The nonlinear normal modes of a class of one-dimensional, conservative, continuous systems are examined. These are free, periodic motions during which all particles of the system reach their extremum amplitudes at the same instant of time. During a nonlinear normal mode, the motion of an arbitrary particle of the system is expressed in terms of the motion of a certain reference point by means of a modal function. Conservation of energy is imposed to construct a partial differential equation satisfied by the modal function, which is asymptotically solved using a perturbation methodology. The stability of the detected nonlinear modes is then investigated by expanding the corresponding variational equations in bases of orthogonal polynomials and analyzing the resulting set of linear differential equations with periodic coefficients by Floquet analysis. Applications of the general theory are given by computing the nonlinear normal modes of a simply-supported beam lying on a nonlinear elastic foundation, and of a cantilever beam possessing geometric nonlinearities.
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July 1994
Research Papers
An Energy-Based Formulation for Computing Nonlinear Normal Modes in Undamped Continuous Systems
M. E. King,
M. E. King
Department of Mechanical and Industrial Engineering, University of Illinois at Urbana-Champaign, Urbana, IL 61801
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A. F. Vakakis
A. F. Vakakis
Department of Mechanical and Industrial Engineering, University of Illinois at Urbana-Champaign, Urbana, IL 61801
Search for other works by this author on:
M. E. King
Department of Mechanical and Industrial Engineering, University of Illinois at Urbana-Champaign, Urbana, IL 61801
A. F. Vakakis
Department of Mechanical and Industrial Engineering, University of Illinois at Urbana-Champaign, Urbana, IL 61801
J. Vib. Acoust. Jul 1994, 116(3): 332-340 (9 pages)
Published Online: July 1, 1994
Article history
Received:
December 1, 1992
Online:
June 17, 2008
Citation
King, M. E., and Vakakis, A. F. (July 1, 1994). "An Energy-Based Formulation for Computing Nonlinear Normal Modes in Undamped Continuous Systems." ASME. J. Vib. Acoust. July 1994; 116(3): 332–340. https://doi.org/10.1115/1.2930433
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