2.1. Hypersonic wind tunnel experiments

Experiments were performed in the Roddam Narasimha Hypersonic Wind Tunnel (RNHWT) at IISc – a 0.5 metre diameter enclosed free-jet facility (pressure-vacuum type) that uses dry air as the working fluid and can be operated in the Mach number range 6 to 10. All the present experiments were carried out at $M=6$ and a free-stream unit Reynolds number of $7.7\times 10^6$ m$^{-1}$, with a corresponding free-stream velocity $u = 900$ m s$^{-1}$. Stagnation pressure and temperature were set to $P_{0} = 11.1$ bar and $T_{0} = 455\,$K, respectively, in all cases. At $M = 6$, the facility provides a usable wind-on duration of 6 seconds in a single run. Test models with various combinations of $D$, $L$ and $d$ were used; for reference, dimensions of the largest model used are $D = 100$, $L = 40$ and $d = 80$ mm. Four different values of $L/d = [0.5,\ 0.71,\ 1.07,\ 1.87]$, corresponding to $\theta = [45^{\circ },\ 35^{\circ },\ 25^{\circ },\ 15^{\circ }]$, were studied, each at different $D/d$ values in the range $1 < D/d < 5$. Note that the conical shock-wave detachment angle at Mach 6 is $\theta _{d} = 55.4^{\circ }$. Shock-wave location and motion were visualized by employing the schlieren technique in a time-resolved manner by using a high-power pulsed diode laser (Cavilux Smart, 640 nm wavelength, 10 ns pulse width) as the light source and a high-speed camera (Phantom V1612) for imaging. The short pulse width of the light source allows for a high degree of spatial localization in imaging fast-moving shock waves. Data was recorded with frame rates in the range of 48 000 to 160 000 frames-per-second, and 20 000 frames (images) were stored from each experiment. The corresponding number of periodic shock-wave pulsation/oscillation cycles recorded were in the range 400 to 1200 (depending on the dimensional frequency). The data sets provide good temporal resolution for detailed analysis of flow features. Figure 3(b) gives an overview of all the combinations of $L/d$ and $D/d$ studied here; data markers in the figure denote individual experiments. Based on the shock-wave system behaviour, each location (or data marker) in the $L/d$–$D/d$ parameter space is classified into one of three states: steady, pulsations and oscillations. The terminology used here is borrowed from spiked cylinder literature referenced above, where pulsations and oscillations refer to large- and small-amplitude shock-wave oscillations, respectively. The boundary curves between states shown in figure 3(b) are empirically inferred based on the available data points and are qualitative in nature. Observations and discussions for the three flow states and transitions between them are presented next. Note that the terminology of transition in the present context refers to a change in the flow from one state to another, brought about by changes to the governing geometric parameters. Hereon, shock waves will be referred in short as shocks.

2.2. Steady shock-wave systems

For any given $L/d$, it is easy to understand the formation of a steady shock system for trivial cases at limiting values of $D/d$, i.e. a large value of $D/d$ (where $D/d$ is sufficiently greater than $L/d$) and a value of $D/d$ very close to 1. In the former case, the base cylinder gives rise to a steady leading bow shock with the conical forebody situated entirely in the downstream subsonic region. In the latter case, a steady conical shock forms around the forebody (for $\theta < \theta _d$) along with a downstream expansion region centred at the base cylinder shoulder.

