise height and responsible for the dark bands typically seen in time series images of fountain (e.g. see figure 3 and Burridge & Hunt Reference Burridge and Hunt2012). Fountain modelling to date has focused on models that reflect only quantities of the mean flow – our results suggest that both turbulent exchanges, and the transient nature of the fountain cap region, may be of importance in future modelling efforts.

Supplementary movie

Supplementary movie is available at https://doi.org/10.1017/jfm.2023.210.

Funding

The computations were performed on the UK National Supercomputing Service ARCHER2 and were made possible by the EPSRC-funded UK Turbulence Consortium (grant reference EP/R029326/1).

Declaration of interests

The authors report no conflict of interest.

Appendix A. Comparison with smaller flow domain

To validate that the effect of the domain size, in particular the sidewall periodic boundary condition, was insignificant in our results we simulated identical source conditions in a ‘small’ domain (of volume $(100r_0)^3$ and grid size $1024^3$); we refer to the domain used to simulate all other results presented herein as ‘standard’.

Figure 11(a) plots the fountain inner boundary, $r_i$, and outer boundary, $r_f$, for simulations in both the standard and small domains. The effects of domain size on the fountain boundaries are negligible, particularly when one notes that we discard all results for the downflow (including $r_f$) below the height $z/L_F = 0.66$, with the typical change in the radial location of the boundaries with domain size being less than 7 %. Moreover, by integrating the volume of fountain $V = \int _0^{z_f} 2 {\rm \pi}r_f(z) \,\textrm {d}z= 82\,730\,r_0^3 \approx 8.70 L_F^3$, the fountain occupies around $3\,\%$ of the standard domain, suggesting the standard domain is of an appropriate size.

Figure 11. (a) Fountain boundaries, inner boundary $r_i$ (blue) and outer $r_f$ (orange) both from the standard domain (solid lines) and a small domain (dashed lines). (b) From the standard domain, the fountain outer boundary using a buoyancy threshold of $0.01\,\bar {b}_{cc}$ (solid line), $0.02\,\bar {b}_{cc}$ (dot-dashed line) and $0.005\,\bar {b}_{cc}$ (dotted line). The horizontal black line marks $z/L_F=0.66$ below where the data of downflow are discarded. Mean volume entrainment at inner boundary $q_i$ (c) and at outer boundary $q_f$ (d) of the standard domain (solid lines) and small domain (dashed lines) respectively.

To check the location of the outer boundary is relatively insensitive to the choice of buoyancy threshold ($\bar {b} = 0.01 \bar {b}_{cc}$), figure 11(b) plots the outer boundary using both a larger threshold, $\bar {b} = 0.02 \bar {b}_{cc}$, and a smaller threshold, $\bar {b} = 0.005 \bar {b}_{cc}$. The figure evidences that the outer boundary is indeed insensitive to the choice threshold, within our range of interest and especially above $z/L_F= 0.66$. We therefore conclude that our outer boundary, $r_f$, contains the vast majority of fountain fluid and is appropriate.

To ensure the entrainment at the boundaries is also less influenced by the domain, figures 11(c) and 11(d) plot the mean volume entrainment $q_i$ and $q_f$ of two domains, respectively. The lines agree well although there is a relatively greater difference in $q_f$ near the fountain top. By calculating the integral volume entrainment of the fountain cap $Q_{cap}$, the value of the small domain is approximately $-0.19Q_F$, not far from the value of the standard domain which is $-0.22Q_F$.

Appendix B. The integral equations of BK00

In order to provide a direct comparison of the entrainment coefficients of the well-established BK00 model with those presented herein, i.e. those apparent on rigorous application of Reynolds averaging of the governing equations, we first present the BK00 model in our notation (the notation introduced in § 4) within figure 12. The velocities $\omega _{i}$, $\omega _{d}$ characterise the two-way entrainment across the inner boundary, and $\omega _{f}$ characterises the entrainment at the outer boundary. As these velocities are defined under our outward horizontal direction, $\omega _{i}$ and $\omega _{f}$ here should be associated with a negative sign to represent the entrainment velocity into the respective flow.

Figure 12. Fountain model BK00, with the arrows indicating the direction of variables.

