Symmetric Properties of Eigenvalues and Eigenfunctions of Uniform Beams

Nurakhmetov, Daulet; Jumabayev, Serik; Aniyarov, Almir; Kussainov, R.K.

doi:10.3390/sym12122097

Symmetry

2020

DOI: 10.3390/sym12122097

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Symmetric Properties of Eigenvalues and Eigenfunctions of Uniform Beams

Daulet Nurakhmetov

Serik Jumabayev

Almir Aniyarov

et al.

Abstract: In this paper, the models of Euler–Bernoulli beams on the Winkler foundations are considered. The novelty of the research is in consideration of the models with an arbitrary variable coefficient of foundation. Qualitative results that influence the symmetry of the coefficient of foundation on the spectral properties of the corresponding problems are obtained, for which specific variable coefficients of foundation are tested using numerical calculations. Three types of fixing at the ends are studied: clamped-cl… Show more

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Cited by 4 publications

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“…[20, P. 269]. Spectral properties with respect to symmetric equivalence of the operator K were investigated in[21]. The system of eigenfunctions { } K forms an orthonormal basis of ( )…”

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confidence: 99%

Control of Vibrations of a Beam with Nonlocal Boundary Conditions

Nurakhmetov

Jumabayev

Aniyarov

2021

ijmph

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In this article is considered the models of uniform Euler-Bernoulli beams with an arbitrary variable coefficient of foundation on a finite segment. The variable of foundation corresponds to the Winkler model. The control problem the first eigenvalues of the beam vibration is investigated. Two types of fastenings at the ends are considered: clamped-clamped and hinged-hinged. The control is based on the Kanguzhin algorithm through integral perturbations of one of the boundary conditions of the original problem. Conditions for the boundary parameters for controlling the first eigenvalues are found. First, a result is formulated regarding the control of the first eigenvalue of the oscillation of the Euler-Bernoulli beam with hinge fastening at both ends. The result is then extended to control with several eigenvalues for this beam, which are important from the point of view of the application. Such questions are especially relevant when studying the resonant natural frequencies of a mechanical system. A similar result was obtained for a Euler-Bernoulli beam with clamped fastening at both ends. Such results of eigenvalue control of a mechanical system contribute to the creation of various non-destructive testing devices that are widely used in technical acoustics.

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“…[20, P. 269]. Spectral properties with respect to symmetric equivalence of the operator K were investigated in[21]. The system of eigenfunctions { } K forms an orthonormal basis of ( )…”

mentioning

confidence: 99%

Control of Vibrations of a Beam with Nonlocal Boundary Conditions

Nurakhmetov

Jumabayev

Aniyarov

2021

ijmph

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Spectral Asymptotics of Two-Term Even Order Operators with Involution

Polyakov

2022

J Math Sci

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Identification of the Domain of the Sturm–Liouville Operator on a Star Graph

2021

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This article is devoted to the unique recovering of the domain of the Sturm–Liouville operator on a star graph. The domain of the Sturm–Liouville operator is uniquely identified from the set of spectra of a finite number of specially selected canonical problems. In the general case, the domain of the definition of the original operator can be specified by integro-differential linear forms. In the case when the domain of the Sturm–Liouville operator on a star graph corresponds to the boundary value problem, it is sufficient to choose only finite parts of the spectra of canonical problems for a unique identification of the boundary form. Moreover, the above statement is valid only for a symmetric star graph.

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Symmetric Properties of Eigenvalues and Eigenfunctions of Uniform Beams

Cited by 4 publications

References 27 publications

Control of Vibrations of a Beam with Nonlocal Boundary Conditions

Control of Vibrations of a Beam with Nonlocal Boundary Conditions

Spectral Asymptotics of Two-Term Even Order Operators with Involution

Identification of the Domain of the Sturm–Liouville Operator on a Star Graph

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