Now consider the case of $L/d = 0.71$, ($\theta = 35^{\circ }$) for which formation of non-trivial steady shock systems were observed for $D/d \gtrapprox 1.3$ (see figure 3b). As $D/d$ is reduced starting from a large value, the bow shock stand-off distance reduces and eventually the shock moves downstream of the cone tip and leads to scenarios where an attached conical shock forms on the forebody. The schlieren images in figure 4 show an example of this for $D/d = 1.43$ $\theta = 35^{\circ }$, and the key features of the shock structure are schematically illustrated in figure 4(c) (given the axisymmetric nature of the flow, only the top half of the flow field is shown in all the schlieren images presented here). The shock structure seen in the schlieren images can be understood in the following sequential order. The initial transmitted shock generated at the intersection of the conical and bow shocks impinges on the boundary-layer flow over the cone surface. The adverse pressure jump across this shock results in partial separation of the boundary layer and formation of a separation bubble, which in turn generates a separation shock with a shock angle larger than the conical shock (angles with reference to the cone axis). It is this separation shock that then intersects the bow shock and leads to the formation of the final transmitted shock and the steady shock system seen in figure 4. The intersection point of separation, bow and transmitted shocks is referred to as the triple point. The nature of interaction between the separation and bow shocks falls under the type IV classification of Edney (Reference Edney1968). The difference in flow velocities downstream of the bow and transmitted shocks results in the development of a shear layer with subsonic and supersonic flow above and below the velocity slip line, respectively. Downstream of the transmitted shock, a supersonic shock train forms in the region between the shear layer and the wall, typical of type IV interactions, and this is referred to as a supersonic jet. It is to be noted that the terminology of shock train is used here in a general sense to describe a series of reflected compression and expansion waves, and/or shocks. The extent of this shock train is dependent on the transmitted shock Mach number (typically, higher the Mach number, longer is the extent) and the downstream pressure condition. The subsonic flow downstream of the shock train curves upwards, goes through the sonic line, and accelerates to supersonic velocities around the base cylinder shoulder. Note that the part of the incoming free-stream flow that passes through the conical shock, and the supersonic shock train that follows, experiences a lower total pressure loss in comparison with the flow that passes through the bow shock (see the two streamlines illustrated in figure 4c) as dictated by fundamental gas dynamics. For $\theta = 35^{\circ }$, a distinct steady state at $D/d$ close to 1 was also observed; this represents a trivial case as per above discussion and does not contain flow features of any interest.

Figure 4. (a) An instantaneous schlieren image of the steady shock system for $\theta = 35^{\circ }$ and $D/d = 1.43$ (also see supplementary movie file available at https://doi.org/10.1017/jfm.2021.115); (b) an average intensity map obtained from a temporal sequence of 5000 schlieren images for the same $\theta$ and $D/d$; (c) a schematic illustration (not to scale) of key flow features of the steady shock system.

Formation of non-trivial steady shock systems with the above features were also observed at $L/d = 0.5$ ($\theta = 45^{\circ }$) for $D/d > 1.07$. However, an important distinction is noted – the separation bubble was found to be relatively smaller in size and therefore does not lead to interaction between the separation and bow shocks, while other features such as formation of a shear layer and a shock train remain the same. This distinction can be attributed to the relatively large cone half-angle which results in a stronger conical shock and lower downstream Mach number, and thereby a weaker transmitted shock that leads to a more localized separation bubble. For $L/d = 1.07$ ($\theta = 25^{\circ }$), a trivial steady state was observed at $D/d$ close to 1, similar to $\theta = 35^{\circ }$. Interestingly, non-trivial steady states were not observed for $\theta = 25^{\circ }$ at larger values of $D/d$ that are below the $D/d$ threshold beyond which the bow shock moves upstream of the cone tip; $D/d = 3.57$, the largest value in this study for $\theta = 25^{\circ }$, was experimentally found to be very close to the threshold value. It therefore is concluded that $\theta = 25^{\circ }$ cannot support a steady shock system (excluding the trivial scenarios). Similarly, a steady state was not observed for $L/d = 1.87$ ($\theta = 15^{\circ }$), with $D/d = 4.57$ being the largest value investigated. It is to be noted that as $\theta$ is further reduced toward the limit $\theta = 0^{\circ }$, the geometry approaches a spiked cylinder, where a steady state was observed in literature for $D/L \gtrapprox 5$ (Kenworthy Reference Kenworthy1978); this is a trivial case with the bow shock standing upstream of the spike tip. This implies that in the scenario of $\theta \to 0^{\circ }$ ($L \gg d$), only trivial steady shock systems are observed at very large values of $D/d$ where $D/L \gtrapprox 5$. Therefore, by qualitative interpolation of the steady-pulsation boundary between $\theta = 25^{\circ }$ and $\theta \to 0^{\circ }$, it is hypothesized that non-trivial steady states do not exist for $\theta$ below a critical value, which lies somewhere between $35^{\circ }$ and $25^{\circ }$.

