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非线性转子系统周期响应的分析
引用本文:王立国,胡超,黄文虎.非线性转子系统周期响应的分析[J].力学与实践,2001,23(6):16-18.
作者姓名:王立国  胡超  黄文虎
作者单位:哈尔滨工业大学航天工程与力学系,
基金项目:国家重点基础研究规划项目(G1998020317),国家自然科学基金重大项目(19900510)资助.
摘    要:基于时域的时间有限元法,将描述转子系统动力学特征的非线性微分方程组离散成一组非线性代数方程,然后应用吴消去法的特征列思维对所得到的非线性代数方程组进行降维求解,进而得到待求节点位移响应的解形式,并据此对一具有非线性支撑的柔性Jeffcott转子模型响应的性质进行了分析。

关 键 词:转子-轴承系统  时间有限元法  吴消去法  周期响应  非线性微分方程组  降维  节点位移响应  离散  非线性代数方程组
修稿时间:2001年1月16日

ANALYSIS OF PERIODIC RESPONSE OF ROTOR DYNAMIC SYSTEM WITH NONLINEAR SUPPORTS
WANG Liguo HU Chao HUANG Wenhu.ANALYSIS OF PERIODIC RESPONSE OF ROTOR DYNAMIC SYSTEM WITH NONLINEAR SUPPORTS[J].Mechanics and Engineering,2001,23(6):16-18.
Authors:WANG Liguo HU Chao HUANG Wenhu
Abstract:Based on a finite element formulation in the time domain, this method transforms the non- linear differential equations governing the dynamic behavior of rotor-bearing system into a set of non- linear algebraic equations that can be reduced and calculated by the characteristic set of Wu elimina- tion method. The analytic solution for the nodal displacements is obtained and the behavior of peri- odic response of flexible Jeffcott rotor-bearing sys- tem with nonlinear supports is analysed.
Keywords:rotor-bearing system  finite element in the time domain  Wu elimination method  periodic response  stability
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