Modeling Aeroacoustics with the Linearized NavierStokes Equations
Mads Herring Jensen July 25, 2017
Detailed modeling of the complex interaction of flow and acoustics is achieved in the COMSOL Multiphysics® software and addon Acoustics Module using the linearized NavierStokes interfaces. With the release of version 5.3, the capabilities were further extended with the addition of a new stabilization scheme. This allows robust simulations of systems with acoustic properties that are modified by or depend on a turbulent background flow; e.g., automotive exhaust systems. Here, we introduce important modeling concepts and present application examples.
Introduction to Aeroacoustics Modeling
The complex interaction of a stationary background flow and an acoustic field can be modeled using the linearized NavierStokes physics interfaces in the Acoustics Module. The interfaces allow for a detailed analysis of how a flow, which can be both turbulent and nonisothermal, influences the acoustic field in different systems. This includes all linear effects in which a background flow interacts with and modifies an acoustic field. The linearized NavierStokes interfaces do not induce flowinduced noise source terms. Basically, the equations solve for the full linear perturbation to the general equations of CFD — mass, momentum, and energy conservation.
Being able to model and simulate the details of how a background flow influences an acoustic field is important in many industries and areas of application. In the automotive industry, the acoustic properties of exhaust and intake systems are altered when a flow passes through them. For example, the transmission loss of a muffler changes depending on the magnitude of the bypass background flow. In aerospace applications, the study of how liners and perforates behave acoustically when a flow is present is of high interest. The detailed acoustic properties (absorption, impedance, and reflection coefficients) of these subsystems influence the systemlevel behavior of, for example, a jet engine.
In the muffler and liner examples, the attenuation of the acoustic signal by the turbulence present in the background flow can also be captured with the linearized NavierStokes equations. Moreover, the background flows in these models are often nonisothermal in nature.
Example of an automotive application. Results from the Helmholtz resonator with flow example presented below. In front, the color surface plot is of the sound pressure level. At the back, the streamlines are of the background flow.
The linearized NavierStokes interfaces have a builtin multiphysics coupling to structures. This enables an outofthebox setup of fluidstructure interaction (FSI) models in the frequency domain (or in the linear regime in the time domain). The interaction of flow, acoustics, and structural vibrations is important in many applications. One application example is for flow sensing in a Coriolis flow meter. In general, these interfaces are suited for the analysis of the changed vibrational behavior of structures when under a fluid load by a background flow.
Example of FSI in the frequency domain: the movement of a Coriolis flow meter actuated at the fundamental frequency. The surface shows the structural deformation (the phase and amplitude are highly exaggerated for visualization) and the open cutout section of the pipe shows the acoustic pressure on the pipe’s inner surface.
Other applications of the linearized NavierStokes interfaces include the study of combustion instabilities and general induct acoustics as well as more academic applications like analyzing the onset of flow instabilities or studying regions prone to whistling.
The interfaces now include the Galerkin least squares (GLS) stabilization scheme, enabling more robust simulations. This new default setting better handles the numerical and physical instabilities introduced by the convective and reactive terms included in the governing equations. Moreover, the reformulated slip boundary condition is now well suited when solving models with an iterative solver. This is crucial in cases where large industrial problems have to be solved.
The Linearized NavierStokes Equations
The linearized NavierStokes equations represent a linearization to the full set of governing equations for a compressible, viscous, and nonisothermal flow (the NavierStokes equations). It is performed as a firstorder perturbation around the steadystate background flow defined by its pressure, velocity, temperature, and density (p_{0}, u_{0}, T_{0}, and ρ_{0}). This results in the governing equations for the propagation of small perturbations in the pressure, velocity, and temperature (p, u, and T) — the dependent variables. In perturbation theory, a subscript 1 is sometimes used to express that these variables are firstorder perturbations. The governing equations (with subscript 0 on the background fields) read:
(1)
& \frac{\partial \rho}{\partial t}+\nabla\cdot(\rho_0 \mathbf{u}+\rho \mathbf{u}_0)=M \\
& \rho_0 \left[ \frac{\partial \mathbf{u}}{\partial t} + (\mathbf{u}\cdot\nabla)\mathbf{u}_0 + (\mathbf{u}_0\cdot\nabla)\mathbf{u} \right] + \rho (\mathbf{u}_0\cdot\nabla)\mathbf{u}_0 = \nabla\cdot\mathbf{\sigma} + \mathbf{F} \mathbf{u}_0 M \\
& \rho_0 c_p \left[ \frac{\partial T}{\partial t} + \mathbf{u}\cdot\nabla T_0 + \mathbf{u}_0\cdot\nabla T \right] + (\rho c_p)\mathbf{u}_0\cdot\nabla T_0 \\
& \qquad \alpha_p T_0 \left[ \frac{\partial p}{\partial t} + \mathbf{u}\cdot\nabla p_0 + \mathbf{u}_0\cdot\nabla p \right] (\alpha_p T)\mathbf{u}_0\cdot \nabla p_0 = \nabla \cdot (\kappa \nabla T) + \Phi + Q
\end{align}
where Φ = ∇u : τ_{0} + u_{0} : τ is the viscous dissipation function; M, F, and Q represent possible source terms; κ is the coefficient of thermal conduction (SI unit: W/m/K); α_{p} is the (isobaric) coefficient of thermal expansion (SI unit: 1/K); β_{T} is the isothermal compressibility (SI unit: 1/Pa); and _{p} is the specific heat capacity (heat capacity per unit mass) at constant pressure (SI unit: J/kg/K).