2.3. Shock-wave pulsations

2.3.2. Pulsation mechanism

During pulsations, the shock structure is severely disrupted from its steady state, and the shock system executes periodic motion with a time period $T$ and amplitudes comparable to the length scale $L$ of the conical forebody. As a representative example, figure 5 shows a selection of schlieren images in sequence at 16 different instances over one pulsation cycle for $D/d = 2.14$ and $\theta = 25^{\circ }$. The starting point for the cycle, i.e. time $t/T = 0$ (figure 5a), is chosen to be the instant where the bow shock stand-off distance and its shape above the triple point match the bow shock that forms over a forward-facing cylinder of the same diameter without the conical forebody (which was obtained by a separate experiment). At $t/T = 0$, the instantaneous shock wave and flow structure show a close resemblance to a steady state, like seen in figure 4(a). Growth of the separation region, for reasons outlined in § 2.3.1, results in upstream motion of the separation point along with a continuous increase in the separation shock angle, and consequently upward motion of the triple point; this is seen in figures 5(a) through 5(d). The separation region continues to grow and distorts the shape of the separation shock, which now begins to resemble a bow shock as seen in figures 5(e) and 5(f). During this phase, the bow shock stand-off distance remains unchanged. Following this, the triple point rapidly moves downstream as it continues its upward motion, and the separation shock transforms itself into a bow shock, as seen in figures 5(f) through 5(i). Figure 5(i) shows the instance where this transformation is complete and the newly-formed bow shock fully envelopes the axisymmetric body. At this point in the cycle, the sonic region around the cylinder shoulder (denoted in figure 4(c) by a sonic line) reaches its maximum area and allows for a high mass flux. The increased mass flux around the cylinder shoulder results in a rapid size reduction of the separated region and thereby a pull back of the newly-formed bow shock (figures 5(j) through 5(n)). The conical shock re-appears during this pull-back phase and interacts with the retreating bow shock. Note that bow shock overshoots the reference stand-off distance ($t/T = 0$) during pull back and reaches closer to the base; this is clearly seen in figure 5(n) which shows the instant where the retreating bow shock comes to a stop before reversing its direction of motion. Following the direction reversal, the bow shock returns to the stand-off position held at the beginning of the cycle (figures 5(n) through 5(p)) and the next cycle of pulsation begins.

Figure 5. A selection of schlieren images in sequence at 16 different instances over one pulsation time period $T$ for $D/d = 2.14$ and $\theta = 25^{\circ }$. A body-fixed reference line (in colour) is provided in all images as a visual aid to track shock-wave motion (also see supplementary movie file).

The key features of shock pulsation are growth of the separation region, deformation of the shock structure and upward motion of the triple point, and rapid collapse of the separation region and deformed shock structure. These features were consistently observed in the schlieren data across the entire region that exhibits pulsations in the $L/d$–$D/d$ parameter space. However, changes in relative values of $L/D$ and $D/d$ within the pulsation region bring about some differences in the deformed shock structures. Particularly for low values of $D/d$, close to the transition from pulsations to oscillations, there is no formation of a large bow shock like the one observed in figure 5. For all the pulsation cases shown in figure 3(b), the non-dimensional time periods $Tu/L$ were calculated by shock-location tracking over multiple pulsation cycles, and the results are reported in figure 3(c). It is interesting to note the steady-pulsation transition boundary trend seen in figure 3(b) indicates that with increasing $\theta$ the shock unsteadiness either completely ceases beyond some value of $\theta$ slightly larger than $45^\circ$, or is confined to an increasingly small region of $D/d$ close to 1 until $\theta = \theta _d$. This observation can be attributed to reduction in the transmitted shock strength with increasing $\theta$ (as discussed in § 2.2), which implies that beyond a certain $\theta$ the wall pressure gradient is perhaps not sufficiently strong to induce flow reversal and trigger large-scale unsteadiness.

