振动与冲击
振動與遲擊
진동여충격
JOURNAL OF VIBRATION AND SHOCK
2015年
3期
150-155
,共6页
非线性振动%复合材料薄壁轴%旋转轴
非線性振動%複閤材料薄壁軸%鏇轉軸
비선성진동%복합재료박벽축%선전축
nonlinear vibration%composite thin-walled shaft%rotating shaft
研究几何非线性复合材料薄壁轴在偏心激励作用下的非线性振动特性。在轴的应变位移关系中引入Von Kármán几何非线性,基于Hamilton原理和变分渐进法(VAM)导出复合材料传动轴的拉-弯-扭耦合非线性振动偏微分方程组。为了着重研究轴的横向弯曲非线性振动特性,在上述模型中忽略轴向变形和扭转变形,得到轴的横向弯曲非线性振动偏微分方程,其中考虑了黏滞外阻和内阻的影响。采用Galerkin法,将偏微分方程转离散化为常微分方程,在此基础上利用四阶Runge-Kutta法对常微分方程组进行数值模拟,获得位移时间响应图、相平面图和功率谱图,研究了外阻、内组、偏心距和转速对非线性振动响应的影响,发现旋转复合材料薄壁轴存在混沌运动。
研究幾何非線性複閤材料薄壁軸在偏心激勵作用下的非線性振動特性。在軸的應變位移關繫中引入Von Kármán幾何非線性,基于Hamilton原理和變分漸進法(VAM)導齣複閤材料傳動軸的拉-彎-扭耦閤非線性振動偏微分方程組。為瞭著重研究軸的橫嚮彎麯非線性振動特性,在上述模型中忽略軸嚮變形和扭轉變形,得到軸的橫嚮彎麯非線性振動偏微分方程,其中攷慮瞭黏滯外阻和內阻的影響。採用Galerkin法,將偏微分方程轉離散化為常微分方程,在此基礎上利用四階Runge-Kutta法對常微分方程組進行數值模擬,穫得位移時間響應圖、相平麵圖和功率譜圖,研究瞭外阻、內組、偏心距和轉速對非線性振動響應的影響,髮現鏇轉複閤材料薄壁軸存在混沌運動。
연구궤하비선성복합재료박벽축재편심격려작용하적비선성진동특성。재축적응변위이관계중인입Von Kármán궤하비선성,기우Hamilton원리화변분점진법(VAM)도출복합재료전동축적랍-만-뉴우합비선성진동편미분방정조。위료착중연구축적횡향만곡비선성진동특성,재상술모형중홀략축향변형화뉴전변형,득도축적횡향만곡비선성진동편미분방정,기중고필료점체외조화내조적영향。채용Galerkin법,장편미분방정전리산화위상미분방정,재차기출상이용사계Runge-Kutta법대상미분방정조진행수치모의,획득위이시간향응도、상평면도화공솔보도,연구료외조、내조、편심거화전속대비선성진동향응적영향,발현선전복합재료박벽축존재혼돈운동。
The dynamic behavior of rotating composite thin-walled shafts with geometrical non-linearity was studied here.The nonlinear tensional-bending-torsional vibration equations for a rotating composite thin-walled shaft were derived using Hamilton's energy principle and variational-asymptotical method (VAM).On the basis of von Karman's assumption, the geometrical nonlinearity was included in the relationship of strain and displacement of the shaft. In order to emphatically study the shaft's nonlinear bending vibration,the tensional and torsional deformations were ignored.Thus, the nonlinear bending vibration equations for the rotating composite thin-walled shaft were obtained considering the external and internal viscous dampings.Galerkin's method was used to discretize the governing equations and the ordinary differential equations of the rotating shaft hending vibration were obtained.By using the fourth-order Runge-Kutta method, the differential equations were integrated numerically in time domain,the displacement-time responses,phase plane curves and power spectra of the shaft were obtained.The effects of external damping,internal damping,mass eccentricity and rotating speed on the nonlinear bending vibration responses of the shaft were studied.The numerical simulation results showed that the shaft may exhibit a chaotic motion.