2021
DOI: 10.3390/math9080819
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Influence of Impulse Disturbances on Oscillations of Nonlinearly Elastic Bodies

Abstract: A method for studying the effect of impulse perturbation on the longitudinal oscillations of a homogeneous constant cross-section of the body and the elastic properties of a material which satisfies the essentially nonlinear law of elasticity has been developed. A mathematical model of the process is presented, which is an equation of hyperbolic type with a small parameter at the discrete right-hand side. The latter expresses the effect of impulse perturbation on the oscillatory process. As for the boundary co… Show more

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Cited by 9 publications
(6 citation statements)
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“…Several specific features of dynamic processes in strongly non-linear systems were established that are not characteristic of linear of quasi-linear systems. One of them is the fact that the frequency of self-oscillations depends on the amplitude, and thus specificities of resonance processes [10,11]. Another important class of non-linear one-dimensional systems with distributed parameters is made up by those systems, the unexcited (linear) analogues of which do not allow using the classical Fourier and D'Alembert methods for integration.…”
Section: Literature Overviewmentioning
confidence: 99%
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“…Several specific features of dynamic processes in strongly non-linear systems were established that are not characteristic of linear of quasi-linear systems. One of them is the fact that the frequency of self-oscillations depends on the amplitude, and thus specificities of resonance processes [10,11]. Another important class of non-linear one-dimensional systems with distributed parameters is made up by those systems, the unexcited (linear) analogues of which do not allow using the classical Fourier and D'Alembert methods for integration.…”
Section: Literature Overviewmentioning
confidence: 99%
“…. )-functions that the addends of the right part of the relation (3) expressing the aforesaid component of the impulse action can be represented in the following form without damage to accuracy [11]:…”
Section: Asymptotic Approximation Of Boundary Problem Solutionmentioning
confidence: 99%
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“…The work deals with a more complex and important problemthe problem of the dynamics of such systems under the action of a periodic impulse perturbations, which is modeled using the Dirac delta function. For the analytical study of the considered class of systems, the main idea of the works [1]- [5] is generalized to a new class of boundary value problems. This made it possible, using the properties of completeness and orthogonality of certain functions and mathematical transformations that do not change the accuracy of the mathematical model, to transform impulse actions on longitudinally moving systems to a form that allows spreading the basic ideas of asymptotic integration.…”
Section: Introductionmentioning
confidence: 99%