A Hierarchy of Timoshenko Beam Theories
Abstract eng: This paper shows that conventional Timoshenko theory for bending waves is a member of a two-parameter family (m; n) of approximations to the exact equations of linear elasticity. Higher members of the family are shown to represent the exact dispersion relation with extraordinary accuracy; in particular, an arbitrary number of branches can be captured accurately over their entire length, i.e. up to arbitrarily high frequencies and wavenumbers. The theory admits a rational accuracy analysis, and resolves certain controversies about the validity of higher-branch approximations. The paper demonstrates conclusively that Timoshenko theory is a completely rational theory, thus ending decades of doubt on the matter. The standard Euler-Bernoulli theory is a lower member of the two-parameter family. Especially useful is Timoshenko (1; 2) theory, which extends conventional Timoshenko (0; 1) theory by capturing the first four branches of the exact dispersion relation rather than merely the first two.
Contributors:
Publisher:
National Technical University of Athens, 2011
Conference Title:
Conference Title:
COMPDYN 2011 - 3rd International Thematic Conference
Conference Venue:
Island of Corfu (GR)
Conference Dates:
2011-05-25 / 2011-05-28
Rights:
Text je chráněný podle autorského zákona č. 121/2000 Sb.
Record appears in:
Record created 2016-11-14, last modified 2016-11-14
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