Variational Approach of Timoshenko Beams with Internal Elastic Restraints
Variational Approach of Timoshenko Beams with Internal Elastic Restraints
参考文献20
-
1W.M. Ostachowicz, M. Krawczuk, Analysis of the effect of cracks on the natural frequencies of a cantilever beam, Journal of Sound and Vibration 150 (2) (1991) 191-201.
-
2S.H. Farghaly, Comments and further results on analysis of the effect of cracks on the natural frequencies of a cantilever beam, Journal of Sound and Vibration 169 (5) (1994) 704-708.
-
3A.D. Dimarogonas, Vibration of cracked structures: A state of the art review, Engineering Fracture Mechanics 55 (5) (1996) 831-857.
-
4T.G. Chondros, A.D. Dimarogonas, J. Yao, A consistent cracked bar vibration theory, Journal of Sound and Vibration 200 (3) (1997) 303-313.
-
5E.I. Shifrin, R. Ruotolo, Natural frequencies of a beam with an arbitrary number of cracks, Journal of Sound and Vibration 222 (3) (1999) 409-423.
-
6T.G. Chondros, A.D. Dimarogonas, J. Yao, Vibration of a beam with a breathing crack, Journal of Sound and Vibration 239 (1) (2001) 57-67.
-
7Q.S. Li, Vibratory characteristics of multi-step beams with an arbitrary number of cracks and concentrated masses, Applied Acoustics 62 (2001) 691-706.
-
8Q.S. Li, Free vibration analysis of non-uniform beams with an arbitrary number of cracks and concentrated masses, Journal of Sound and Vibration 252 (3) (2002) 509-525.
-
9J. Fernfindez-S~iez, C. Navarro, Fundamental frequency of cracked beams in bending vibrations: An analytical approach, Journal of Sound and Vibration 256 (1) (2002) 17-31.
-
10S.P. Lele, S.K. Maiti, Modelling of transverse vibration of short beams for crack detection and measurement of crack extension, Journal of Sound and Vibration 257 (3) (2002) 559-583.
-
1周叮.AN APPROXIMATE SOLUTION OF EIGEN-FREQUENCIES OF TRANSVERSE VIBRATION OF RECTANGULAR PLATES WITH ELASTICAL RESTRAINTS[J].Applied Mathematics and Mechanics(English Edition),1996,17(5):451-456.
-
2尹辑文,李伟萍,于毅夫.Properties of a polaron in a quantum dot:a squeezed-state variational approach[J].Journal of Semiconductors,2013,34(1):1-5. 被引量:1
-
3Rami Ahmad El-Nabulsi.Fractional Variational Approach for Dissipative Mechanical Systems[J].Analysis in Theory and Applications,2014,30(3):249-259.
-
4莫怡华,欧丽,钟宏志.Vibration Analysis of Timoshenko Beams on a Nonlinear Elastic Foundation[J].Tsinghua Science and Technology,2009,14(3):322-326. 被引量:1
-
5李世荣,张靖华,赵永刚.THERMAL POST-BUCKLING OF FUNCTIONALLY GRADED MATERIAL TIMOSHENKO BEAMS[J].Applied Mathematics and Mechanics(English Edition),2006,27(6):803-810. 被引量:1
-
6谢臻赟,刘奕.Variational Approach for the Adapted Solution of Backw ard Stochastic Differential Equations with Locally Lipschitz Diffusion Coefficients[J].Journal of Donghua University(English Edition),2012,29(4):341-350. 被引量:1
-
7吴庆贺,杨天智,吕伟.Supercritical Thermal Configurations of Axially Moving Timoshenko Beams[J].Journal of Donghua University(English Edition),2015,32(5):807-810.
-
8María D.ACOSTA,Jernimo ALAMINOS,Domingo GARCA,Manuel MAESTRE.A Variational Approach to Norm Attainment of Some Operators and Polynomials[J].Acta Mathematica Sinica,English Series,2010,26(12):2259-2268.
-
9肖灿章,计伊周,常保平.GENERAL DYNAMIC EQUATION AND DYNAMICAL CHARACTERISTICS OF VISCOELASTIC TIMOSHENKO BEAMS[J].Applied Mathematics and Mechanics(English Edition),1990,11(2):177-184.
-
10P.Vimala,N.B.Balamurugan.Quantum mechanical compact modeling of symmetric double-gate MOSFETs using variational approach[J].Journal of Semiconductors,2012,33(3):15-19. 被引量:1