3.1. Velocity triple-decomposition

The velocity $u$ in the flow field can usually be decomposed into a time-averaged velocity $\bar {u}$ and a fluctuation velocity $u'$. For periodic or quasiperiodic flows, the fluctuation velocity $u'$ can be further decomposed into a periodic fluctuation velocity $\tilde {u}$ and a random fluctuation velocity $\hat {u}$, i.e. velocity triple-decomposition (Reynolds & Hussain Reference Reynolds and Hussain1972; Feng & Wang Reference Feng and Wang2010)

(3.1)\begin{equation} u=\bar{u}+\tilde{u}+\hat{u} . \end{equation}

The periodic fluctuation velocity $\tilde {u}$ and the random fluctuation velocity $\hat {u}$ are, respectively, defined as

(3.2)\begin{align} \tilde{u}={\left\langle u \right\rangle}_{phase}-\bar{u} , \end{align}

(3.3)\begin{align} \hat{u}=u-{\left\langle u \right\rangle}_{phase} , \end{align}

where $\langle \cdot \rangle _{phase}$ represents phase average. The periodic fluctuation velocity $\tilde {u}$ reflects the contribution of large-scale coherent structures, while the random fluctuation velocity $\hat {u}$ reflects the influence of small-scale turbulent structures.

The classical Reynolds stress can be obtained based on the total fluctuation velocity $u'$. Similarly, the coherent Reynolds stress and the random Reynolds stress can be obtained based on the periodic fluctuation velocity $\tilde {u}$ and the random fluctuation velocity $\hat {u}$, respectively. The three mentioned above have the following relationship (Feng & Wang Reference Feng and Wang2010):

(3.4)\begin{equation} \overline{s'q'}=\overline{\tilde{s}\tilde{q}}+\overline{\hat{s}\hat{q}} , \end{equation}

where $s$ and $q$ represent arbitrary combinations of the velocity components $u$ and $v$. In addition, the turbulent kinetic energy $TKE$ can be decomposed into coherent turbulent kinetic energy $\widetilde {TKE}$ and random turbulent kinetic energy $\widehat {TKE}$, and there is a relation

(3.5)\begin{equation} TKE=\widetilde{TKE}+\widehat{TKE}=\tfrac{1}{2}\overline{\tilde{u}_i\tilde{u}_i}+\tfrac{1}{2}\overline{\hat{u}_i\hat{u}_i}. \end{equation}

The phase information of the periodic or quasiperiodic flows can be extracted from the proper orthogonal decomposition (POD) time coefficient. Details of this method have been provided in previous work (Pan, Wang & Wang Reference Pan, Wang and Wang2013; Xu et al. Reference Xu, Long and Wang2023). The phase angle $\theta$ of the snapshot can be obtained from the limit cycle formed by the time coefficients $a_1$ and $a_2$ corresponding to the first and second modes of the POD, respectively, as shown in figure 3(a). The mean value of the snapshots with $\theta \pm 5^{\circ }$ is taken as the phase average, and the velocity triple-decomposition is applied to the flow field. It has been checked that the variation of the bin width for $\theta$ from $\theta \pm 1^{\circ }$ to $\theta \pm 10^{\circ }$ does not influence the conclusions in this paper. The coherent turbulent kinetic energy $\widetilde {TKE}$ and random turbulent kinetic energy $\widehat {TKE}$ along the jet centreline are shown in figure 3(b). The coherent turbulent kinetic energy $\widetilde {TKE}$ associated with the large-scale vortex ring dominates the region near the orifice, and gradually decreases to zero as the vortex ring breaks down downstream. In contrast, the random turbulent kinetic energy $\widehat {TKE}$ gradually increases, reaches a peak value when the coherent turbulent kinetic energy $\widetilde {TKE}$ is dissipated, and then gradually decreases to a constant value in the far field. This indicates the process of vortex ring breakdown and the transition of turbulent kinetic energy from large-scale to small-scale.

