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Ultrasound rays in droplets: the role of viscosity and caustics in acoustic streaming

Published online by Cambridge University Press:  02 August 2017

Henrik Bruus*
Affiliation:
Department of Physics, Technical University of Denmark, DTU Physics Building 309, DK-2800 Kongens Lyngby, Denmark
*
Email address for correspondence: [email protected]

Abstract

When an acoustic wave propagates through a viscous fluid, it progressively transfers momentum to the fluid through viscous dissipation, which results in the formation of a steady vortical flow called acoustic streaming. Although spawned by viscous effects, the magnitude of the streaming does not depend on the viscosity in most simple geometries. However, viscosity has a profound influence on the acoustic streaming as demonstrated by Riaud et al. (J. Fluid Mech., vol. 821, 2017, pp. 384–420) in their study of sessile mm-sized water–glycerol droplets placed on a piezoelectric substrate with a 20-MHz ultrasound surface acoustic wave propagating along its surface. A detailed experimental and numerical analysis reveals that streaming dynamics is driven by a few ultrasound ray caustics inside the droplet.

Type
Focus on Fluids
Copyright
© 2017 Cambridge University Press 

1 Introduction

The existence of steady streaming flow accompanying the propagation of acoustic waves in viscous fluids is a well known and ubiquitous phenomenon with a long history dating nearly 200 years back (Faraday Reference Faraday1831). Lord Rayleigh (Reference Rayleigh1884) provided a theoretical explanation of this phenomenon, and his theory, extended by Schlichting (Reference Schlichting1932) to include acoustic boundary layers, describes one of the two basic mechanisms responsible for the force driving acoustic streaming: the shear stress that arises in the thin boundary layer near rigid walls, where the acoustic oscillatory bulk velocity of the fluid is forced to zero at the rigid walls by the no-slip boundary condition. Later, Eckart (Reference Eckart1948) and Lighthill (Reference Lighthill1978) described the other mechanism responsible for streaming: the transfer of momentum by gradual absorption of the acoustic wave in the bulk of the fluid.

In the past two decades, interest in acoustic streaming has been revived by the application of ultrasound to manipulate fluids and suspended particles in microfluidic systems (Wiklund, Green & Ohlin Reference Wiklund, Green and Ohlin2012). Especially two situations are of interest: the appearance of the streaming flow surrounding a suspended solid or fluid microparticle (Sadhal Reference Sadhal2012a ,Reference Sadhal b ) and streaming generated inside a microfluidic channel (Muller et al. Reference Muller, Rossi, Marin, Barnkob, Augustsson, Laurell, Kähler and Bruus2013; Lei, Glynne-Jones & Hill Reference Lei, Glynne-Jones and Hill2016). In spite of this revival of acoustic streaming, the effect of viscosity has long been ignored in acoustic streaming experiments.

Figure 1. (a) Sketch of a 12- $\unicode[STIX]{x03BC}\text{L}$ droplet placed on a piezoelectric lithium niobate substrate. A surface acoustic wave (SAW) propagates along the surface of the substrate and couples into the droplet, where it scatters at the droplet–air and droplet–solid interfaces. (b) Colour plot of the number of surface rays per unit volume from 0 (black) to $5\times 10^{6}$ (white) revealing the surface caustic (white). (c) Same as (b) but for volume rays revealing the volume caustic (yellow through white). (d) Colour plot of the numerically calculated time-averaged Poynting vector $\unicode[STIX]{x1D72B}=\langle \boldsymbol{v}p\rangle$ from $0~\text{W}~\text{m}^{-2}$ (black) to $314~\text{W}~\text{m}^{-2}$ (white). Adapted from Riaud et al. (Reference Riaud, Baudoin, Bou Matar, Thomas and Brunet2017).

