1. Introduction
Practically almost all of the turbulent flows around us contain tiny particles suspended in them. The movement of these particles as they are carried along seemingly erratic trajectories is central to our physical intuition of turbulent transport. Following their motion in a Lagrangian manner offers unique insights that cannot be perceived from the more traditional Eulerian viewpoint of the fluid velocity at fixed points in space (La Porta et al. Reference La Porta, Voth, Crawford, Alexander and Bodenschatz2001). Consider a tiny, inertialess, spherical object advected by a fluid flow. The trajectory it traces is identical to that of the surrounding fluid: adopting not just the local fluid velocity, but also the angular velocity (rotation rate) of the fluid. Yet, even as the particle tightly adheres to these movements, we miss out on a few crucial, defining features of the flow; the spherical particle is essentially immune to the local strain rate. Fortunately, this crucial ingredient of the flow can be probed if the particle were to morph into an ellipsoid. The picture of an elongated or flattened entity (rod-like or disk-like) advected by the turbulent field approximates quite nicely the shapes of bacteria and plankton in the turbulent oceans. Often, the behavioural responses of these organisms in natural environments are triggered by rotational motions, which arise as a result of the local velocity gradients in the fluid phase (Guasto, Rusconi & Stocker Reference Guasto, Rusconi and Stocker2012).
While it may appear simple to seed a turbulent flow with tiny ellipsoidal tracers and observe their kinematics, in practice, the tinier the particle the trickier it is to observe the rotations. Hence, the initial impetus in this field was certainly on the numerical side. The model equation governing the rotation of a small, non-inertial, ellipsoidal particle has been well within our grasp, thanks to the pioneering works of Jeffery (Reference Jeffery1922) and many others who verified its applicability (Voth & Soldati Reference Voth and Soldati2017). The axisymmetric ellipsoid (spheroid) essentially rotates in response to two torques: one tending to make the particle adopt the same rotation as the surrounding fluid (like a spherical tracer), and the other aligning the particle's axes parallel to the principal axes of distortion of the fluid. A vast number of studies were launched over the past two decades, solving Jeffery's equation along Lagrangian fluid trajectories for many canonical fluid flows (Voth & Soldati Reference Voth and Soldati2017). Shin & Koch (Reference Shin and Koch2005) were one of the first to study the anisotropic particle dynamics using direct numerical simulations (DNS); their particle was a rod-like fibre (a prolate spheroid), while for the flow field they chose the emblematic homogeneous isotropic turbulence.
For axisymmetric particles, it is convenient to decompose the angular velocity $\boldsymbol {\omega }_{\boldsymbol {p}}$ into spinning, $(\boldsymbol {\omega }_{\boldsymbol {p}} \boldsymbol {\cdot } \boldsymbol {p})$, and tumbling, $\boldsymbol {\dot {p}} \equiv (\boldsymbol {\omega _p} \times \boldsymbol {p})$, components, with $\boldsymbol {p}$ representing the symmetry axis unit vector, and $\vert \boldsymbol {\omega _p}\vert = \sqrt {(\boldsymbol {\omega }_{\boldsymbol {p}} \boldsymbol {\cdot } \boldsymbol {p})^2 + \boldsymbol {\dot {p}}^2}$. If the particles were to randomly orient themselves in the turbulent field, their mean-square tumbling rate can be analytically obtained as $\langle \boldsymbol {\dot {p}}^2 \rangle = {1}/{\tau _\eta ^2}[{1}/{6} + {1}/{10} (({\mathcal {AR}^2 -1})/({\mathcal {AR}^2 + 1}))^2]$, where $\mathcal {AR}$ is the aspect ratio of the spheroid, and $\tau _\eta$ is the dissipative time scale (Parsa et al. Reference Parsa, Calzavarini, Toschi and Voth2012; Chevillard & Meneveau Reference Chevillard and Meneveau2013). However, this prediction is at striking odds with both experiments and simulations of spheroids advected through isotropic turbulence (Parsa et al. Reference Parsa, Calzavarini, Toschi and Voth2012; Byron et al. Reference Byron, Einarsson, Gustavsson, Voth, Mehlig and Variano2015; Ni et al. Reference Ni, Kramel, Ouellette and Voth2015). For prolate spheroids ($\mathcal {AR} \gg 1$), the measurements are smaller by nearly a factor of 3 than the predicted value ($\approx$ 4/15) for randomly distributed orientations.
