磁流变阻尼器的分数阶模型及其减振系统分析
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摘要
研制了一种复合式磁流变阻尼器,它主要由橡胶弹簧、磁流变阻尼两部分组成,其性能兼具橡胶弹簧减振和磁流变阻尼减振的优点。引入了分数阶微积分理论,建立了复合阻尼器的分数阶Zener理论模型,并探讨了在该模型下的粘弹性。为验证该模型的有效性,将分数阶微积分应用到磁流变振动台系统建模上,建立了分数阶系统模型,并给出了分数阶系统传递函数描述,求出了位移函数。实验表明,减振系统的分数阶模型与实验数据能够较好的吻合,从而证明了分数阶模型在磁流变阻尼器的减振模型研究上的有效性。
The combined magnetorheological damper developed in the paper is composed of rubber spring,magnetorheological damper,which inherits the damping merits of the rubber spring and the magnetorheological damper.Here the factional-order constitutive equation was introduced to study the characteristics of the combined damper according to its viscoelasticity.A fractional Zener model for the damper is built,and its viscoelasticity is analyzed.In order to verify the effectiveness of the fractional Zener model,the fractional-order system model of magnetorheological vibrant platform was set up and the transfer function representation of fractional-order system was given,and the function of displacement was also obtained.Through the experiments it was found that the sampling data can fit the fractional-order system model well.It is indicated the fractional-order constitutive equation and the transfer function are feasible and effective for investigation of magnetorheological vibrant device.
The combined magnetorheological damper developed in the paper is composed of rubber spring,magnetorheological damper,which inherits the damping merits of the rubber spring and the magnetorheological damper.Here the factional-order constitutive equation was introduced to study the characteristics of the combined damper according to its viscoelasticity.A fractional Zener model for the damper is built,and its viscoelasticity is analyzed.In order to verify the effectiveness of the fractional Zener model,the fractional-order system model of magnetorheological vibrant platform was set up and the transfer function representation of fractional-order system was given,and the function of displacement was also obtained.Through the experiments it was found that the sampling data can fit the fractional-order system model well.It is indicated the fractional-order constitutive equation and the transfer function are feasible and effective for investigation of magnetorheological vibrant device.
引文
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[7]李卓,徐秉业.粘弹性分数阶导数模型的等效粘性阻尼系统[J].清华大学学报:自然科学版,2000,40(11):27-9.
[8]王振滨,曹广益,朱新坚.分数微积分在系统建模中的应用[J].上海交通大学学报,2004,38(5):802-805.
[9]王振滨曹.分数微积分的两种系统建模方法[J].系统仿真学报,2004,6(4):810-2.
[2]周强瞿.磁流变阻尼器的两种力学模型和试验验证[J].地震工程与工程振动,2002,22(4):25-27.
[3]GAMOTO D R F F E.Dynamic mechanical studies of electrorheologicalmaterials:moderate frequencie[s J].Rheology,1991,35(3):399-425.
[4]C F.Relaxation and Retardation Function of the Maxwell Moded withFractional Derivatives[J].Reological Acta,1991,39(1):151-159.
[5]SONG D Y,J T Q.Study on the constitutive equation with fractionalderivative for viscoelastic fluids-modified Jeffreys model and its applic-ation[J].Rhelo Acta,1998(37):512-517.
[6]M.ALCOUTLABI J J M-V.Application of fractional calculus to viscoelas-tic behavior modelling and to the physical ageing phenomenon in glassyamorphous polymer[s J].Polymer,1998,39(25):6269-77.
[7]李卓,徐秉业.粘弹性分数阶导数模型的等效粘性阻尼系统[J].清华大学学报:自然科学版,2000,40(11):27-9.
[8]王振滨,曹广益,朱新坚.分数微积分在系统建模中的应用[J].上海交通大学学报,2004,38(5):802-805.
[9]王振滨曹.分数微积分的两种系统建模方法[J].系统仿真学报,2004,6(4):810-2.
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