Variational principle and bifurcations in stability analysis of panels
Date
2014In this paper, the stability of a simply supported axially moving elastic panel
is considered. A complex variable technique and bifurcation theory are applied.
As a result, variational equations and a variational principle are derived. Anal-
ysis of the variational principle allows the study of qualitative properties of the
bifurcation points. Asymptotic behaviour in a small neighbourhood around an
arbitrary bifurcation point is analyzed and presented.
It is shown analytically that the eigenvalue curves in the (ω, V0) plane cross
both the ω and V0 axes perpendicularly. It is also shown that near each bifur-
cation point, the dependence ω(V0) for each mode approximately follows the
shape of a square root near the origin.
The obtained results complement existing numerical studies on the stability
of axially moving materials, especially those with finite bending rigidity. From
a rigorous mathematical viewpoint, the presence of bending rigidity is essen-
tial, because the presence of the fourth-order term in the model changes the
qualitative behaviour of the bifurcation points.
...
Publisher
Jyväskylän yliopistoISBN
978-951-39-6018-6ISSN Search the Publication Forum
1456-436XKeywords
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