On two transverse nonlinear models of axially moving beams 被引量：8

On two transverse nonlinear models of axially moving beams

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摘要 Nonlinear models of transverse vibration of axially moving beams are computationally investigated. A partial-differential equation is derived from the governing equation of coupled planar motion by omit- ting its longitudinal terms. The model can be reduced to an integro-partial-differential equation by av- eraging the beam disturbed tension. Numerical schemes are respectively presented for the governing equations of coupled planar and the two governing equations of transverse motion via the finite dif- ference method and differential quadrature method under the fixed boundary and the simple support boundary. A steel beam and a copper beam are treated as examples to demonstrate the deviations of the solutions to the two transverse equations from the solution to the coupled equation. The numerical results indicate that the differences increase with the amplitude of vibration and the axial speed. Both models yield almost the same precision results for small amplitude vibration and the inte- gro-partial-differential equation gives better results for large amplitude vibration. Nonlinear models of transverse vibration of axially moving beams are computationally investigated. A partial-differential equation is derived from the governing equation of coupled planar motion by omitting its longitudinal terms. The model can be reduced to an integro-partial-differential equation by averaging the beam disturbed tension. Numerical schemes are respectively presented for the governing equations of coupled planar and the two governing equations of transverse motion via the finite difference method and differential quadrature method under the fixed boundary and the simple support boundary. A steel beam and a copper beam are treated as examples to demonstrate the deviations of the solutions to the two transverse equations from the solution to the coupled equation. The numerical results indicate that the differences increase with the amplitude of vibration and the axial speed. Both models yield almost the same precision results for small amplitude vibration and the integro-partial-differential equation gives better results for large amplitude vibration.

作者 DING Hu1 & CHEN LiQun1,2 1 Shanghai Institute of Applied Mathematics and Mechanics, Shanghai University, Shanghai 200072, China 2 Department of Mechanics, Shanghai University, Shanghai 200444, China

出处《Science China(Technological Sciences)》 SCIE EI CAS 2009年第3期743-751,共9页 中国科学（技术科学英文版）

基金 Supported by the National Outstanding Young Scientists Fund of China (Grant No. 10725209) the National Natural Science Foundation of China (Grant No. 10672092) Shanghai Municipal Education Commission Scientific Research Project (Grant No. 07ZZ07) Shanghai Leading Academic Discipline Project (Grant No. Y0103)

关键词 AXIALLY moving beam NONLINEARITY TRANSVERSE vibration finite difference METHOD differential QUADRATURE METHOD axially moving beam nonlinearity transverse vibration finite difference method differential quadrature method

分类号 TB123 [理学—工程力学]

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