In the frequency domain, the time derivatives are, in the usual manner, replaced by a multiplication with iω. The constitutive equations for the stress tensor and the linearized equation of state (density perturbation) are given by:
(2)
\mathbf{\sigma} & = p\mathbf{I}+\mathbf{\tau}=p\mathbf{I}+\mu \left( \nabla \mathbf{u}+(\nabla \mathbf{u})^\textrm{T} \right) + \left( \mu_B \frac{2}{3}\mu \right)(\nabla\cdot\mathbf{u})\mathbf{I}\\
\rho & = \rho_0 (\beta_T p \alpha_p T)
\end{align}
where τ is the viscous stress tensor (Stokes expression), μ is the dynamic viscosity (SI unit: Pa s), and μ_{B} is the bulk viscosity (SI unit: Pa s).
The Fourier heat conduction law is used in the energy equation. A detailed derivation of the equations can be found in the Acoustics Module User’s Guide. The equations can be solved in the time domain or frequency domain using either the Linearized NavierStokes, Transient interface or the Linearized NavierStokes, Frequency Domain interface.
By taking a closer look at the governing equations presented in (1), you can see that they contain different types of terms:
 Timedependent or frequencydependent terms (first term in the equations)
 Diffusive terms (losses due to viscosity and thermal conduction)
 Convective terms of the type u_{0} ∙ ∇(…)
 Reactive terms of the type p ∙ (…), u ∙ (…), or T ∙ (…)
 Possible source terms
Because of the general nature of the equations solved in the interfaces, they naturally model the propagation of acoustic (compressible) waves, vorticity waves, and entropy waves. The latter two types of waves are only convected with the background flow velocity and do not propagate at the speed of sound. As an acoustic wave propagates, it can interact with the flow (through the reactive terms) and energy can be transferred to and from an acoustic mode to both the vorticity and entropy modes. The reactive terms in the governing equations are responsible for this flowacousticlike coupling. This is in the sense that the vorticity and entropy waves are nonacoustic (CFDlike) perturbations to the background flow solution, so to some extent, they model the linear interaction between CFD and acoustics.
In many aeroacoustics formulations, the reactive terms are disregarded, as they are also responsible for the processes that generate the KelvinHelmholtz instabilities. These can be difficult to handle numerically. On the other hand, if the terms are disregarded, accurate modeling of sound attenuation and amplification is lost. The reactive terms are fully included in the linearized NavierStokes interfaces.
The growth of the instabilities is handled in two ways in COMSOL Multiphysics. The temporal growth of the instabilities can be handled by selecting the frequencydomain formulation rather than the timedomain formulation. The spatial instabilities, which can arise if the vorticity modes are not properly resolved, are efficiently handled by the GLS stabilization scheme.
Depending on the application modeled with the linearized NavierStokes equations, it may be necessary to resolve the acoustic, viscous, and thermal boundary layers. These are naturally created on solid surfaces for an oscillating flow, when noslip and isothermal boundary conditions are present. Typically, it is not necessary to include the details of the losses in the boundary layers in large models (when compared with the boundary layer thickness). The thermal boundary layer can also often be disregarded in liquids but should be included with equal importance in gasses. The two effects can be disregarded by selecting either the slip or the adiabatic options on the wall boundary conditions.