2.4. Shock-wave oscillations

Consider the pulsation region of the parameter space for reducing values of $D/d$ at $L/d = 1.07$ ($\theta = 25^{\circ }$). At $D/d \approx 1.3$, the nature of shock oscillations undergoes a distinct change from large-amplitude unsteadiness to small-amplitude fluctuations in shock structure. A mechanism for this transition is proposed by considering the flow behaviour with increasing $D/d$ starting at the limiting value of $D/d = 1$, i.e. $h/d = 0$. As $h/d$ is gradually increased, a separation bubble begins to grow in the vicinity of the cone base, nested by the corner. This situation is similar to the canonical problem of high-speed flow over a forward-facing step (e.g. Murugan & Govardhan Reference Murugan and Govardhan2016), albeit here the step has a downstream inclination. The separation bubble will be accompanied by the development of a shear layer in the region over the bubble, driven by the velocity gradient between the subsonic flow inside the bubble and supersonic flow outside. For small bubble sizes, i.e. for relatively small values of $h/d$, this shear layer remains steady, and overall the shock system is steady. The steady states recorded for $\theta = 25^\circ$ and $35^\circ$ at $D/d$ close to 1 (see figure 3b) are representative of this scenario. With increasing $h/d$, the bubble size increases and pushes the separation shock upstream along the conical surface, and leads to a longer development length of the shear layer. Instabilities in the shear layer begin to manifest and grow beyond a critical value of the development length; this is clearly observed in figure 6(a) which shows an instantaneous schlieren image for the case $D/d = 1.26$ and $\theta = 25^{\circ }$ as a representative example for shock oscillations. These instabilities interact with the separation shock, resulting in small-amplitude high-frequency undulations in its structure. Further, these shear-layer instabilities are accompanied by small-amplitude expansions and contractions in the size of the separation region due to impingement of the unsteady shear layer on the cylinder base, and this results in periodic fore-and-aft motion of the separation point along the conical surface. The motion of the separation point naturally imparts unsteadiness to the separation shock. These flow features are collectively termed as oscillations for the purposes of classification and making a distinction from pulsations. Figures 6(b) and 6(c) show the average and standard deviation, respectively, of image intensity obtained from a temporal sequence of 5000 schlieren images for $D/d = 1.26$ and $\theta = 25^{\circ }$. The separation shock clearly stands out in the standard deviation map as a region of relatively large fluctuations in intensity, indicative of the unsteadiness caused due to its interaction with unsteady shear-layer structures along with the unsteadiness brought about by the fore-and-aft motion of the separation point (denoted by ‘$S$’ in figure 6). The unsteadiness within the separation region is also highlighted by the standard deviation map.

Figure 6. (a) An instantaneous schlieren image of the oscillating shock system for $\theta = 25^{\circ }$ and $D/d = 1.26$ (also see supplementary movie file); (b) an average (temporal) intensity map; (c) a standard deviation (temporal) intensity map. Here, ‘$S$’ denotes the separation point.

The size of the separation bubble ceases to scale with $D/d$ beyond a certain threshold, and a bow shock forms around the base cylinder and interacts with the separation shock. This brings into play the pulsation mechanisms discussed in § 2.3, and at this point the shock-wave system makes a transition from oscillation to a pulsation state; this transition is observed at $D/d \approx 1.3$ for $\theta = 25^{\circ }$. This understanding can be generalized for other values of $L/d$ ($\theta$) where an increase in $D/d$ starting in the oscillation regions brings about a transition in the shock system from oscillation to pulsation state, with the $D/d$ transition boundary dependent on $L/d$. The pulsation–oscillation boundary trend in the $L/d{-}D/d$ parameter space also indicates a narrowing of the unsteadiness regime in $D/d$ with increasing $\theta$, and lends support to the conclusions drawn in § 2.3.2 on the basis of the steady-pulsation boundary behaviour.