Figure 3. (a) Limit cycle formed by time coefficients $a_1$ and $a_2$ that correspond to the first and second modes of the POD, respectively. (b) Variations of the turbulent kinetic energy $TKE$, coherent turbulent kinetic energy $\widetilde {TKE}$ and random turbulent kinetic energy $\widehat {TKE}$, normalised by the local mean jet centreline velocity $\bar {u}_{cl}$.

3.2. Fourier mode decomposition

To determine the dominant region of the vortex ring, Fourier mode decomposition (FMD) (Ma et al. Reference Ma, Feng, Pan, Gao and Wang2015) is applied to the synthetic jet flow field. This method decomposes the flow field data containing multifrequency information into a series of modes according to the characteristic frequency, with each mode corresponding to a specific frequency coherent structure. The following is a brief introduction to FMD.

In the experiment, a time discrete signal $f_n=f(n \Delta t)$ at a certain point in space is obtained, where $0\leq n \leq N$, $\Delta t=1/f_s$. Here $N$ is the sampling number; $f_s$ is the sampling frequency. The discrete Fourier transform of the signal is as follows:

(3.6)\begin{equation} f_n=\sum_{k = 0}^{N-1} c_k {\rm e}^{\mathrm{i} ({2 {\rm \pi}k}/{N}) n} , \end{equation}

where

(3.7)\begin{equation} c_k=\frac{1}{N} \sum_{n = 0}^{N-1} f_n {\rm e}^{-\mathrm{i} ({2 {\rm \pi}k}/{N}) n} . \end{equation}

A series of two-dimensional slice data for snapshots are arranged in the temporal dimension to form a three-dimensional matrix $\boldsymbol{\mathsf{F}}_{\boldsymbol{\mathsf{n}}}$. Applying the Fourier transform to each grid point in space extends the single-point Fourier transform to the entire flow field, yielding a matrix

(3.8)\begin{equation} \boldsymbol{\mathsf{c}}_{\boldsymbol{\mathsf{k}}}=\frac{1}{N} \sum_{n = 0}^{N-1} \boldsymbol{\mathsf{F}}_{\boldsymbol{\mathsf{n}}} {\rm e}^{-\mathrm{i} ({2 {\rm \pi}k}/{N}) n} \end{equation}

that contains the spectral information of the entire flow field. Matrix $\boldsymbol{\mathsf{c}}_{\boldsymbol{\mathsf{k}}}$ can also be written as

(3.9)\begin{equation} \boldsymbol{\mathsf{c}}_{\boldsymbol{\mathsf{k}}}=\tfrac{1}{2} \boldsymbol{\mathsf{A}}_{\boldsymbol{\mathsf{k}}} {\rm e}^{-\mathrm{i} \boldsymbol{\varphi}_{\boldsymbol{\mathsf{k}}}} = \tfrac{1}{2} \boldsymbol{\mathsf{A}}_{\boldsymbol{\mathsf{k}}} (\cos{\boldsymbol{\varphi}_{\boldsymbol{\mathsf{k}}}} - \mathrm{i}\sin{\boldsymbol{\varphi}_{\boldsymbol{\mathsf{k}}}}) , \end{equation}

where $\boldsymbol{\mathsf{A}}_{\boldsymbol{\mathsf{k}}}=2\lvert \boldsymbol{\mathsf{c}}_{\boldsymbol{\mathsf{k}}} \rvert$, $\boldsymbol {\varphi }_{\boldsymbol{\mathsf{k}}}=-\arg {\boldsymbol{\mathsf{c}}_{\boldsymbol{\mathsf{k}}}}$. $\boldsymbol{\mathsf{A}}_{\boldsymbol{\mathsf{k}}}$ is referred to as the global amplitude spectrum, $\boldsymbol {\varphi }_{\boldsymbol{\mathsf{k}}}$ is referred to as the global phase spectrum and $\boldsymbol{\mathsf{c}}_{\boldsymbol{\mathsf{k}}}$ is referred to as the dynamic mode or the Fourier mode. The Frobenius norm of $\boldsymbol{\mathsf{A}}_{\boldsymbol{\mathsf{k}}}$, namely $\lVert \boldsymbol{\mathsf{A}}_{\boldsymbol{\mathsf{k}}} \rVert = \sqrt {\sum a_{ij}^2 }$ ($a_{ij}$ is the element of the matrix $\boldsymbol{\mathsf{A}}_{\boldsymbol{\mathsf{k}}}$), is defined as the global power spectrum.

