On the inertial effects of density variation in stratified shear flows

Guha, Anirban; Raj, Raunak

doi:10.1063/1.5054946

Cited by 11 publications

(6 citation statements)

References 39 publications

(50 reference statements)

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“…Even for infinite depth, the non‐Boussinesq torque should still be taken into account when multiple density interfaces exist (Heifetz and Mak, ; Guha and Raj, ). This is because the vortex sheet gravity waves induce far‐field horizontal fields on each other and thereby activate the non‐Boussinesq dynamics.…”

Section: Discussionmentioning

confidence: 99%

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On the opposing roles of the Boussinesq and non‐Boussinesq baroclinic torques in surface gravity wave propagation

Heifetz

Maor

Guha

2019

Quart J Royal Meteoro Soc

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Here we suggest an alternative understanding of the surface gravity wave propagation mechanism based on the baroclinic torque, which operates to translate the interfacial vorticity anomalies at the air–water interface. We demonstrate how the non‐Boussinesq term of the baroclinic torque acts against the Boussinesq one to hinder wave propagation. By standard vorticity inversion and mirror imaging, we then show how the existence of the bottom boundary affects the two types of torque. Since the opposing non‐Boussinesq torque results solely from the mirror image, it vanishes in the deep‐water limit and its magnitude is half of the Boussinesq torque in the shallow‐water limit. This reveals that the Boussinesq approximation is valid in the deep‐water limit, even though the density contrast between air and water is large. The mechanistic roles played by the Boussinesq and non‐Boussinesq parts of the baroclinic torque remain obscured in the standard derivation where the time‐dependent Bernoulli equation is implemented instead of the interfacial vorticity equation. Finally, we note on passing that the Virial theorem for surface gravity waves can be obtained solely from considerations of the dynamics at the air–water interface.

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Section: Discussionmentioning

confidence: 99%

“…In other words, this implies that the Boussinesq effects are not confined to “small density variations,” as is conventionally understood. A similar conclusion has been obtained by Guha and Raj () using detailed scaling arguments.…”

Section: Dispersion Relation Analysismentioning

confidence: 99%

On the opposing roles of the Boussinesq and non‐Boussinesq baroclinic torques in surface gravity wave propagation

Heifetz

Maor

Guha

2019

Quart J Royal Meteoro Soc

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“…While reasonable on physical grounds, both the Boussinesq and rigid-lid assumptions do have clear structural mathematical consequences which are not often emphasised in the literature, for example the aforementioned breaking of symmetry, changes in the stability characteristics (Barros & Choi 2011; Boonkasame & Milewski 2012; Heifetz & Mak 2015; Guha & Raj 2018) of certain flows, and a momentum paradox (Camassa et al. 2012).…”

Section: Introductionmentioning

confidence: 99%

Nonlinear travelling periodic waves for the Euler equations in three-layer flows

Guan,

Doak,

Milewski

et al. 2024

J. Fluid Mech.

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In this paper, we investigate periodic travelling waves in a three-layer system with the rigid-lid assumption. Solutions are recovered numerically using a boundary integral method. We consider the case where the density difference between the layers is small (i.e. a weakly stratified fluid). We consider the system both with and without the Boussinesq assumption to explore the effect the assumption has on the solution space. Periodic solutions of both mode-1 and mode-2 are found, and their bifurcation structure and limiting configurations are described in detail. Similarities are found with the two-layer case, where large-amplitude solutions are found to overhang with an internal angle of $120^{\circ }$ . However, the addition of a second interface results in a richer bifurcation space, in part due to the existence of mode-2 waves and their resonance with mode-1 waves. New limiting profiles are found.

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“…He established that both of these mechanisms are of equal importance for a better understanding of the instability’s features 22 . In order to gain insight into the inertial effects of variations in density, Guha and Raj examined a range of non-Boussinesq shear flows and Holmboe waves, which are a type of steadily propagating wave that can occur at the boundary between two fluids with different background densities and vorticities 23 . Some of the results, such as the destabilizing nature of density stratification and the stabilizing effects of shear, appeared to be counterintuitive; however, these instabilities could be explained in terms of wave-interaction if viewed from a different perspective 23 .…”

Section: Introductionmentioning

confidence: 99%

Presence of Holmboe waves in particle-laden intrusive gravity current

Dehjalali

Khavasi

Nazmi

2023

Sci Rep

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The present study evaluates the prevalence of Holmboe waves in an intrusive gravity current (IGC) containing particles, employing large Eddy simulation (LES). Holmboe waves, a type of stratified shear layer-generated wave, are characterised by a relatively thin density interface compared to the thickness of the shear layer. The study demonstrates the occurrence of secondary rotation, wave stretching over time, and fluid ejection at the interface between the IGC and a lower gravity current (LGC). Results indicate that, aside from J and R, the density difference between the IGC and the LGC has an impact on Holmboe instability. However, a reduction in the density difference does not manifest consistently in the frequency, growth rate, and phase speed, though it does cause an increase in the wavelength. It is important to note that small particles do not affect the Holmboe instability of the IGC, while larger particles cause the current to become unstable and vary the characteristics of Holmboe instability. Moreover, an increase in the particle diameter size results in an increment in the wavelength, growth rate, and phase speed; but is accompanied by a decrease in frequency. Additionally, the enlargement of the bed slope angle makes the IGC more unstable, encouraging the growth of Kelvin–Helmholtz waves; however, this causes Holmboe waves to disappear on inclined beds. Finally, a range for the instabilities of both Kelvin–Helmholtz and Holmboe is provided.

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On the inertial effects of density variation in stratified shear flows

Cited by 11 publications

References 39 publications

On the opposing roles of the Boussinesq and non‐Boussinesq baroclinic torques in surface gravity wave propagation

On the opposing roles of the Boussinesq and non‐Boussinesq baroclinic torques in surface gravity wave propagation

Nonlinear travelling periodic waves for the Euler equations in three-layer flows

Presence of Holmboe waves in particle-laden intrusive gravity current

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