Soft impact dynamics of a cantilever beam: equivalent SDOF model versus infinite-dimensional system

Non-smooth dynamics of a cantilever beam subjected to a transverse harmonic force and impacting onto a soft obstacle is studied. Upon formulating the equations of motion of the beam, proper attention is paid to identifying the mechanical properties of an equivalent single-degree-of-freedom (SDOF) piecewise linear impacting model. A multi-degree-of-freedom (MDOF) model of the impacting beam is also derived via standard finite elements. An ‘optimal’ identification curve of the obstacle spring rigidities in the two models is obtained by comparing the relevant pseudo-resonance frequencies. The identification is then exploited in the non-linear dynamic regime to get hints on some main, mostly regular, features of non-linear dynamic response of the impacting beam by the actual investigation of the behaviour of the sole equivalent SDOF model, with a definitely lower computational effort. Sample regular and non-regular responses of the MDOF model are also presented where the identification does not work. Overall, useful points are made as regards the possibility and the limitations of referring to an SDOF impacting model to investigate the non-linear response of the underlying infinite-dimensional system.

[1]  Richard D. Neilson,et al.  Chaotic Motion of a Rotor System with a Bearing Clearance , 1993 .

[2]  Alexander F. Vakakis,et al.  Numerical and Experimental Study of Nonlinear Localization in a Flexible Structure with Vibro‐Impacts , 1997 .

[3]  J. Cusumano,et al.  Period-infinity periodic motions, chaos, and spatial coherence in a 10 degree of freedom impact oscillator , 1993 .

[4]  Jonathan A. Wickert,et al.  RESPONSE OF A PERIODICALLY DRIVEN IMPACT OSCILLATOR , 1994 .

[5]  Francis C. Moon,et al.  Chaotic and fractal dynamics , 1992 .

[6]  Tomasz Kapitaniak,et al.  Dynamics of a two-degree-of-freedom cantilever beam with impacts , 2009 .

[7]  Steven R. Bishop,et al.  Prediction of period-1 impacts in a driven beam , 1996, Proceedings of the Royal Society of London. Series A: Mathematical, Physical and Engineering Sciences.

[8]  Leon O. Chua,et al.  Practical Numerical Algorithms for Chaotic Systems , 1989 .

[9]  Jenny Jerrelind,et al.  Nonlinear dynamics of parts in engineering systems , 2000 .

[10]  Jay Kim,et al.  NEW ANALYSIS METHOD FOR A THIN BEAM IMPACTING AGAINST A STOP BASED ON THE FULL CONTINUOUS MODEL , 1996 .

[11]  Ugo Andreaus,et al.  Cracked beam identification by numerically analysing the nonlinear behaviour of the harmonically forced response , 2011 .

[12]  Ugo Andreaus,et al.  Numerical simulation of the soft contact dynamics of an impacting bilinear oscillator , 2010 .

[13]  Balakumar Balachandran,et al.  Dynamics of an Elastic Structure Excited by Harmonic and Aharmonic Impactor Motions , 2003 .

[14]  N. Popplewell,et al.  Improved Approximations for a Beam Impacting a Stop , 1994 .

[15]  V. Babitsky Theory of Vibro-Impact Systems and Applications , 2013 .

[16]  Marian Wiercigroch,et al.  Experimental Study of a Symmetrical Piecewise Base-Excited Oscillator , 1998 .

[17]  Yu. V. Mikhlin,et al.  Solitary transversal waves and vibro-impact motions in infinite chains and rods , 2000 .

[18]  Alexander F. Vakakis,et al.  Numerical and experimental analysis of a continuous overhung rotor undergoing vibro-impacts , 1999 .

[19]  Marian Wiercigroch,et al.  Cumulative effect of structural nonlinearities: chaotic dynamics of cantilever beam system with impacts , 2005 .

[20]  A. Vakakis,et al.  PROPER ORTHOGONAL DECOMPOSITION (POD) OF A CLASS OF VIBROIMPACT OSCILLATIONS , 2001 .

[21]  Marius-F. Danca,et al.  On a possible approximation of discontinuous dynamical systems , 2002 .

[22]  Steven W. Shaw,et al.  Chaotic vibrations of a beam with non-linear boundary conditions , 1983 .

[23]  David J. Wagg,et al.  APPLICATION OF NON-SMOOTH MODELLING TECHNIQUES TO THE DYNAMICS OF A FLEXIBLE IMPACTING BEAM , 2002 .

[24]  F. Peterka,et al.  Bifurcations and transition phenomena in an impact oscillator , 1996 .

[25]  Marian Wiercigroch,et al.  Applied nonlinear dynamics and chaos of mechanical systems with discontinuities , 2000 .

[26]  P. Holmes,et al.  A periodically forced piecewise linear oscillator , 1983 .

[27]  P. Metallidis,et al.  Vibration of a continuous system with clearance and motion constraints , 2000 .

[28]  Steven W. Shaw,et al.  Forced vibrations of a beam with one-sided amplitude constraint: Theory and experiment , 1985 .

[29]  Balakumar Balachandran,et al.  Utilizing nonlinear phenomena to locate grazing in the constrained motion of a cantilever beam , 2009 .

[30]  Ni Qiao,et al.  Bifurcations and chaos in a forced cantilever system with impacts , 2006 .

[31]  de A Bram Kraker,et al.  PERIODIC SOLUTIONS OF A MULTI-DOF BEAM SYSTEM WITH IMPACT , 1996 .