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Main Title: Impedance boundary conditions for acoustic time harmonic wave propagation in viscous gases
Author(s): Schmidt, Kersten
Thöns-Zueva, Anastasia
Type: Research Paper
Abstract: We present Helmholtz or Helmholtz like equations for the approximation of the time-harmonic wave propagation in gases with small viscosity, which are completed with local boundary conditions on rigid walls. We derived approximative models based on the method of multiple scales for the pressure and the velocity separately, both up to order 2. Approximations to the pressure are described by the Helmholtz equations with impedance boundary conditions, which relate its normal derivative to the pressure itself. The boundary conditions from first order on 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 velocity approximations are described by Helmholtz like equations for the velocity, where the Laplace operator is replaced by $\nabla \Div$, 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 boundary conditions are stable and asymptotically exact, which is justified by a complete mathematical analysis. The results of some numerical experiments are presented to illustrate the theoretical foundation.
Subject(s): acoustics wave propagation
singularly perturbed PDE
impedance boundary conditions
asymptotic expansions
Issue Date: 4-Mar-2014
Date Available: 17-Dec-2021
Language Code: en
DDC Class: 510 Mathematik
MSC 2000: 35C20 Asymptotic expansions
35J25 Boundary value problems for second-order, elliptic equations
35B40 Asymptotic behavior of solutions
41A60 Asymptotic approximations, asymptotic expansions
76Q05 Hydro- and aero-acoustics
Series: Preprint-Reihe des Instituts für Mathematik, Technische Universität Berlin
Series Number: 2014, 06
ISSN: 2197-8085
TU Affiliation(s): Fak. 2 Mathematik und Naturwissenschaften » Inst. Mathematik
Appears in Collections:Technische Universität Berlin » Publications

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