Nonlinear model order reduction of jointed structures for dynamic analysis

Abstract Assembled structures generally show weak nonlinearity, thus it is rather commonplace to assume that their modes are both linear and uncoupled. At small to modest amplitude, the linearity assumption remains correct in terms of stiffness but, on the contrary, the dissipation in joints is strongly amplitude-dependent. Besides, the modes of any large structure may be LOCALLY collinear in the localized region of a joint. As a result the projection of the structure on normal modes is not appropriate since the corresponding generalized coordinates may be strongly coupled. Instead of using this global basis, the present paper deals with the use of a local basis to reduce the size of the problem without losing the nonlinear physics. Under an appropriate set of assumptions, the method keeps the dynamic properties of joints, even for large amplitude, which include coupling effects, nonlinear damping and softening effects. The formulation enables us to take into account FE models of any realistic geometry. It also gives a straightforward process for experimental identification. The formulation is detailed and investigated on a jointed structure.

[1]  Gaël Chevallier,et al.  A numerical tool for the design of assembled structures under dynamic loads , 2013 .

[2]  H. Wentzel,et al.  Mechanisms of dissipation in frictional joints—Influence of sharp contact edges and plastic deformation , 2008 .

[3]  L. Gaul,et al.  The Role of Friction in Mechanical Joints , 2001 .

[4]  D. Segalman A Four-Parameter Iwan Model for Lap-Type Joints , 2002 .

[5]  R. Guyan Reduction of stiffness and mass matrices , 1965 .

[6]  J. Sinou,et al.  An adaptive harmonic balance method for predicting the nonlinear dynamic responses of mechanical systems—Application to bolted structures , 2010 .

[7]  G. Kerschen,et al.  The Method of Proper Orthogonal Decomposition for Dynamical Characterization and Order Reduction of Mechanical Systems: An Overview , 2005 .

[8]  Piotr Breitkopf,et al.  Model reduction for multidisciplinary optimization - application to a 2D wing , 2008 .

[9]  Etienne Balmes,et al.  Optimal Ritz vectors for component mode synthesis using the singular value decomposition , 1996 .

[10]  Charbel Farhat,et al.  Nonlinear model order reduction based on local reduced‐order bases , 2012 .

[11]  E. Balmés Review and evaluation of shape expansion methods , 2000 .

[12]  Gaël Chevallier,et al.  Improvement of measurement techniques for damping induced by micro-sliding , 2013 .

[13]  Jorge J. Moré,et al.  The Levenberg-Marquardt algo-rithm: Implementation and theory , 1977 .

[14]  D. Dane Quinn Modal Analysis of Jointed Structures , 2012 .

[15]  Gaël Chevallier,et al.  MICRO-SLIP INDUCED DAMPING IN PLANAR CONTACT UNDER CONSTANT AND UNIFORM NORMAL STRESS , 2010 .

[16]  M. Bampton,et al.  Coupling of substructures for dynamic analyses. , 1968 .

[17]  Daniel J. Segalman,et al.  Model Reduction of Systems With Localized Nonlinearities , 2006 .

[18]  A. Vakakis,et al.  Simulation of dynamics of beam structures with bolted joints using adjusted Iwan beam elements , 2004 .

[19]  Hamid Ahmadian,et al.  Generic element formulation for modelling bolted lap joints , 2007 .