Controllability method for acoustic scattering with spectral elements
Heikkola, E., Mönkölä, S., Pennanen, A., & Rossi, T. (2007). Controllability method for acoustic scattering with spectral elements. Journal of Computational and Applied Mathematics, 204(2), 344-355. https://doi.org/10.1016/j.cam.2006.02.046
Published in
Journal of Computational and Applied MathematicsDate
2007Copyright
© Elsevier. This is an author's final draft version of an article whose final and definitive form has been published by Elsevier.
We formulate the Helmholtz equation as an exact controllability problem for the time-dependent wave equation. The problem is then discretized in time domain with central finite difference scheme and in space domain with spectral elements. This approach leads to high accuracy in spatial discretization. Moreover, the spectral element method results in diagonal mass matrices, which makes the time integration of the wave equation highly efficient. After discretization, the exact controllability problem is reformulated as a least-squares problem, which is solved by the conjugate gradient method. We illustrate the method with some numerical experiments, which demonstrate the significant improvements in efficiency due to the higher order spectral elements. For a given accuracy, the controllability technique with spectral element method requires fewer computational operations than with conventional finite element method. In addition, by using higher order polynomial basis the influence of the pollution effect is reduced.
...
Publisher
ElsevierISSN Search the Publication Forum
0377-0427Keywords
Publication in research information system
https://converis.jyu.fi/converis/portal/detail/Publication/16234707
Metadata
Show full item recordCollections
Related items
Showing items with similar title or keywords.
-
Spectral element method and controllability approach for time-harmonic wave propagation
Mönkölä, Sanna (University of Jyväskylä, 2008) -
Controllability method for the Helmholtz equation with higher-order discretizations
Heikkola, Erkki; Mönkölä, Sanna; Pennanen, Anssi; Rossi, Tuomo (Elsevier, 2007)We consider a controllability technique for the numerical solution of the Helmholtz equation. The original time-harmonic equation is represented as an exact controllability problem for the time-dependent wave equation. ... -
Time-harmonic electromagnetics with exact controllability and discrete exterior calculus
Mönkölä, Sanna; Räbinä, Jukka; Rossi, Tuomo (Academie des Sciences, 2023)In this paper, we apply the exact controllability concept for time-harmonic electromagnetic scattering. The problem is presented in terms of the differential forms, and the discrete exterior calculus is utilized for spatial ... -
On the finite element method for time-harmonic acoustic boundary value problems
Neittaanmäki, Pekka; Picard, Rainer (Pergamon Press, 1981)The time harmonic acoustic boundary value problem in a smooth, bounded domain G of R2 is considered as a first order system. The optimal asymptotic L2(G) and H1(G)-error estimates 0(h2) and 0(h) resp. are derived for a ... -
Time-harmonic solution for acousto-elastic interaction with controllability and spectral elements
Mönkölä, Sanna (Elsevier, 2010)The classical way of solving the time-harmonic linear acousto-elastic wave problem is to discretize the equations with finite elements or finite differences. This approach leads to large-scale indefinite complex-valued ...