A qualitative explanation for this disparity can be found by assessing the particle's preferential alignment with the velocity gradients of the flow. Since the velocity gradients are finite-time correlated in turbulent flows, Lagrangian stretching would align rods ($\mathcal {AR} \gg 1$) with the vorticity $\boldsymbol {\omega }_{\boldsymbol {f}}$, while disks ($\mathcal {AR} \ll 1$) tend to align their symmetry axis perpendicular to $\boldsymbol {\omega }_{\boldsymbol {f}}$ (Pumir & Wilkinson Reference Pumir and Wilkinson2011; Gustavsson, Einarsson & Mehlig Reference Gustavsson, Einarsson and Mehlig2014). Yet, a simple and elegant quantitative prediction of the mean-square spinning and tumbling rates is still missing. Further, the question of how the particle's size – in relation to the size of the turbulent eddies – affects the rotational statistics awaits a deeper evaluation. Now, Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) have shed light on these issues through a careful numerical and theoretical exploration of spheroids advected by turbulence. Their results suggest the existence of an underlying scale invariance for the rotational statistics within the Lagrangian framework.
2. Overview
Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) tackled the problem using a two-pronged approach. On one front, the spheroid aspect ratio was varied from oblate ($\mathcal {AR} \ll 1$) to prolate ($\mathcal {AR} \gg 1$). Concurrently, for sampling the various scales of turbulent motion, they resorted to a ‘filtered flow’ approach. The filter scale $\ell$ was varied from the very small ($\ell < \eta$) to the very large ($\ell = L$), where $\eta$ and $L$ are the dissipative and integral scales, respectively. This allowed for quantification of how the scales of turbulent motion impact the Lagrangian statistics of particle rotation.
In agreement with previous studies (Voth & Soldati Reference Voth and Soldati2017), Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) noted that the mean-square total rotation rate (MSR) of spheroids is almost independent of the particle's aspect ratio (shape invariance). With the shape invariance evident, the magnitude of the MSR can be straightforwardly deduced to be equal to $\langle \boldsymbol {\omega }_{\boldsymbol {f}}^2 \rangle /{4}$, because a spherical particle – which rotates identically as the fluid – lies within the range of the shape invariance. The authors elegantly derive expressions for the spinning and tumbling components of MSR by invoking one assumption – that the degree of alignment for the particle with the vorticity direction, $\boldsymbol{e_{\omega_f}}\kern-0.9pt$, is independent of the magnitude of $\boldsymbol{\omega_f}$. The predicted spinning and tumbling rates for all aspect ratios ($\mathcal {AR} \in [0.1, 10]$) are shown by the solid lines in figure 1(a). The simulation results – obtained by integrating Jeffery's equation along the Lagrangian trajectories – are in reasonable agreement with the authors’ predictions. Deviations are surely noticeable, but it may be worthwhile to note that Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) have managed to reduce a seven-parameter problem (Ni et al. Reference Ni, Kramel, Ouellette and Voth2015) into one that depends only on the alignment between the particle and the vorticity vector.
Figure 1. (a) Normalised mean-square particle angular velocity, $\langle \boldsymbol {\omega }_{\boldsymbol {p}}^2 \rangle$, and its decomposition into spinning and tumbling components for spheroids in turbulence (unfiltered DNS data). (b) Nearly scale-invariant behaviour for the spinning rates for all particle shapes. In (a,b), symbols are from the numerical simulations, and the solid lines give the predictions. Figures and data adapted from Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021).
The turbulent field considered in figure 1(a) is fully resolved; note that the normalisation time scale used is $\tau _\eta$. If a spatial filter of intermediate scale $\ell$ is applied to this flow field, not surprisingly the filtered flow would smooth out the fluctuations and hence the spinning and tumbling rates would be suppressed as compared with the fully resolved DNS case (unfiltered case). However, Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) provide a set of convincing arguments that the magnitude of these suppressed rotations is captured by considering the scale-dependent time scale $\tau _\ell \sim \ell ^{2/3}$. Figure 1(b) provides a demonstration of this nearly scale-invariant rotational behaviour for particles of all aspect ratios. This scaling (first introduced by Parsa & Voth (Reference Parsa and Voth2014) for rods in turbulence) has found good use in a variety of settings (Mathai et al. Reference Mathai, Neut, van der Poel and Sun2016; Pujara et al. Reference Pujara, Oehmke, Bordoloi and Variano2018). And now, the authors have extended its applicability to scales spanning the entire spatial extent of the turbulent flow – from the Kolmogorov scale to the integral scale – and across many particle geometries.
