Boundary-layer thickness effects of the hydrodynamic instability along an impedance wall

Rienstra, SW Sjoerd; Darau, M Mirela

doi:10.1017/s0022112010006051

Cited by 126 publications

(109 citation statements)

References 30 publications

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“…The boundary condition proposed by Rienstra and Darau [12,13] assumes a boundary layer with a small thickness d, a linear velocity profile and a uniform mean density. This two-dimensional boundary condition was derived in the incompressible limit and was devised to provide a good approximation of the hydrodynamic oscillations of the boundary layer (see also [15]).…”

Section: Brambleymentioning

confidence: 99%

“…This defines a family of boundary conditions characterized by the parameter s. Originally, s was set to zero [12], but subsequently it was suggested to use s ¼ 1=3 to remove the second-order derivative in v [13]. The case s ¼ 1 is also considered here since it is more consistent with the special cases discussed in Section 3.…”

Section: Brambleymentioning

confidence: 99%

“…(7) to three dimensions follows that in [13], and the derivation is outlined in Appendix A. However, it was found that the last step of the derivation differs from [13], and the following version of the boundary condition is proposed here:…”

Section: Brambleymentioning

confidence: 99%

“…While this assumption is acceptable when modeling the hydrodynamic oscillations of the boundary layer (as shown in Ref. [13,15]), it is an issue if this boundary condition is used to model sound absorption by a lined surface.…”

Section: Two-dimensional Analysismentioning

confidence: 99%

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A comparison of impedance boundary conditions for flow acoustics

Gabard

2013

Journal of Sound and Vibration

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a b s t r a c tAcoustic liners remain a key technology for reducing community noise from aircraft engines. The choice of optimal impedance relies heavily on the modeling of sound absorption by liners under grazing flows. The Myers condition assumes an infinitely thin boundary layer, but several impedance conditions have recently been proposed to include a small but finite boundary layer thickness. This paper presents a comparison of these impedance conditions against an exact solution for a simple benchmark problem and for parameters representative of inlet and bypass ducts on turbofan engines. The boundary layer thickness can have a significant impact on sound absorption, although its actual influence depends strongly on the details of the incident sound field. The impedance condition proposed by Brambley seems to provide some improvements in predicting sound absorption compared to the Myers condition. The boundary layer profile is found to have little influence on sound absorption.

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Section: Brambleymentioning

confidence: 99%

Section: Brambleymentioning

confidence: 99%

Section: Brambleymentioning

confidence: 99%

Section: Two-dimensional Analysismentioning

confidence: 99%

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A comparison of impedance boundary conditions for flow acoustics

Gabard

2013

Journal of Sound and Vibration

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“…These two issues are problematic for time-domain simulations, where errors generate perturbations at every frequency, and may result in difficulties with numerical convergence. For frequencydomain computations, however, they are of minor practical importance [23]. It has also been shown that the Myers model fails to result in a single impedance value for wave propagation downstream and upstream in a lined duct when the acoustic boundary layer is not much smaller that the mean flow boundary layer thickness, i.e.…”

Section: A Wem-based Methodology For Computing the Propagation In A Lmentioning

confidence: 99%

A wave expansion method for acoustic propagation in lined flow ducts

O’Reilly

2015

Applied Acoustics

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Acoustic liners are used extensively in engineering applications, particularly in aero-engines and automotive exhaust systems. In this paper, a flow impedance boundary conditions is introduced into the wave expansion method with the aim of providing an efficient methodology for computing the acoustic propagation through a lined duct with flow. For a potential flow, the boundary layer and the lined wall are included in the discretisation scheme by the Myers flow impedance boundary condition. The acoustic propagation through a flow-impedance tube is computed in order to validate the implementation of the impedance boundary condition in this scheme. The results show that this computationally light methodology provides generally good agreement with the experimental data.

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Impedance boundary conditions for acoustic time‐harmonic wave propagation in viscous gases in two dimensions

Schmidt

Thöns‐Zueva

2022

Math Methods in App Sciences

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We present impedance boundary conditions for the viscoacoustic equations for approximative models that are in terms of the acoustic pressure or in terms of the macroscropic acoustic velocity. The approximative models are derived by the method of multiple scales up to order 2 in the boundary layer thickness. The boundary conditions are stable and asymptotically exact, which is justified by a complete mathematical analysis. The models can be discretized by finite element methods without resolving boundary layers. In difference to an approximation by asymptotic expansion for which for each order 1 PDE system has to be solved, the proposed approximative are solutions to one PDE system only. The impedance boundary conditions for the pressure of first and second orders are of Wentzell type and include a second tangential derivative of the pressure proportional to the square root of the viscosity and take thereby absorption inside the viscosity boundary layer of the underlying velocity into account. The conditions of second order incorporate with curvature the geometrical properties of the wall. The velocity approximations are described by Helmholtz‐like equations for the velocity, where the Laplace operator is replaced by ∇div0.3em, and the local boundary conditions relate the normal velocity component to its divergence. The velocity approximations are for the so‐called far field and do not exhibit a boundary layer. Including a boundary corrector, the so‐called near field, the velocity approximation is accurate even up to the domain boundary. The results of numerical experiments illustrate the theoretical foundations.

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Boundary-layer thickness effects of the hydrodynamic instability along an impedance wall

Cited by 126 publications

References 30 publications

A comparison of impedance boundary conditions for flow acoustics

A comparison of impedance boundary conditions for flow acoustics

A wave expansion method for acoustic propagation in lined flow ducts

Impedance boundary conditions for acoustic time‐harmonic wave propagation in viscous gases in two dimensions

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