S. A. Nazarov, “Scheme for interpretation of approximately computed eigenvalues embedded in a continuous spectrum”, Zh. Vychisl. Mat. Mat. Fiz., 53:6 (2013), 878–897; Comput. Math. Math. Phys., 53:6 (2013), 702

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Zhurnal Vychislitel'noi Matematiki i Matematicheskoi Fiziki, 2013, Volume 53, Number 6, Pages 878–897
DOI: https://doi.org/10.7868/S0044466913060136 (Mi zvmmf9838)

This article is cited in 4 scientific papers (total in 4 papers)

Scheme for interpretation of approximately computed eigenvalues embedded in a continuous spectrum

S. A. Nazarov

St. Petersburg State University, Department of Mathematics and Mechanics

Full-text PDF (344 kB) Citations (4)

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DOI: https://doi.org/10.7868/S0044466913060136

Abstract: It is assumed that a trapped mode (i.e., a function decaying at infinity that leaves small discrepancies of order

$\varepsilon\ll1$ in the Helmholtz equation and the Neumann boundary condition) at some frequency

$\kappa^0$ is found approximately in an acoustic waveguide

$\Omega^0$ . Under certain constraints, it is shows that there exists a regularly perturbed waveguide

$\Omega^\varepsilon$ with the eigenfrequency

$\kappa^\varepsilon=\kappa^0+O(\varepsilon)$ . The corresponding eigenvalue

$\lambda^\varepsilon$ of the operator belongs to the continuous spectrum and, being naturally unstable, requires “fine tuning” of the parameters of the small perturbation of the waveguide wall. The analysis is based on the concepts of the augmented scattering matrix and the enforced stability of eigenvalues in the continuous spectrum.

Key words: acoustic waveguide, approximate computation of an eigenvalue in the continuous spectrum, enforced stability, augmented scattering matrix.

Received: 23.01.2013

English version:
Computational Mathematics and Mathematical Physics, 2013, Volume 53, Issue 6, Pages 702–720
DOI: https://doi.org/10.1134/S0965542513060122

Bibliographic databases:

Document Type: Article

UDC: 519.624

Language: Russian

Citation: S. A. Nazarov, “Scheme for interpretation of approximately computed eigenvalues embedded in a continuous spectrum”, Zh. Vychisl. Mat. Mat. Fiz., 53:6 (2013), 878–897; Comput. Math. Math. Phys., 53:6 (2013), 702–720

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This publication is cited in the following 4 articles:

Golub M.V., Doroshenko O.V., “Analysis of Eigenfrequencies of a Circular Interface Delamination in Elastic Media Based on the Boundary Integral Equation Method”, Mathematics, 10:1 (2022), 38
S. A. Nazarov, “Finite-dimensional approximations to the Poincaré–Steklov operator for general elliptic boundary value problems in domains with cylindrical and periodic exits to infinity”, Trans. Moscow Math. Soc., 80 (2019), 1–51
Bikmetov A.R., Gadyl'shin R.R., “On Local Perturbations of Waveguides”, Russ. J. Math. Phys., 23:1 (2016), 1–18
Nazarov S.A., Ruotsalainen K.M., “A Rigorous Interpretation of Approximate Computations of Embedded Eigenfrequencies of Water Waves”, Z. Anal. ihre. Anwend., 35:2 (2016), 211–242

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

Журнал вычислительной математики и математической физики

Computational Mathematics and Mathematical Physics

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