3. Outlook
The filtered flow approach by Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) might offer some insights about the ways in which finite-sized anisotropic particles respond to the scales of turbulent motion. However, it is crucial to note that the analyses here rely on the assumption (of Jeffery's equation) that the scales of motion in the flow are large compared with the particle's size. Furthermore, finite-sized particles likely deviate from the trajectories of fluid elements. The resulting slipping motion is certain to induce flow modifications that necessitate a reformulation of the torques acting on the particle (Voth & Soldati Reference Voth and Soldati2017; Pujara et al. Reference Pujara, Oehmke, Bordoloi and Variano2018).
The conclusions by Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) also hint at the possibility that fully resolved simulations may not be necessary to compute the rotational statistics of anisotropic particles. This would enable a coarse-grained simulation approach (such as large eddy simulations or truncated DNS) to sufficiently capture the rotational statistics even for sub-filter-scale particles. Its applicability though is likely to be limited to the mean-square rotation rates because quantities such as the particle's angular accelerations or the higher moments of its rotation – reflective of the rare events in turbulence – are unlikely to be scale invariant (Zimmermann et al. Reference Zimmermann, Gasteuil, Bourgoin, Volk, Pumir and Pinton2011). It is also our belief that the observed power law scalings in Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) would benefit from future explorations at higher Reynolds numbers – a wider scale separation could provide a more rigorous test of the scale invariance.
The rotational statistics observed by Pujara et al. (Reference Pujara, Oehmke, Bordoloi and Variano2018) require a closer inspection in the context of particulate flows (Voth & Soldati Reference Voth and Soldati2017). As the authors carefully note, the scale invariance might only be indicative of the trends to be expected for realistic particles. Indeed, deviations are sure to arise when the effects of particle size or density or buoyancy or rotational diffusion become dominant. Despite all of these, the results of Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) have provided a glimpse into some of the underlying simplicity of the Lagrangian rotational statistics for a system that is governed by complex shape- and scale-dependent couplings between the particle and the turbulent velocity gradients. In this regard, it is our hope that this work will stimulate the development of similarly elegant models with a wider scope of applicability.
1. Introduction
Practically almost all of the turbulent flows around us contain tiny particles suspended in them. The movement of these particles as they are carried along seemingly erratic trajectories is central to our physical intuition of turbulent transport. Following their motion in a Lagrangian manner offers unique insights that cannot be perceived from the more traditional Eulerian viewpoint of the fluid velocity at fixed points in space (La Porta et al. Reference La Porta, Voth, Crawford, Alexander and Bodenschatz2001). Consider a tiny, inertialess, spherical object advected by a fluid flow. The trajectory it traces is identical to that of the surrounding fluid: adopting not just the local fluid velocity, but also the angular velocity (rotation rate) of the fluid. Yet, even as the particle tightly adheres to these movements, we miss out on a few crucial, defining features of the flow; the spherical particle is essentially immune to the local strain rate. Fortunately, this crucial ingredient of the flow can be probed if the particle were to morph into an ellipsoid. The picture of an elongated or flattened entity (rod-like or disk-like) advected by the turbulent field approximates quite nicely the shapes of bacteria and plankton in the turbulent oceans. Often, the behavioural responses of these organisms in natural environments are triggered by rotational motions, which arise as a result of the local velocity gradients in the fluid phase (Guasto, Rusconi & Stocker Reference Guasto, Rusconi and Stocker2012).
While it may appear simple to seed a turbulent flow with tiny ellipsoidal tracers and observe their kinematics, in practice, the tinier the particle the trickier it is to observe the rotations. Hence, the initial impetus in this field was certainly on the numerical side. The model equation governing the rotation of a small, non-inertial, ellipsoidal particle has been well within our grasp, thanks to the pioneering works of Jeffery (Reference Jeffery1922) and many others who verified its applicability (Voth & Soldati Reference Voth and Soldati2017). The axisymmetric ellipsoid (spheroid) essentially rotates in response to two torques: one tending to make the particle adopt the same rotation as the surrounding fluid (like a spherical tracer), and the other aligning the particle's axes parallel to the principal axes of distortion of the fluid. A vast number of studies were launched over the past two decades, solving Jeffery's equation along Lagrangian fluid trajectories for many canonical fluid flows (Voth & Soldati Reference Voth and Soldati2017). Shin & Koch (Reference Shin and Koch2005) were one of the first to study the anisotropic particle dynamics using direct numerical simulations (DNS); their particle was a rod-like fibre (a prolate spheroid), while for the flow field they chose the emblematic homogeneous isotropic turbulence.
