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The influences of non-Oberbeck–Boussinesq (NOB) effects on flow instabilities and bifurcation characteristics of Rayleigh–Bénard convection are examined. The working fluid is air with reference Prandtl number
$Pr=0.71$
and contained in two-dimensional rigid cavities of finite aspect ratios. The fluid flow is governed by the low-Mach-number equations, accounting for the NOB effects due to large temperature difference involving flow compressibility and variations of fluid viscosity and thermal conductivity with temperature. The intensity of NOB effects is measured by the dimensionless temperature differential
$\unicode[STIX]{x1D716}$
. Linear stability analysis of the thermal conduction state is performed. An
$\unicode[STIX]{x1D716}^{2}$
scaling of the leading-order corrections of critical Rayleigh number
$Ra_{cr}$
and disturbance growth rate
$\unicode[STIX]{x1D70E}$
due to NOB effects is identified, which is a consequence of an intrinsic symmetry of the system. The influences of weak NOB effects on flow instabilities are further studied by perturbation expansion of linear stability equations with regard to
$\unicode[STIX]{x1D716}$
, and then the influence of aspect ratio
$A$
is investigated in detail. NOB effects are found to enhance (weaken) flow stability in large (narrow) cavities. Detailed contributions of compressibility, viscosity and buoyancy actions on disturbance kinetic energy growth are identified quantitatively by energy analysis. Besides, a weakly nonlinear theory is developed based on centre-manifold reduction to investigate the NOB influences on bifurcation characteristics near convection onset, and amplitude equations are constructed for both codimension-one and -two cases. Rich bifurcation regimes are observed based on amplitude equations and also confirmed by direct numerical simulation. Weakly nonlinear analysis is useful for organizing and understanding these simulation results.
A theoretical study of the decay of plane gaseous detonations is presented. The analysis concerns the relaxation of weakly overdriven detonations toward the Chapman–Jouguet (CJ) regime when the supporting piston is suddenly arrested. The initial condition concerns propagation velocities
${\mathcal{D}}$
that are not far from that of the CJ wave
${\mathcal{D}}_{CJ}$
,
$0<({\mathcal{D}}/{\mathcal{D}}_{CJ}-1)\ll 1$
. The unsteady inner structure of the detonation wave is taken into account analytically for small heat release, i.e. when the propagation Mach number of the CJ wave
$M_{u_{CJ}}$
is small,
$0<(M_{u_{CJ}}-1)\ll 1$
. Under such conditions the flow is transonic across the inner structure. Then, with small differences between heat capacities (Newtonian limit), the problem reduces to an integral equation for the velocity of the lead shock. This equation governs the detonation dynamics resulting from the coupling of the unsteady inner structure with the self-similar dynamics of the centred rarefaction wave in the burnt gas. The key point of the asymptotic analysis is that the response time of the inner structure is larger than the reaction time. How, and to what extent, the result is relevant for real detonations is discussed in the text. In a preliminary step the steady-state approximation is revisited with particular attention paid to the location of the sonic condition.
We present results on the global and local characterisation of heat transport in homogeneous bubbly flow. Experimental measurements were performed with and without the injection of
${\sim}2.5~\text{mm}$
diameter bubbles (corresponding to bubble Reynolds number
$Re_{b}\approx 600$
) in a rectangular water column heated from one side and cooled from the other. The gas volume fraction
$\unicode[STIX]{x1D6FC}$
was varied in the range 0 %–5 %, and the Rayleigh number
$Ra_{H}$
in the range
$4.0\times 10^{9}{-}1.2\times 10^{11}$
. We find that the global heat transfer is enhanced up to 20 times due to bubble injection. Interestingly, for bubbly flow, for our lowest concentration
$\unicode[STIX]{x1D6FC}=0.5\,\%$
onwards, the Nusselt number
$\overline{Nu}$
is nearly independent of
$Ra_{H}$
, and depends solely on the gas volume fraction
$\unicode[STIX]{x1D6FC}$
. We observe the scaling
$\overline{Nu}\,\propto \,\unicode[STIX]{x1D6FC}^{0.45}$
, which is suggestive of a diffusive transport mechanism, as found by Alméras et al. (J. Fluid Mech., vol. 776, 2015, pp. 458–474). Through local temperature measurements, we show that the bubbles induce a huge increase in the strength of liquid temperature fluctuations, e.g. by a factor of 200 for
$\unicode[STIX]{x1D6FC}=0.9\,\%$
. Further, we compare the power spectra of the temperature fluctuations for the single- and two-phase cases. In the single-phase cases, most of the spectral power of the temperature fluctuations is concentrated in the large-scale rolls/motions. However, with the injection of bubbles, we observe intense fluctuations over a wide range of scales, extending up to very high frequencies. Thus, while in the single-phase flow the thermal boundary layers control the heat transport, once the bubbles are injected, the bubble-induced liquid agitation governs the process from a very small bubble concentration onwards. Our findings demonstrate that the mixing induced by high Reynolds number bubbles (
$Re_{b}\approx 600$
) offers a powerful mechanism for heat transport enhancement in natural convection systems.
The neutral curves of the boundary layer Görtler-vortex flow generated by free-stream disturbances, i.e., curves that distinguish the perturbation flow conditions of growth and decay, are computed through a receptivity study for different Görtler numbers, wavelengths, and low frequencies of the free-stream disturbance. The perturbations are defined as Klebanoff modes or strong and weak Görtler vortices, depending on their growth rate. The critical Görtler number below which the inviscid instability due to the curvature never occurs is obtained and the conditions for which only Klebanoff modes exist are thus revealed. A streamwise-dependent receptivity coefficient is defined and we discuss the impact of the receptivity on the
$N$
-factor approach for transition prediction.
Second-mode wave growth within the hypersonic boundary layer of a slender cone is investigated experimentally using high-speed schlieren visualizations. Experiments were performed in AEDC Tunnel 9 over a range of unit Reynolds number conditions at a Mach number of approximately 14. A thin lens with a known density profile placed within the field of view enables calibration of the schlieren set-up, and the relatively high camera frame rates employed allow for the reconstruction of time-resolved pixel intensities at discrete streamwise locations. The calibration in conjunction with the reconstructed signals enables integrated spatial amplification rates (
$N$
factors) to be calculated for each unit Reynolds number condition and compared to
$N$
factors computed from both pressure transducer measurements and linear parabolized stability equation (PSE) solutions. Good agreement is observed between
$N$
factors computed from the schlieren measurements and those computed from the PSE solutions for the most-amplified second-mode frequencies. The streamwise development of
$N$
factors calculated from the schlieren measurements compares favourably to that calculated from the pressure measurements with slight variations in the
$N$
factor magnitudes calculated for harmonic frequencies. Finally, a bispectral analysis is carried out to identify nonlinear phase-coupled quadratic interactions present within the boundary layer. Multiple interactions are identified and revealed to be associated with the growth of disturbances at higher harmonic frequencies.