In the model of BK00, the integral fluxes are defined equivalently to those defined in (4.5ac)–(4.7ac) and note that the BK00 model assumed (top-hat) uniform fluid properties and velocities in each flow region. BK00 directly applied integral conservation laws for volume, momentum and buoyancy fluxes which resulted in

(B1a)$$\begin{gather} \frac{\textrm{d} Q_u}{\textrm{d} z} = 2r_u (-\omega_{i}) - 2r_u \omega_{d} , \end{gather}$$
(B1b)$$\begin{gather}\frac{\textrm{d} Q_d}{\textrm{d} z_d} = 2r_d (-\omega_{f}) - 2r_u (-\omega_{i}) + 2r_u \omega_{d} , \end{gather}$$
(B1c)$$\begin{gather}\frac{\textrm{d} M_u}{\textrm{d} z} = B_u + 2r_u (-\omega_{i}) ({-}w_d) - 2r_u \omega_{d} w_u , \end{gather}$$
(B1d)$$\begin{gather}\frac{\textrm{d} M_d}{\textrm{d} z_d} = B_d + 2r_u \omega_{d} ({-}w_u) - 2r_u (-\omega_{i}) w_d , \end{gather}$$
(B1e)$$\begin{gather}\frac{\textrm{d} F_u}{\textrm{d} z} = 2r_u (-\omega_{i}) ({-}b_d) - 2r_u \omega_{d} b_u , \end{gather}$$
(B1f)$$\begin{gather}\frac{\textrm{d} F_d}{\textrm{d} z_d} = 2r_u \omega_{d} ({-}b_u) - 2r_u (-\omega_{i}) b_d . \end{gather}$$

As is typical, BK00 considered mean integral fluxes only, and thus the terms $M_u', P_u, F_u',M_d', P_d$ and $F_d'$ in (4.4) and (4.6) are identically zero. Momentum and buoyancy entrainment from the environment is assumed to be negligible. As discussed in § 6.1, BK00 use two-way entrainment at the inner boundary, which then implicitly contains the Leibniz contributions to the exchange.

We note that the BK00 model assumes top-hat conditions which imply that the upflow region has a width $r_u = Q_u/M_u^{1/2}$; in reality, the profiles are not top-hat and thus the actual internal boundary is located at a greater radial position and equivalent to $r_i \approx 1.25 r_u$. Another consequence of the top-hat assumption is that the momentum and buoyancy on the boundary are equivalent to their values in the upflow or downflow.

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Figure 0

Figure 1. Schematic illustrating the entrainment of volume and scalars across interfaces separating the flow within the chosen region of interest, which is by definition turbulent, and the environment. Two different cases emphasise our chosen terminology: (a) a non-turbulent environment, and (b) a turbulent environment. Transport or exchanges across the interface, here all termed ‘entrainment’, are illustrated by arrows; for each entrainment, the associated transport term and its naming convention are highlighted. Black arrows represent the entrainment that is associated with the mean flow, while the red arrow represents that associated with the turbulence.

Figure 1

Figure 2. The whole simulation domain with an illustration of an instantaneous fountain depicted by plotting an isosurface of buoyancy, coloured according to the local vertical velocity. The unit of the length is the number of nodes.

Figure 2

Figure 3. Time series of normalised local integral buoyancy, $\mathcal {B}(z,t)/\mathcal {B}_0$, within the fountain. The instantaneous fountain height is outlined by the solid line. The horizontal dashed line marks the initial height and the dash-dotted line marks mean steady height. Within the figure, the darker shades of blue represent the greater negative buoyancy.

Figure 3

Figure 4. The normalised mean vertical velocity $\bar {w}/w_F$, where $w_F = M_0^{1/4}|F_0|^{1/2}$, within the time-averaged fountain marked by colour with regions of: upward velocities shaded red, downward shaded blue and zero vertical velocity being white. (a) Highlights the internal structure of the fountain by overlaying the vertical velocities with relevant boundaries: the inner boundary (blue line), outer boundary (red line) and the separatrix (purple line). The thin dash-dotted line marks the loci of points where the maximum downflow vertical velocity occurs. (b) The vertical velocities are overlaid with velocity streamlines. The fountain cap base is marked by the horizontal dashed line.

Figure 4

Figure 5. The normalised mean buoyancy field $\bar {b}/b_F$, $b_F =M_0^{-5/4}|F_0|^{3/2}$, overlaid with three fountain boundaries presented in figure 4 and: (a) field lines of mean buoyancy flux $\{\bar {u}\bar {b},\bar {w}\bar {b}\}$, where the grey lines mark the field lines outside the separatrix; (b) field lines of total buoyancy flux $\{ \bar {u}\bar {b}+\overline {u'b'}, \bar {w}\bar {b}+\overline {w'b'} \}$.