For axisymmetric particles, it is convenient to decompose the angular velocity $\boldsymbol {\omega }_{\boldsymbol {p}}$ into spinning, $(\boldsymbol {\omega }_{\boldsymbol {p}} \boldsymbol {\cdot } \boldsymbol {p})$, and tumbling, $\boldsymbol {\dot {p}} \equiv (\boldsymbol {\omega _p} \times \boldsymbol {p})$, components, with $\boldsymbol {p}$ representing the symmetry axis unit vector, and $\vert \boldsymbol {\omega _p}\vert = \sqrt {(\boldsymbol {\omega }_{\boldsymbol {p}} \boldsymbol {\cdot } \boldsymbol {p})^2 + \boldsymbol {\dot {p}}^2}$. If the particles were to randomly orient themselves in the turbulent field, their mean-square tumbling rate can be analytically obtained as $\langle \boldsymbol {\dot {p}}^2 \rangle = {1}/{\tau _\eta ^2}[{1}/{6} + {1}/{10} (({\mathcal {AR}^2 -1})/({\mathcal {AR}^2 + 1}))^2]$, where $\mathcal {AR}$ is the aspect ratio of the spheroid, and $\tau _\eta$ is the dissipative time scale (Parsa et al. Reference Parsa, Calzavarini, Toschi and Voth2012; Chevillard & Meneveau Reference Chevillard and Meneveau2013). However, this prediction is at striking odds with both experiments and simulations of spheroids advected through isotropic turbulence (Parsa et al. Reference Parsa, Calzavarini, Toschi and Voth2012; Byron et al. Reference Byron, Einarsson, Gustavsson, Voth, Mehlig and Variano2015; Ni et al. Reference Ni, Kramel, Ouellette and Voth2015). For prolate spheroids ($\mathcal {AR} \gg 1$), the measurements are smaller by nearly a factor of 3 than the predicted value ($\approx$ 4/15) for randomly distributed orientations.
A qualitative explanation for this disparity can be found by assessing the particle's preferential alignment with the velocity gradients of the flow. Since the velocity gradients are finite-time correlated in turbulent flows, Lagrangian stretching would align rods ($\mathcal {AR} \gg 1$) with the vorticity $\boldsymbol {\omega }_{\boldsymbol {f}}$, while disks ($\mathcal {AR} \ll 1$) tend to align their symmetry axis perpendicular to $\boldsymbol {\omega }_{\boldsymbol {f}}$ (Pumir & Wilkinson Reference Pumir and Wilkinson2011; Gustavsson, Einarsson & Mehlig Reference Gustavsson, Einarsson and Mehlig2014). Yet, a simple and elegant quantitative prediction of the mean-square spinning and tumbling rates is still missing. Further, the question of how the particle's size – in relation to the size of the turbulent eddies – affects the rotational statistics awaits a deeper evaluation. Now, Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) have shed light on these issues through a careful numerical and theoretical exploration of spheroids advected by turbulence. Their results suggest the existence of an underlying scale invariance for the rotational statistics within the Lagrangian framework.
2. Overview
Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) tackled the problem using a two-pronged approach. On one front, the spheroid aspect ratio was varied from oblate ($\mathcal {AR} \ll 1$) to prolate ($\mathcal {AR} \gg 1$). Concurrently, for sampling the various scales of turbulent motion, they resorted to a ‘filtered flow’ approach. The filter scale $\ell$ was varied from the very small ($\ell < \eta$) to the very large ($\ell = L$), where $\eta$ and $L$ are the dissipative and integral scales, respectively. This allowed for quantification of how the scales of turbulent motion impact the Lagrangian statistics of particle rotation.
In agreement with previous studies (Voth & Soldati Reference Voth and Soldati2017), Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) noted that the mean-square total rotation rate (MSR) of spheroids is almost independent of the particle's aspect ratio (shape invariance). With the shape invariance evident, the magnitude of the MSR can be straightforwardly deduced to be equal to $\langle \boldsymbol {\omega }_{\boldsymbol {f}}^2 \rangle /{4}$, because a spherical particle – which rotates identically as the fluid – lies within the range of the shape invariance. The authors elegantly derive expressions for the spinning and tumbling components of MSR by invoking one assumption – that the degree of alignment for the particle with the vorticity direction, $\boldsymbol{e_{\omega_f}}\kern-0.9pt$, is independent of the magnitude of $\boldsymbol{\omega_f}$. The predicted spinning and tumbling rates for all aspect ratios ($\mathcal {AR} \in [0.1, 10]$) are shown by the solid lines in figure 1(a). The simulation results – obtained by integrating Jeffery's equation along the Lagrangian trajectories – are in reasonable agreement with the authors’ predictions. Deviations are surely noticeable, but it may be worthwhile to note that Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) have managed to reduce a seven-parameter problem (Ni et al. Reference Ni, Kramel, Ouellette and Voth2015) into one that depends only on the alignment between the particle and the vorticity vector.
