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多尺度法的推广及在非线性黏弹性系统的应用

EXTENSION OF MULTI-SCALE METHOD AND ITS APPLICATION TO NONLINEAR VISCOELASTIC SYSTEM

  • 摘要: 黏弹性材料在航空、机械、土木等领域具有广阔的应用前景, 而具有1.5自由度的非线性Zener模型能更好地描述其特性. 因此, 研究多尺度法的推广和应用具有重要意义. 在传统多尺度法的基础上, 推广并利用多尺度法对非线性奇数阶微分方程进行研究, 解决非线性奇数阶系统的动力学求解问题. 以非线性Zener模型为例, 首先通过推广的多尺度法对该模型进行近似解析求解, 并通过数值方法对解析解进行数值验证, 结果吻合良好, 证明该推广方法求解过程的正确性. 然后, 从解析解中推导出稳态响应的幅频方程和相频方程, 从幅频曲线中发现对于弱阻尼系统, 在一定的频率范围内存在多值解的现象. 基于Lyapunov第一方法得到稳态周期解的稳定性条件, 利用该条件分析系统的稳定性. 最后分析非线性项、外激励以及Maxwell元件的刚度系数和阻尼系数对系统动力学行为与稳定性的影响. 研究发现: 不管非线性刚度硬化还是刚度软化, 都可使共振幅值逐渐降低, 多解区域扩大; 外激励幅值对幅频特性的骨架线影响很小, 对幅频曲线的形态影响较大; Maxwell元件刚度系数的增大使共振幅值小量增加; Maxwell元件阻尼系数的增大会使共振幅值降低, 多解区域减小, 最终多解现象消失. 这些结果对以后非线性黏弹性系统动力学特性的研究具有重要意义.

     

    Abstract: Viscoelastic materials have broad application prospects in aviation, machinery, civil engineering and other fields, and the nonlinear Zener model with 1.5 degrees of freedom can better describe their characteristics. Therefore, it is of great significance to study the extension and application of multi-scale method. Based on the traditional multi-scale method, the multi-scale method is extended to approximate the analytical solution of the nonlinear odd-order differential equation, and the dynamic problems of the nonlinear odd-order system are solved. Taking the nonlinear Zener model as an example, its dynamic behavior and stability condition under harmonic excitation are analyzed. Firstly, the approximate analytical solution of the nonlinear Zener model is obtained through the extended multi-scale method, and the analytical solution is verified by the numerical method. The results are in good agreement, which proves the correctness of the extended method. Then, the amplitude-frequency equation and phase-frequency equation of steady-state response are derived from the analytical solution, and it is found that there are multi-valued characteristics in a certain frequency range for weakly damped systems. Moreover, the stability condition of steady-state periodic solutions is obtained based on Lyapunov first method, and the system stability is analyzed by using this condition. Finally, the effects of nonlinear term, external excitation and the stiffness and damping coefficients of Maxwell elements on the dynamic behavior and system stability are analyzed by simulation. It is found that whether the stiffness is hardened or softened, the resonance amplitude can be gradually reduced and the multi-solution region can be expanded. The amplitude of external excitation has little influence on the backbone curve of amplitude frequency characteristics, but has a great influence on the shape of amplitude frequency curve. With the increase of the stiffness coefficient of Maxwell element, the resonance amplitude increases slightly. The increase of the damping of Maxwell element can reduce the resonance amplitude and the multi-solution region, and finally the multi-solution phenomenon can disappear. These results are of great significance to the study on dynamic characteristics of nonlinear viscoelastic systems in the future.

     

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