It should be mentioned that one more indirect coupling between the background flow and the acoustics is possible. When an acoustic wave propagates through a region with turbulent background flow, it is attenuated. This effect can be included in the model by coupling the turbulent viscosity from the CFD RANS model to the acoustics model. This effect is important, for example, when analyzing the transmission loss of a muffler system in the presence of a flow.
Modeling Considerations
Solving the linearized NavierStokes equations, which falls under the field of computational aeroacoustics (CAA), poses numerical challenges that need to be considered, understood, and handled carefully. As mentioned above, the governing equations are prone to both physical (KelvinHelmholtz) and numerical instabilities. Because the interfaces use stabilization, the remaining main numerical challenge is to avoid the introduction of numerical noise in terms involving the background field variables (p_{0}, u_{0}, T_{0}, and ρ_{0}). This is especially true in the reactive terms involving the gradient of the background flow variables.
The likelihood of this problem increases if different meshes are used for the CFD and acoustic models and/or different discretization orders are used for the background flow and acoustics problem. Note that using different meshes or discretization orders is well motivated by the fact that the two problems need to resolve different physics and length scales. To prevent this, a careful mapping of the background flow data from CFD to acoustics is necessary. This is a wellunderstood and described step in CAA modeling. Additionally, the mapping step can be used to smooth the CFD data. This can be an overall smoothing or a local smoothing of certain details, like the hydrodynamic boundary layer, if its details are not important for the acoustics model.
In COMSOL Multiphysics, the mapping between the mesh is performed by an additional study step. The details of this step are described in the Acoustics Module User’s Guide and in tutorial models using a linearized NavierStokes physics interface.
When performing simulations with a linearized NavierStokes physics interface, the following points should be considered:
 Resolving the acoustic boundary layers: Consider if the modeled physical effects and the size of the model require that you resolve the acoustic boundary layers. If not, change from the default noslip and isothermal conditions to slip and adiabatic options on walls. The choice may also be motivated by the details resolved by the background flow. For example, full resolution of the background flow boundary layer typically requires a matching noslip condition in the acoustics.
 The mesh should resolve both CFD and acoustics: Important geometric features, boundary layers, and regions with large gradients should be resolved by the mesh used for both the CFD and acoustics simulations. Specifically, the mesh used for the acoustics simulations (if different from the CFD mesh) should resolve acoustic features, like the wavelength and acoustic boundary layer (if modeled, see point above), and also the background flow field features.
 Mapping: Use a mapping step to map the CFD data to the acoustics problem, especially when using different mesh or discretization orders. Smooth the solution, if necessary, and possibly also the boundary layer (this can be done if the slip condition is used in the acoustics study). If required, enforce the noslip condition of the background flow in the mapping step.
 Discretization order: Per default, the linearized NavierStokes interfaces use all linear discretization for the dependent variables, a good choice in most models. However, if noslip and isothermal conditions are used, it can be advantageous to switch to quadratic discretization for the velocity and temperature variables. This increases the spatial resolution near the walls, but also introduces more degrees of freedom to solve for.
Helmholtz Resonator with Flow
Helmholtz resonators (used in exhaust systems) attenuate a narrow and specific frequency band. When a flow is present in the system, it changes the resonator’s acoustic properties as well as the subsystem’s transmission loss. The Helmholtz resonator tutorial model investigates the transmission loss in the main duct (the resonator is located as a side branch) when a mean flow is present.
To calculate the mean flow, the SST turbulence model is used for Mach numbers Ma = 0.05 and Ma = 0.1. The Linearized NavierStokes, Frequency Domain interface is used to solve the acoustics problem. Next, the acoustics model is coupled to the mean flow velocity, pressure, as well as turbulent viscosity. The predicted transmission loss shows good agreement with results from a published journal paper (Ref. 1). For the resonances to be located correctly and the amplitude of the transmission loss to be correct, the model must balance convective and diffusive terms properly. This is achieved in the model.
Transmission loss through the resonator as a function of frequency and Mach number of the background flow.
The pressure distribution inside the system at 100 Hz for Ma = 0.1. A plane wave is incident from the left side upstream of the flow.
Acoustic Liner with a Grazing Background Flow
In the Acoustic Liner with a Grazing Background Flow tutorial model, the acoustic liner consists of eight resonators with thin slits and the background grazing flow is at Mach number 0.3. The sound pressure level above the liner is calculated and shows good agreement with results from a published research paper (Ref. 2). This example computes the flow via the SST turbulence model in the CFD Module and the acoustic propagation with the Linearized NavierStokes, Frequency Domain interface. The acoustic boundary layer is resolved and the default linear discretization is switched to quadratic to improve the spatial resolution near walls.