2 Overview

The paper by Riaud et al. (Reference Riaud, Baudoin, Bou Matar, Thomas and Brunet2017) presents a detailed experimental and numerical study on the influence of viscosity and caustics on acoustic streaming in sessile 12- $\unicode[STIX]{x03BC}\text{L}$ droplets containing a mixture of water and glycerol. As sketched in figure 1(a), the droplet, with a base diameter $D$ between 3.7 and 4.0 mm, is resting on a piezoelectric lithium niobate substrate, along the surface of which a unidirectional monochromatic 20-MHz surface acoustic wave is propagating from left to right with the speed $c_{\mathit{saw}}=3484~\text{m}~\text{s}^{-1}$ and an amplitude of 62 pm. The acoustic wave is coupled into the droplet with great efficiency through the Rayleigh refraction angle $\unicode[STIX]{x1D703}_{R}$ , given by the Snell law $\sin \unicode[STIX]{x1D703}_{R}=c_{0}/c_{\mathit{saw}}$ , where $c_{0}$ is the speed of sound in the droplet. This system is an excellent choice for the study at hand. By changing the glycerol mass fraction $w_{gl}$ from 0 wt% to 90 wt% (in steps of 10 wt%), the dynamic viscosity $\unicode[STIX]{x1D702}_{0}$ increases by a factor of 175 from 0.89 to $156~\text{mPa}~\text{s}$ while the bulk viscosity $\unicode[STIX]{x1D709}$ increases by a factor of 64 from 2.8 to $182~\text{mPa}~\text{s}$ . This leads to an increase by a factor of 40 in the ratio $\unicode[STIX]{x1D6EC}(w_{gl})=D/L_{a}(w_{gl})$ between the droplet diameter $D$ and the acoustic attenuation length $L_{a}$ , and the experiments thus span from weak attenuation with $\unicode[STIX]{x1D6EC}(0\,\%)=0.07$ in a pure water droplet to strong attenuation with $\unicode[STIX]{x1D6EC}(90\,\%)=2.8$ in a 90 wt% glycerol droplet. All other droplet parameters vary much less with the glycerol content: the density $\unicode[STIX]{x1D70C}_{0}$ between 1000 and $1230~\text{kg}~\text{m}^{-3}$ , the speed of sound $c_{0}$ between 1510 and $1910~\text{m}~\text{s}^{-1}$ , the acoustic wavelength $\unicode[STIX]{x1D706}_{0}$ between 74 and $94~\unicode[STIX]{x03BC}\text{m}$ and the Rayleigh refraction angle between $26^{\circ }$ and $33^{\circ }$ .

The small acoustic wavelength relative to the droplet diameter, $\unicode[STIX]{x1D706}_{0}/D\lesssim 0.02$ , has three important implications. Firstly, the streaming is predominantly driven by bulk absorption and not by boundary layer stresses, secondly, the system may be analysed in terms of geometrical acoustics or ray acoustics, and thirdly, direct numerical simulation based on standard methods may lead to prohibitive memory requirements. The latter technical problem is elegantly solved by the development of a new numerical scheme, called the streaming source spatial filtering method, which allows for grid cells larger than the small acoustic wavelength in the numerical simulations. Turning from numerics to physics, the ray analysis is illustrated in figure 1(b,c), where the number of surface and bulk rays per unit volume, respectively, are shown for the pure water droplet with low attenuation. The formation of a left–right symmetric V-shaped caustic is clearly seen, and its angle matches the Rayleigh refraction angle. Notably, this caustic coincides with the magnitude of the time-averaged Poynting vector as a function of position, shown in figure 1(d) and obtained by numerical simulation. The Poynting vector is the time-averaged product $\unicode[STIX]{x1D72B}=\langle p\boldsymbol{v}\rangle$ of the acoustic pressure $p$ and velocity $\boldsymbol{v}$ , its spatial pattern is similar to that of the acoustic energy density and it gives the orientation of the flow forcing consistent with experiment. At low viscosity, the left–right symmetric caustics drives a left–right symmetric streaming pattern containing four vortices, as observed both experimentally and numerically, see figure 2(a). As the viscosity is increased by increasing the glycerol mass fraction, the acoustic rays attenuate before reaching the caustics at the back (left) and only the forward (right) branch of the caustic remains. This leads to the observed loss of left–right symmetry in the streaming pattern, as shown in figure 2(b), where only two vortices remain, both of them positioned in the forward (right) end of the droplet.

