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Timoshenko beam theory
The Timoshenko beam theory was developed by Stephen Timoshenko early in the 20th century. The model takes into account shear deformation and…
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Related topics
Related topics
6 relations
Euler–Bernoulli beam theory
Macaulay's method
Second moment of area
Unified Framework
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Broader (1)
Structural analysis
Papers overview
Semantic Scholar uses AI to extract papers important to this topic.
Highly Cited
2013
Highly Cited
2013
Analytical solutions for bending and buckling of functionally graded nanobeams based on the nonlocal Timoshenko beam theory
M. Şi̇mşek
,
H. Yurtcu
2013
Corpus ID: 16786718
Highly Cited
2013
Highly Cited
2013
Vibration of nonlocal Kelvin-Voigt viscoelastic damped Timoshenko beams
Y. Lei
,
S. Adhikari
,
M. Friswell
2013
Corpus ID: 55698130
Highly Cited
2012
Highly Cited
2012
A nonlocal sinusoidal shear deformation beam theory with application to bending, buckling, and vibration of nanobeams
H. Thai
,
T. Vo
2012
Corpus ID: 53411618
Highly Cited
2010
Highly Cited
2010
Dynamic stability in parametric resonance of axially accelerating viscoelastic Timoshenko beams
Timoshenko beams
,
Liqun Chen
,
You-Qi Tang
,
C. Lim
2010
Corpus ID: 120104776
Highly Cited
2008
Highly Cited
2008
On the Internal and Boundary Stabilization of Timoshenko Beams
S. Messaoudi
,
M. I. Mustafa
2008
Corpus ID: 89608669
Abstract.In this paper we consider Timoshenko systems with either internal or boundary feedbacks. We establish explicit and…
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Highly Cited
2006
Highly Cited
2006
Free vibration analysis of a rotating Timoshenko beam by differential transform method
M. O. Kaya
2006
Corpus ID: 44032930
Purpose – To perform the flapwise bending vibration analysis of a rotating cantilever Timoshenko beam.Design/methodology/approach…
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2006
2006
On the valid frequency range of Timoshenko beam theory
N. G. Stephena
,
S. Pucheggerb
2006
Corpus ID: 53546405
The frequency equation of Timoshenko beam theory factorises for hinged–hinged end conditions, leading to a first and second…
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Highly Cited
2004
Highly Cited
2004
DYNAMICS OF TIMOSHENKO BEAMS ON PASTERNAK FOUNDATION UNDER MOVING LOAD
M. Kargarnovin
,
D. Younesian
2004
Corpus ID: 67770068
Highly Cited
2003
Highly Cited
2003
Stabilization of Timoshenko Beam by Means of Pointwise Controls
G. Xu
,
S. Yung
2003
Corpus ID: 54041336
We intend to conduct a fairly complete study on Timoshenko beams with pointwise feedback controls and seek to obtain information…
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Review
1997
Review
1997
Distributed Control of Laminated Beams: Timoshenko Theory vs. Euler-Bernoulli Theory
O. Aldraihem
,
R. C. Wetherhold
,
T. Singh
1997
Corpus ID: 67361447
In this paper, the governing equations and boundary conditions of laminated beamlike components of smart structures are reviewed…
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