基于Hermite插值的多体系统动力学离散变分方法
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摘要
针对多体系统动力学数值仿真问题,研究基于Hermite插值的离散变分方法.首先对广义坐标和广义速度进行Hermite插值,结合Gauss数值积分方法,利用Hamilton原理和离散力学变分原理,建立了含已知导数信息和含未知导数信息的Hermite插值离散变分数学模型,求解得到精确度较高的动力学仿真结果.该方法可以在步长较大时精确保持约束方程,并保持系统总能量在一定范围内有界变化,适用于长时间仿真情况.
The discrete variational method based on Hermite interpolation is studied for the simulation problem of multibody system dynamics. Hermite interpolation is carried out to interpolate the generalized coordinate and the generalized velocity,firstly. Then,using the Gauss numerical integral method,the Hamilton principle and discrete variational principles of mechanics,the discrete variational mathematical model based on the Hermite interpolation containing known and unknown derivative information is established. High accuracy simulation results is obtained by solving the presented discrete variational equations. This method can accurately maintain the constraint equations on the larger time step,and keep the total energy of the system in a certain range of bounded variation. Therefore,it can be applied for the long time simulation.
The discrete variational method based on Hermite interpolation is studied for the simulation problem of multibody system dynamics. Hermite interpolation is carried out to interpolate the generalized coordinate and the generalized velocity,firstly. Then,using the Gauss numerical integral method,the Hamilton principle and discrete variational principles of mechanics,the discrete variational mathematical model based on the Hermite interpolation containing known and unknown derivative information is established. High accuracy simulation results is obtained by solving the presented discrete variational equations. This method can accurately maintain the constraint equations on the larger time step,and keep the total energy of the system in a certain range of bounded variation. Therefore,it can be applied for the long time simulation.
引文
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9白龙,戈新生.基于球摆模型的离散变分积分子算法研究.动力学与控制学报,2013,11(4):295~300(Bai L,Ge X S.The Discrete variational integrators method of the spherical pendulum.Journal of Dynamics and Control,2013,11(4):295~300(in Chinese))
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11 Hall J.Convergence of Galerkin variational integrators for vector spaces and Lie groups[Ph.D Thesis].San Diego:Department of Mathematics University of California,2013
12 Muehlebach M,Heimsch T,Glocker C.Variational integrators-A continuous time approach.International Journal for Numerical Methods in Engineering,2017,109:1549~1581
13潘坤,丁洁玉,董贺威等.基于重心插值的多体系统动力学离散变分方法.青岛大学学报(自然科学版),2017,30(2):77~82(Pan K,Ding J Y,Dong H W,et al.Discrete variational method of multi-body system dynamics based on center of gravity interpolation.Journal of Qingdao University(Nature Science Edition),2017,30(2):77~82(in Chinese))
2 Mc Lachlan R I,Perlmutter M.Integrators for non-holonomic mechanical systems.Journal of Nonlinear Sciences,2006,16(4):283~328
3 Leyendecker S,Marsden J E,Ortiz M.Variational integrators for constrained dynamical systems.Journal of Applied Mathematics and Mechanics,2008,88(9):677~708
4 Bou-Rabee N,Owhadi H.Stochastic variational integrators.IMA Journal of Numerical Analysis,2009,29(2):421~443
5 Ober-Bl9baum S,Saake N.Construction and analysis of higher order Galerkin variational integrators.Advances in Computational Mathematics,2015,41(6):955~986
6丁洁玉,潘振宽.非完整约束多体系统时间离散变分积分法.动力学与控制学报,2011,9(4):289~292(Ding J Y,Pan Z K.Time-discrete variational integrator for multibody dynamic systems with nonholonomic constraints.Journal of Dynamics and Control,2011,9(4):289~292(in Chinese))
7 Ding J Y,Pan Z K.Higher order variational integrators of multibody system dynamics with constraints.Advances in Mechanical Engineering,2014:383680-1-8
8高强,钟万勰.非完整约束动力系统的离散积分方法.动力学与控制学报,2012,10(3):193~198(Gao Q,Zhong W X.Numerical algorithms of dynamic system with nonholonomic constraints.Journal of Dynamics and Control,2012,10(3):193~198(in Chinese))
9白龙,戈新生.基于球摆模型的离散变分积分子算法研究.动力学与控制学报,2013,11(4):295~300(Bai L,Ge X S.The Discrete variational integrators method of the spherical pendulum.Journal of Dynamics and Control,2013,11(4):295~300(in Chinese))
10夏丽莉,国忠金,张伟.基于离散Legenda变换的Hamilton系统的变分算法和辛结构.华中师范大学学报(自然科学版),2017,51(4):449~454(Xia L L,Guo Z J,Zhang W.Variational calculation and symplectic structure of Hamiltonian systems based the discrete Legenda transformation.Journal of Central China Normal Unversity(Nature Science Edition),2017,51(4):449~454(in Chinese))
11 Hall J.Convergence of Galerkin variational integrators for vector spaces and Lie groups[Ph.D Thesis].San Diego:Department of Mathematics University of California,2013
12 Muehlebach M,Heimsch T,Glocker C.Variational integrators-A continuous time approach.International Journal for Numerical Methods in Engineering,2017,109:1549~1581
13潘坤,丁洁玉,董贺威等.基于重心插值的多体系统动力学离散变分方法.青岛大学学报(自然科学版),2017,30(2):77~82(Pan K,Ding J Y,Dong H W,et al.Discrete variational method of multi-body system dynamics based on center of gravity interpolation.Journal of Qingdao University(Nature Science Edition),2017,30(2):77~82(in Chinese))
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