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On the geometric conditions for multiple stable equilibria in clamped arches

Publication ,  Journal Article
Virgin, LN; Guan, Y; Plaut, RH
Published in: International Journal of Non-Linear Mechanics
June 1, 2017

Curved structures, such as beams, arches, and panels are capable of exhibiting snap-through buckling behavior when loaded laterally, that is they can exhibit multiple stable equilibria, sometimes after any external loading is removed. This is a consequence of highly nonlinear force-deflection relations with perhaps multiple crossings of the zero-force axis for typical equilibrium paths. However, the propensity to maintain a stable snapped-through equilibrium position (in addition to the nominally unloaded equilibrium configuration) after the load is removed depends on certain geometric properties. A number of clamped arches are used to illustrate the relation between geometry (essentially the shape) and corresponding equilibrium configuration(s), and especially those conditions for which the initial equilibrium configuration is the only stable shape possible. Furthermore, related results are obtained when a change in the thermal environment may cause a system to exhibit a stable snapped-through equilibrium even when the system at ambient thermal conditions does not. Some representative examples are produced using a 3D printer for verification purposes.

Duke Scholars

Published In

International Journal of Non-Linear Mechanics

DOI

ISSN

0020-7462

Publication Date

June 1, 2017

Volume

92

Start / End Page

8 / 14

Related Subject Headings

  • Mechanical Engineering & Transports
  • 4901 Applied mathematics
  • 4017 Mechanical engineering
  • 4005 Civil engineering
  • 0913 Mechanical Engineering
  • 0905 Civil Engineering
  • 0102 Applied Mathematics
 

Citation

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Virgin, L. N., Guan, Y., & Plaut, R. H. (2017). On the geometric conditions for multiple stable equilibria in clamped arches. International Journal of Non-Linear Mechanics, 92, 8–14. https://doi.org/10.1016/j.ijnonlinmec.2017.03.009
Virgin, L. N., Y. Guan, and R. H. Plaut. “On the geometric conditions for multiple stable equilibria in clamped arches.” International Journal of Non-Linear Mechanics 92 (June 1, 2017): 8–14. https://doi.org/10.1016/j.ijnonlinmec.2017.03.009.
Virgin LN, Guan Y, Plaut RH. On the geometric conditions for multiple stable equilibria in clamped arches. International Journal of Non-Linear Mechanics. 2017 Jun 1;92:8–14.
Virgin, L. N., et al. “On the geometric conditions for multiple stable equilibria in clamped arches.” International Journal of Non-Linear Mechanics, vol. 92, June 2017, pp. 8–14. Scopus, doi:10.1016/j.ijnonlinmec.2017.03.009.
Virgin LN, Guan Y, Plaut RH. On the geometric conditions for multiple stable equilibria in clamped arches. International Journal of Non-Linear Mechanics. 2017 Jun 1;92:8–14.
Journal cover image

Published In

International Journal of Non-Linear Mechanics

DOI

ISSN

0020-7462

Publication Date

June 1, 2017

Volume

92

Start / End Page

8 / 14

Related Subject Headings

  • Mechanical Engineering & Transports
  • 4901 Applied mathematics
  • 4017 Mechanical engineering
  • 4005 Civil engineering
  • 0913 Mechanical Engineering
  • 0905 Civil Engineering
  • 0102 Applied Mathematics