Asymptotic analysis of vibrating system containing stiff-heavy and flexible-light parts

A model of strongly inhomogeneous medium with simultaneous perturbation of rigidity and mass density is studied. The medium has strongly contrasting physical characteristics in two parts with the ratio of rigidities being proportional to a small parameter \(\epsilon\). Additionally, the ratio of mas...

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Bibliographic Details
Published in:arXiv.org 2007-12
Main Authors: Babych, N, Yu Golovaty
Format: Article
Language:English
Subjects:
Asymptotic properties
Asymptotic series
Eigenvalues
Eigenvectors
Hilbert space
Inhomogeneous media
Parameters
Physical properties
Online Access:Get full text
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Summary:A model of strongly inhomogeneous medium with simultaneous perturbation of rigidity and mass density is studied. The medium has strongly contrasting physical characteristics in two parts with the ratio of rigidities being proportional to a small parameter \(\epsilon\). Additionally, the ratio of mass densities is of order \(\epsilon^{-1}\). We investigate the asymptotic behaviour of spectrum and eigensubspaces as \(\epsilon\to 0\). Complete asymptotic expansions of eigenvalues and eigenfunctions are constructed and justified. We show that the limit operator is nonself-adjoint in general and possesses two-dimensional Jordan cells in spite of the singular perturbed problem is associated with a self-adjoint operator in appropriated Hilbert space \(L_\epsilon\). This may happen if the metric in which the problem is self-adjoint depends on small parameter \(\epsilon\) in a singular way. In particular, it leads to a loss of completeness for the eigenfunction collection. We describe how root spaces of the limit operator approximate eigenspaces of the perturbed operator.
ISSN:2331-8422