<div class="csl-bib-body">
<div class="csl-entry">Vetyukov, Y. (2017). Stability and Supercritical Deformation of a Circular Ring with Intrinsic Curvature. In H. Irschik, A. K. Belyaev, & M. Krommer (Eds.), <i>Dynamics and Control of Advanced Structures and Machines</i> (pp. 23–32). Springer International Publishing. https://doi.org/10.1007/978-3-319-43080-5_3</div>
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dc.identifier.uri
http://hdl.handle.net/20.500.12708/29387
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dc.description.abstract
Stability of a circular ring, pre-stressed by a temperature-like intrinsic deformation, is studied using the equations of the nonlinear theory of rods. The temperature gradient in the radial direction results in a bending moment. The critical state depends on the ratio of the bending stiffness coefficients. In the supercritical range, the ring begins to turn inside out as its cross-sections rotate about the axis. The analytical solutions are successfully compared against results of finite element simulations for a shell model of the ring.
en
dc.publisher
Springer International Publishing
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dc.title
Stability and Supercritical Deformation of a Circular Ring with Intrinsic Curvature
en
dc.type
Buchbeitrag
de
dc.type
Book Contribution
en
dc.relation.publication
Dynamics and Control of Advanced Structures and Machines
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dc.relation.isbn
978-3-319-43080-5
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dc.relation.doi
10.1007/978-3-319-43080-5
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dc.description.startpage
23
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dc.description.endpage
32
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dc.type.category
Edited Volume Contribution
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tuw.booktitle
Dynamics and Control of Advanced Structures and Machines