The results that the reader should take particular notice of can be summarized as follows: viscosity plays a crucial role in the dynamics and topology of acoustic streaming. The observed viscosity-driven topological transition has neither been reported nor explained so far in the literature. It is remarkable, how the carefully executed acoustic streaming experiments have been compared with good agreement to the numerical model developed from first principles, and including spatial filtering of the streaming source, which computes the acoustic streaming in three dimensions. Finally, it turns out that the force driving the acoustic streaming is mainly concentrated in a few caustics, whose position can be obtained easily from geometrical acoustics.

Figure 2. (a) Top view of streaming in a 12- $\unicode[STIX]{x03BC}\text{L}$ 30 wt% glycerol droplet excited by a SAW propagating from left to right. The 4-vortex pattern is symmetric around the horizontal diameter. The coloured lines (upper half) are streamlines calculated numerically while the red arrows (lower half) represent measured streaming velocities with a maximum speed of $100~\unicode[STIX]{x03BC}\text{m}~\text{s}^{-1}$ . (b) Same as (a) but showing a 2-vortex pattern in a 90 wt% glycerol droplet with a maximum speed of $10~\unicode[STIX]{x03BC}\text{m}~\text{s}^{-1}$ . Adapted from Riaud et al. (Reference Riaud, Baudoin, Bou Matar, Thomas and Brunet2017).

3 Future

The above study demonstrates convincingly how viscosity influences both the magnitude and the topology of acoustic streaming flow. This discovery marks an important progress in our understanding of acoustic streaming. So far, the analysis has only been carried out for sessile mm-sized droplets containing a homogeneous viscous fluid, but it will clearly play an important role in future studies of acoustic streaming in other and more complex systems. Examples of recently developed and more complex ultrasound-driven microfluidic systems, which would benefit of the new acoustic streaming analysis, are systems with rotating acoustic fields (Courtney et al. Reference Courtney, Demore, Wu, Grinenko, Wilcox, Cochran and Drinkwater2014; Riaud et al. Reference Riaud, Baudoin, Thomas and Bou Matar2014, Reference Riaud, Thomas, Baudoin and Bou Matar2015) and systems with inhomogeneous acoustic properties (Augustsson et al. Reference Augustsson, Karlsen, Su, Bruus and Voldman2016; Karlsen, Augustsson & Bruus Reference Karlsen, Augustsson and Bruus2016).

Currently, we are facing an exciting development in the nearly 200-year-old field of acoustic streaming, with respect to both our understanding of the underlying physics, and to applications of ultrasound in microfluidics. The work by Riaud et al. (Reference Riaud, Baudoin, Bou Matar, Thomas and Brunet2017) certainly stands out as an important contribution to this development.

References

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Figure 0

Figure 1. (a) Sketch of a 12-$\unicode[STIX]{x03BC}\text{L}$ droplet placed on a piezoelectric lithium niobate substrate. A surface acoustic wave (SAW) propagates along the surface of the substrate and couples into the droplet, where it scatters at the droplet–air and droplet–solid interfaces. (b) Colour plot of the number of surface rays per unit volume from 0 (black) to $5\times 10^{6}$ (white) revealing the surface caustic (white). (c) Same as (b) but for volume rays revealing the volume caustic (yellow through white). (d) Colour plot of the numerically calculated time-averaged Poynting vector $\unicode[STIX]{x1D72B}=\langle \boldsymbol{v}p\rangle$ from $0~\text{W}~\text{m}^{-2}$ (black) to $314~\text{W}~\text{m}^{-2}$ (white). Adapted from Riaud et al. (2017).

Figure 1

Figure 2. (a) Top view of streaming in a 12-$\unicode[STIX]{x03BC}\text{L}$ 30 wt% glycerol droplet excited by a SAW propagating from left to right. The 4-vortex pattern is symmetric around the horizontal diameter. The coloured lines (upper half) are streamlines calculated numerically while the red arrows (lower half) represent measured streaming velocities with a maximum speed of $100~\unicode[STIX]{x03BC}\text{m}~\text{s}^{-1}$. (b) Same as (a) but showing a 2-vortex pattern in a 90 wt% glycerol droplet with a maximum speed of $10~\unicode[STIX]{x03BC}\text{m}~\text{s}^{-1}$. Adapted from Riaud et al. (2017).