Figure 1. (a) Normalised mean-square particle angular velocity, $\langle \boldsymbol {\omega }_{\boldsymbol {p}}^2 \rangle$, and its decomposition into spinning and tumbling components for spheroids in turbulence (unfiltered DNS data). (b) Nearly scale-invariant behaviour for the spinning rates for all particle shapes. In (a,b), symbols are from the numerical simulations, and the solid lines give the predictions. Figures and data adapted from Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021).
The turbulent field considered in figure 1(a) is fully resolved; note that the normalisation time scale used is $\tau _\eta$. If a spatial filter of intermediate scale $\ell$ is applied to this flow field, not surprisingly the filtered flow would smooth out the fluctuations and hence the spinning and tumbling rates would be suppressed as compared with the fully resolved DNS case (unfiltered case). However, Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) provide a set of convincing arguments that the magnitude of these suppressed rotations is captured by considering the scale-dependent time scale $\tau _\ell \sim \ell ^{2/3}$. Figure 1(b) provides a demonstration of this nearly scale-invariant rotational behaviour for particles of all aspect ratios. This scaling (first introduced by Parsa & Voth (Reference Parsa and Voth2014) for rods in turbulence) has found good use in a variety of settings (Mathai et al. Reference Mathai, Neut, van der Poel and Sun2016; Pujara et al. Reference Pujara, Oehmke, Bordoloi and Variano2018). And now, the authors have extended its applicability to scales spanning the entire spatial extent of the turbulent flow – from the Kolmogorov scale to the integral scale – and across many particle geometries.
3. Outlook
The filtered flow approach by Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) might offer some insights about the ways in which finite-sized anisotropic particles respond to the scales of turbulent motion. However, it is crucial to note that the analyses here rely on the assumption (of Jeffery's equation) that the scales of motion in the flow are large compared with the particle's size. Furthermore, finite-sized particles likely deviate from the trajectories of fluid elements. The resulting slipping motion is certain to induce flow modifications that necessitate a reformulation of the torques acting on the particle (Voth & Soldati Reference Voth and Soldati2017; Pujara et al. Reference Pujara, Oehmke, Bordoloi and Variano2018).
The conclusions by Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) also hint at the possibility that fully resolved simulations may not be necessary to compute the rotational statistics of anisotropic particles. This would enable a coarse-grained simulation approach (such as large eddy simulations or truncated DNS) to sufficiently capture the rotational statistics even for sub-filter-scale particles. Its applicability though is likely to be limited to the mean-square rotation rates because quantities such as the particle's angular accelerations or the higher moments of its rotation – reflective of the rare events in turbulence – are unlikely to be scale invariant (Zimmermann et al. Reference Zimmermann, Gasteuil, Bourgoin, Volk, Pumir and Pinton2011). It is also our belief that the observed power law scalings in Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) would benefit from future explorations at higher Reynolds numbers – a wider scale separation could provide a more rigorous test of the scale invariance.
The rotational statistics observed by Pujara et al. (Reference Pujara, Oehmke, Bordoloi and Variano2018) require a closer inspection in the context of particulate flows (Voth & Soldati Reference Voth and Soldati2017). As the authors carefully note, the scale invariance might only be indicative of the trends to be expected for realistic particles. Indeed, deviations are sure to arise when the effects of particle size or density or buoyancy or rotational diffusion become dominant. Despite all of these, the results of Pujara et al. (Reference Pujara, Arguedas-Leiva, Lalescu, Bramas and Wilczek2021) have provided a glimpse into some of the underlying simplicity of the Lagrangian rotational statistics for a system that is governed by complex shape- and scale-dependent couplings between the particle and the turbulent velocity gradients. In this regard, it is our hope that this work will stimulate the development of similarly elegant models with a wider scope of applicability.
Declaration of interests
The author reports no conflict of interest.