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A theorem of instability by linear approximation for a one-dimensional non-linearly elastic body

✍ Scribed by E.I. Ryzhak

Publisher: Elsevier Science
Year: 2006
Tongue: English
Weight: 480 KB
Volume: 70
Category: Article
ISSN: 0021-8928
DOI: 10.1016/j.jappmathmech.2006.11.011

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✦ Synopsis

On the basis of and in a development of the ideas and results of A.A. Movchan (Sr.), that extend to continuous bodies the definitions and main fundamental theorems of Lyapunov on stability and instability, a criterion for instability of the equilibrium position of a one-dimensional non-linearly elastic body subject to potential external forces is established. For the specified simplest type of continuous elastic system (which possesses, however, a number of fundamental properties of continuous elastic systems including unboundedness of the operator of linear approximation and discreteness of its spectrum) a theorem of instability by linear approximation is stated and proved. The method of proof is a version of Persidskii's sector method.

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