2.5. Spectral analysis

The contrasting flow features between shock pulsations and oscillations were also studied by a comparison of the Fourier spectra obtained from time-resolved schlieren data. Analysis of the spectral content of temporal fluctuations in the local spatial density gradient (which is captured by schlieren) can give useful insights into the frequencies associated with flow features of interest (Leidy et al. Reference Leidy, Neel, Tichenor and Bowersox2020). Figure 7 presents maps of power spectral density ($\varPhi$) of image intensity fluctuations for the pulsation and oscillation cases shown in figures 5 and 6, respectively. In each case, $\varPhi$ was calculated from temporal data extracted along two lines of pixels that are indicated in the figure; the lines are labelled $P_{1}$ and $P_{2}$ in figure 7(a), and $O_ {1}$ and $O_{2}$ in figure 7(d). Lines $P_{1}$ and $O_{1}$ are perpendicular to the cone axis, and lines $P_{2}$ and $O_{2}$ are parallel to the respective cone generator line at the top. For each line, $l$ indicates the normalized distance along the line, with $l = 0$ and $l = 1$ being the end points. In each of the colourmaps, $\varPhi$ is normalized by its maximum value $\varPhi _{{max}}$ from that colourmap.

Figure 7. Power spectral density ($\varPhi$) maps of fluctuations in schlieren image intensity. (a) An instantaneous schlieren image of the pulsating shock system for $D/d = 2.14$ and $\theta = 25^{\circ }$ (reproduced from figure 5a); the lengths of lines $P_{1}$ and $P_{2}$ are 0.71$d$ and 1.18$d$, respectively. (b) Normalized $\varPhi$ for data from $P_{1}$. (c) Normalized $\varPhi$ for data from $P_{2}$. (d) An instantaneous schlieren image of the oscillating shock system for $D/d = 1.26$ and $\theta = 25^{\circ }$ (reproduced from figure 6a); the lengths of $O_{1}$ and $O_{2}$ are 0.25$d$ and 0.99$d$, respectively. (e) Normalized $\varPhi$ for data from $O_{1}$. (f) Normalized $\varPhi$ for data from $O_{2}$. Tick marks on lines $P_{1}$, $P_{2}$, $O_{1}$, $O_{2}$ in figures (a) and (d) are in 0.2$l$ increments.

In the case of pulsation, a strong spectral peak is seen at a non-dimensional frequency $fL/u = 0.058$ for both $P_{1}$ and $P_{2}$ (figures 7(b) and 7(c)). As discussed previously, the pulsation flow field is dominated by the periodic motion of the shock system, and the same is clearly reflected in the spectra. Note that $f = 0.058\,u/L = 1/T$, where $T$ is the time period of shock pulsations. The spectral signature seen at the harmonic frequencies of $fL/u = 0.058$ merely indicates the fact that image intensity fluctuations produced by the pulsating shock (and the associated flow) are periodic but not purely sinusoidal. In comparison with pulsation, the oscillation case presents a relatively broad region of spectral activity. Data for $O_{1}$ shows a band of strong fluctuations between $l\approx 0.6$ and $l\approx 0.8$, with activity spread across a wide range of frequencies. This band corresponds to the spatial location where the separation shock exhibits unsteady undulations, as discussed in the previous section. This observation is consistent with the standard deviation intensity map (figure 6c) wherein the region around the separation shock stands out. The spectral peak in this band is found to be at $fL/u = 0.16$, and the spectral signature at this frequency extends down into the shear-layer region until $l\approx 0.2$. Hence, $fL/u = 0.16$ can be identified as the characteristic frequency of oscillations. Note that data for $O_{2}$ also shows a clear spectral signature at $fL/u = 0.16$. The band of strong fluctuations between $l\approx 0.2$ and $l\approx 0.4$ for $O_{2}$ is indicative of the fore-and-aft motion of the separation point.