The global power spectra based on the streamwise fluctuation velocity $u'$ are shown in figure 4. The global power spectra for the three cases have clear peaks at $f/f_d=1$ and $f/f_d=2$, corresponding to the driving frequency of the actuator and its harmonics. It indicates that the vortex ring generated by the actuator dominates the near field of the synthetic jet. The periodic evolution of the vortices is accompanied by the periodic variations of the velocities, and the FMD method can trace or map the vortex behaviours with the specified characteristic frequency (Ma et al. Reference Ma, Feng, Pan, Gao and Wang2015). Figure 5 presents the amplitude of the Fourier mode at the characteristic frequency of $f/f_d=1$. The region with high-amplitude represents the region dominated by the vortex ring. The low-amplitude regions on both sides of the centreline in figure 5(a–c) can be considered as the trajectory of the vortex core, since the streamwise fluctuation velocity in this region is less affected by the vortex. The presence of some low-amplitude regions near the centreline of the near field in figure 5(a) may be due to the short stroke in this case, causing these locations to be affected by both the formed vortex ring and the suction cycle, producing a state similar to the node of the standing wave. Similarly, the low-amplitude region on the centreline in figure 5(d–f) can be considered as the centre of the vortex ring, and the radial fluctuation velocity in this region is less affected by the vortex. As the flow develops, the vortex rings break down, accompanied by the disappearance of the high-amplitude region. To determine the vortex ring breakdown position, the amplitudes of the Fourier mode based on the radial fluctuation velocity $v'$ at the characteristic frequency of $f/f_d=1$ along the lines around the edge of the orifice (i.e. $y/D=0.5$) are plotted in figure 6. The approximate linear decreasing parts of the curve are fitted linearly, and the position where the curve decline rate suddenly becomes smaller is taken as the position where the vortex rings break down. It can be determined that the synthetic jet vortex rings break down at approximately $x/D=4.9$, $10.1$ and $14.4$ for Case 1, Case 2 and Case 3, respectively.

Figure 4. Global power spectra based on the streamwise fluctuation velocity $u'$ for (a) Case 1, (b) Case 2 and (c) Case 3. The red circle marks the peak position.

Figure 5. Amplitude of the Fourier mode for (a,d) Case 1, (b,e) Case 2 and (c,f) Case 3 at the characteristic frequency of $f/f_d=1$, based on the (a–c) streamwise fluctuation velocity $u'$ and (d–f) the radial fluctuation velocity $v'$.

Figure 6. Amplitude of the Fourier mode for (a) Case 1, (b) Case 2 and (c) Case 3 at the characteristic frequency of $f/f_d=1$ along the line $y/D=0.5$, based on the radial fluctuation velocity $v'$. The red dashed lines and circles represent the fitting lines and the intersection points of the fitting lines, respectively.

The imaginary part of the complex eigenvalue pair of the velocity gradient tensor, denoted as $\lambda _{ci}$, can be referred to as the local swirling strength of the vortex (Zhou et al. Reference Zhou, Adrian, Balachandar and Kendall1999), and is used to identify vortices for visually examining the vortex ring breakdown. The phase-averaged $\lambda _{ci}D/U_0$ field is shown in figure 7, with the same contour levels selected in the three cases to plot the vortex evolution. It can be found that the vortex rings maintain a longer streamwise distance as the dimensionless stroke length increases, and their breakdown positions are consistent with those obtained by FMD.