Figure 5

Figure 6. Integral quantities for the upflow, downflow and inner downflow region, each normalised by the relevant source scales. The vertical dashed line marks fluxes of zero where appropriate.

Figure 6

Figure 7. The vertical variation of the normalised (ac) volume entrainment, (df) total momentum entrainment and (gi) total buoyancy entrainment at the (a,d,g) inner boundary, (b,e,h) outer boundary and (cf,i) the separatrix, respectively. The mean and turbulent components of momentum and buoyancy entrainment are included. The total volume entrainment is also the mean. The dash-dotted line in (b) shows the vertical component of mean volume entrainment. The horizontal dashed line marks the fountain cap base. The vertical dashed line marks the line of zero exchange.

Figure 7

Figure 8. Schematic illustration depicting the sign of the exchange fluxes across the identified boundaries: right being positive and left being negative of the exchanges across the relevant boundaries within the fountain: (a) volume exchange, (b) momentum exchange and (c) buoyancy exchange. From left to right, each panel contains vertical lines: black marks the fountain's centre line, blue illustrates the inner boundary, purple the separatrix and orange the outer boundary. Green horizontal solid arrows represent the fluxes associated with the mean flow, while green dashed arrows represent those associated with turbulence. The dashed black lines mark any height at which the exchange changes sign. The grey areas represent the fountain cap region. The vertical coordinate is drawn approximately to scale, but the scale of the arrows itself does not represent the magnitude of the entrainment exchanges.

Figure 8

Table 1. Integral volume, momentum and buoyancy entrainment across the boundaries within the fountain cap region, normalisation both by the relevant forced fountain scales and by the upflowing fluxes across at the cap base are presented for convenience.

Figure 9

Figure 9. The vertical evolution of entrainment coefficients both calculated based on Reynolds averaging our DNS data ($\alpha _{i}^{I}$, $\alpha _{i}^{II}$ and $\alpha _{f}$, see (6.6a,b) and (6.9a,b)) and, for direct comparison, the appropriately adjusted entrainment coefficients used in BK00, SH14 and Debugne & Hunt (2016) (who used same entrainment coefficients as SH14) are also plotted. (a) The entrainment coefficients of the upflow at the inner boundary ($\alpha _{i}^{I}$ and $\alpha _{i}^{II}$, shown as blue dashed line and solid line, respectively), the entrainment coefficients of BK00 presented in adjusted form (lines with mark, using velocity scales from our DNS and taking the entrainment constants from BK00, namely $\alpha _{i_{00}} = 0.085$ and $\alpha _{f_{00}} = 0.147$, see (6.7a,b) and (6.10a,b)) and the value used in both SH14 and Debugne & Hunt (2016), $\alpha _{i}=0.06$ (vertical black line). The vertical dashed line marks zero coefficient. (b) The entrainment coefficient of the downflow at the outer (orange line) calculated from (6.6a,b) and (6.9a,b) – which give the identical result, and the entrainment coefficients used in BK00 and SH14 (thin black solid line and dashed line, respectively).

Figure 10

Figure 10. The entrainment coefficients for the upflow from our data: volume entrainment $\alpha _i$ from (6.10a,b), momentum $\alpha _{m,i}$ obtained from the budget (6.11a) and buoyancy $\alpha _{f,i}$ from the budget (6.11b); i.e. all consistent with BK00's EII formulation.

Figure 11

Figure 11. (a) Fountain boundaries, inner boundary $r_i$ (blue) and outer $r_f$ (orange) both from the standard domain (solid lines) and a small domain (dashed lines). (b) From the standard domain, the fountain outer boundary using a buoyancy threshold of $0.01\,\bar {b}_{cc}$ (solid line), $0.02\,\bar {b}_{cc}$ (dot-dashed line) and $0.005\,\bar {b}_{cc}$ (dotted line). The horizontal black line marks $z/L_F=0.66$ below where the data of downflow are discarded. Mean volume entrainment at inner boundary $q_i$ (c) and at outer boundary $q_f$ (d) of the standard domain (solid lines) and small domain (dashed lines) respectively.

Figure 12

Figure 12. Fountain model BK00, with the arrows indicating the direction of variables.

Huang et al. Supplementary Movie

The buoyancy field of the fountain from startup to fully developed. The field is normalised by the source buoyancy b_0.

Download Huang et al. Supplementary Movie(Video)
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