The curves show the sound pressure level on the surface above the liners for four driving frequencies. The colored part of the curves highlights the extent of the liner. These results show good agreement with the experimental results from the referenced research paper.
The acoustic velocity fluctuations as a plane wave propagates above the liners, showing the first four liners. The driving frequency is 1000 Hz. The color plot shows the velocity amplitude and the arrows show the velocity vector. Near the holes at the surface of the liner, vorticity is generated by the flowacoustics interaction.
Coriolis Flow Meter
Coriolis flow meters — also called mass or inertial flow meters — can measure the mass flow rate of a fluid moving through it. This device can also compute the density of the fluid, hence the volumetric flow rate. The Coriolis Flow Meter tutorial model demonstrates how to model a generic Coriolis flow meter with a curved geometry.
As a fluid travels through an elastic structure (a curved duct, for instance), it interacts with the movement of the structure when vibrating. The Coriolis effect causes a phase difference between the deformation of two points on the duct, which can be used to determine the mass flow rate.
To model this, the Linearized NavierStokes, Frequency Domain interface is coupled to the Solid Mechanics interface via the builtin multiphysics coupling. As for the background mean flow, it is simulated with the Turbulent Flow, SST interface. Using this approach, FSI can be efficiently modeled in the frequency domain.
The phase difference between upstream and downstream points (red dots on the animation below). This curve represents the calibration results needed to run a Coriolis flow meter.
The movement of the Coriolis flow meter for three mass flow rates. The flow meter is actuated at the natural frequency of the structure, f_{d} = 163.5 Hz. The deformation amplitude and phase are exaggerated for visualization. As the flow rate increases, the phase difference upstream and downstream increases.
Learn More About CFD and Acoustics Simulations in COMSOL Multiphysics®
 Check out these examples in the Application Gallery:
 Read this COMSOL Conference 2016 presentation: “Acoustic Scattering through a Circular Orifice in Low Mach Number Flow“
 Check out the COMSOL News 2017 — Special Edition Acoustics
References

E. Selamet, A. Selamet, A. Iqbal, and H. Kim, “Effect of Flow in Helmholtz Resonator Acoustics: A ThreeDimensional Computational Study vs. Experiments”, SAE International Journal, 2011.

C. K. W. Tam, N. N. Pastouchenko, M. G. Jones, and W. R. Watson, “Experimental validation of numerical simulations for an acoustic liner in grazing flow: Selfnoise and added drag”, Journal of Sound and Vibration, p. 333, 2014.
Comments
could you share how to use linearied navierstokes interface in the aeroacoustic module to calculate noise of a jet engine or any example?please. i find this aspect example is very fewer.
Dear Chen Xu, as I stated in the beginning of the blog post the interface (the physics solved here) does not include flow induced noise, if this is what you are asking for. What you can do is to set up an analytical expression for a source and see how it propagates in the presence of a flow. See, for example, http://www.comsol.com/model/1844 or http://www.comsol.com/model/1371. Note that these models rely on another formulation of the governing equations. Best regards, Mads
hello, I have a question about CFD solution onto the acoustic domain. when boundaries have a symmetry edge, you add the constraint in the Helmholtz_resonator case. I don’t understand why V value is set to 0 in the first row in the Weak Form PDE. I spent much time to study the help but i can’t still resolve it. I hope you can help me. Thank you very much.
Hello,
Under Modeling Considerations it is stated:
◾Resolving the acoustic boundary layers: Consider if the modeled physical effects and the size of the model require that you resolve the acoustic boundary layers. If not, change from the default slip and isothermal conditions to noslip and adiabatic options on walls.
My question: I understood that for resolving the boundary layers the NOSLIP option is required. Is the statement above not suggesting the opposite?
Best regards,
Patrick
Hi Patrick
You are right, that is a typo. It should of course say “If not, change from the default noslip and isothermal conditions to slip and adiabatic options on walls.”
I will make sure this is updated.
Thanks!
Best regards,
Mads
Hi Mads,
could you share your source for Eq. (1), the linearized form of the hydrodynamic equations?
Cheers
Phil
Dear Phil
We have a detailed derivation of the equation in the theory section of the documentation for the acoustics module (and some references). It follows from a first order perturbation approach of the full NS equations. I believe that the form of the LNS equation we have implemented is very general with few assumptions – except for the linearity, of course.
Best regards
Mads