Figure 7. Phase-averaged $\lambda _{ci}D/U_0$ field of the synthetic jet over a period: (a–d) Case 1; (e-h) Case 2; (i–l) Case 3. Here $\lambda _{ci}$ is normalised by the orifice diameter $D$ and the time-averaged blowing velocity $U_0$. The sign of $\lambda _{ci}$ is identical to the local vorticity.

3.3. Entrainment coefficient

The entrainment coefficient is used to measure the entrainment capacity of jets and plumes, and a detailed description can be found in previous studies (van Reeuwijk & Craske Reference van Reeuwijk and Craske2015; Breda & Buxton Reference Breda and Buxton2018; Xu et al. Reference Xu, Long and Wang2023). The entrainment coefficient in a pure jet can be calculated using the following equation:

(3.10)\begin{equation} \alpha=-\frac{{\delta}_m}{2{\gamma }_m}+\frac{Q}{2M^{1/2}}\frac{\partial}{\partial x}(\ln {\gamma }_m)=\alpha_1+\alpha_2 . \end{equation}

The terms in (3.10) are given in table 2. The integral boundary $r_0$ is selected at the radial position of $\bar {u}=0.02\bar {u}_{cl}$, which is the smallest possible threshold in the present study. A smaller threshold will cause the integral boundary to be outside the FOV or affected by experimental noise at the edge, making it impossible to calculate the entrainment coefficient. It has been checked that the choice of integral boundary $r_0$ from $\bar {u}=0.02\bar {u}_{cl}$ to $\bar {u}=0.1\bar {u}_{cl}$ has little effect on the entrainment coefficient, and does not influence the conclusions in this paper. In (3.10), the first term $\alpha _1$ is related to the production of turbulent kinetic energy, and the second term $\alpha _2$ is related to the shape of the velocity profile. According to the velocity triple-decomposition, the Reynolds stress term in $\alpha _1$ can be further decomposed into the coherent Reynolds stress term and the random Reynolds stress term. Correspondingly, $\alpha _1$ is decomposed into $\tilde {\alpha }_1$ and $\hat {\alpha }_1$, representing the contributions of the coherent turbulent kinetic energy production and the random turbulent kinetic energy production to the entrainment coefficient, respectively.

Table 2. The terms in (3.10) (Breda & Buxton Reference Breda and Buxton2018).

The variations of the entrainment coefficient $\alpha$ and its components for the three cases are shown in figure 8. The entrainment coefficient shows the same trend for all three cases, increasing to a peak value and then decreasing to a constant value in the far field. The entrainment coefficient in the far field is close to the value of $0.057$–$0.109$ found in previous studies for continuous jets (van Reeuwijk & Craske Reference van Reeuwijk and Craske2015). The entrainment coefficient component $\alpha _2$ is virtually zero, and the components $\tilde {\alpha }_1$ and $\hat {\alpha }_1$ dominate the variation of the entrainment coefficient. Similarly to the variations of the coherent turbulent kinetic energy and random turbulent kinetic energy along the jet centreline, $\tilde {\alpha }_1$ gradually decreases to zero, while $\hat {\alpha }_1$ reaches a peak at the vortex ring breakdown position and completely dominates the entrainment coefficient. Here $\tilde {\alpha }_1$ decreases to zero before the vortex ring breakdown, especially for Case 3, but it is expected that it should decrease to zero at the vortex ring breakdown position. This may be due to the phase identification error caused by the prevalence of multiscale structures in the flow field at large Reynolds number (Pan et al. Reference Pan, Wang and Wang2013), which leads to part of the coherent component being classified as the random component. By identifying the maximum points with zero growth rate of entrainment coefficient, the peak positions of entrainment coefficient are determined, which are located at $x/D=4.9$, $9.1$ and $13.9$ for Case 1, Case 2 and Case 3, respectively. The peak positions of the entrainment coefficient for the synthetic jets in the three cases are consistent with the vortex ring breakdown positions determined above. It is suggested that the enhanced entrainment of the synthetic jet is due to the increase of the random turbulent kinetic energy term caused by the random small-scale turbulent structure.

