Stability of nonlinear vibrations of plate protected from vibrations

Abstract This work is devoted to solving the problem of the stability of nonlinear vibrations of the plate, which is protected from vibrations under the influence of kinematic excitations. A dynamic absorber is taken as an object to protect against vibrations. The dissipative properties of the plate...

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Bibliographic Details
Published inJournal of physics. Conference series Vol. 1921; no. 1; pp. 12097 - 12102
Main Authors Mirsaidov, M M, Dusmatov, O M, Khodjabekov, M U
Format Journal Article
LanguageEnglish
Published Bristol IOP Publishing 01.05.2021
Subjects
Absorbers
Approximation
Canonical forms
Damping
differential and characteristic equation
Differential equations
dynamic absorber
Eigenvalues
Eigenvectors
hysteresis
nonlinear vibration
Physics
Plate
Plate material
resonance
Stability analysis
stability condition
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Summary:Abstract This work is devoted to solving the problem of the stability of nonlinear vibrations of the plate, which is protected from vibrations under the influence of kinematic excitations. A dynamic absorber is taken as an object to protect against vibrations. The dissipative properties of the plate material and the damping element of dynamic absorber are expressed by the Pisarenko-Boginich model of the hysteresis type. An analytical expression of the stability conditions was obtained using Lyapunov’s first approximation method. A system of differential equations of normal form is obtained for nonlinear vibration of a plate with dynamic absorber, a characteristic equation is constructed, and it is shown on the basis of the Hurwitz criterion that the negativity of the real part of its roots ensures the stability of nonlinear vibrations of the protected plate.
ISSN:1742-6588
1742-6596
DOI:10.1088/1742-6596/1921/1/012097