Figure 8. Variations of the entrainment coefficient $\alpha$ and its components for Case 1, Case 2 and Case 3.

3.4. Mechanism of entrainment enhanced by vortex ring breakdown

The plots of the random turbulent kinetic energy peak positions and the vortex ring breakdown positions versus the entrainment coefficient peak positions are shown in figure 9. As shown in figure 9(a), the random turbulent kinetic energy peak positions and the entrainment coefficient peak positions are approximately the same for Case 1 and Case 2. For Case 3, the random turbulent kinetic energy peak position shifts to the upstream, which may be due to the increase of phase identification error at large Reynolds number (Pan et al. Reference Pan, Wang and Wang2013). As shown in figure 9(b), the vortex ring breakdown positions match well the entrainment coefficient peak positions. In addition, it should be emphasised that the effect of the Reynolds number and the dimensionless stroke length on the vortex ring breakdown position can be complex and has not been investigated here. Nevertheless, the above results show the correlation between vortex ring breakdown and enhanced entrainment, and the mechanism of how vortex ring breakdown enhances entrainment will be discussed below.

Figure 9. (a) Random turbulent kinetic energy peak positions ($x_{{peak} \widehat {TKE}}$) versus entrainment coefficient peak positions ($x_{{peak}\ \alpha }$). (b) Vortex ring breakdown positions based on the amplitudes of the Fourier mode ($x_{{vortex\ breakdown}}$) versus entrainment coefficient peak positions ($x_{{peak}\ \alpha }$). The black dashed line has a slope of 1.

Figure 10(a) shows the vortices near the TNTI and the irrotational boundary of the TNTI in the instantaneous snapshot. The irrotational boundary of the TNTI is detected by the vorticity criterion, whose threshold is determined in the plateau region, where the area of the turbulent region decreases with the threshold with a small slope. It ensures that minor changes in the threshold do not affect the results. A detailed description of this procedure can be found in previous studies (Xu et al. Reference Xu, Long and Wang2023). Vortex structures are identified by $\lambda _{ci}$, whose threshold is selected to be 10 % of the maximum $|\lambda _{ci}|$ value in the flow field. It has been checked that varying the threshold from 5 % to 15 % does not affect the results. Figure 10(b) shows the variations of vorticity magnitude at the centre of the vortex near the TNTI. Here, only those vortices whose centres are less than $15\eta$ away from the irrotational boundary are included in the statistics, where $\eta$ is the local Kolmogorov scale, and $15\eta$ as the thickness of TNTI has been confirmed by previous studies (Zecchetto & da Silva Reference Zecchetto and da Silva2021; Xu et al. Reference Xu, Long and Wang2023). The vorticity magnitude at the centre of the vortex near the TNTI reaches peak value at $x/D=5.1$, $9.3$ and $11.7$ for Case 1, Case 2 and Case 3, respectively, which corresponds to the vortex ring breakdown position. The vortex ring breakdown results in the transfer of turbulent kinetic energy from the coherent large-scale structure to the random small-scale structure, enhancing the vortices near the TNTI. The vortex near the TNTI will induce a counterflow velocity field which implies that fluid from both sides of the TNTI is transported towards the TNTI, resulting in a compressive strain normal to the TNTI and an extensive strain parallel to the TNTI (Watanabe et al. Reference Watanabe, Sakai, Nagata, Ito and Hayase2014; Mistry et al. Reference Mistry, Philip and Dawson2019). The alignment of the extensive strain and the vorticity vector results in a larger enstrophy production, allowing more environment irrotational fluid to gain vorticity, thereby enhancing local entrainment.

Figure 10. (a) Vortices near the TNTI. The black curve represents the irrotational boundary of the TNTI. The green and red circles mark vortices whose centres are less than and greater than $15\eta$ away from the irrotational boundary, respectively. (b) Variations of vorticity at the centres of vortices with distance of less than $15\eta$ from the irrotational boundary. The conditional average of the vortices over all snapshots is denoted by $\langle \cdot \rangle$.