Direct Normal Form Analysis of Oscillators with Different ‎Combinations of Geometric Nonlinear Stiffness Terms

Ayman Nasir; Neil Sims; David Wagg

Direct Normal Form Analysis of Oscillators with Different ‎Combinations of Geometric Nonlinear Stiffness Terms

Publish place: Journal of Applied and Computational Mechanics، Vol: 7، Issue: 0

Publish Year: 1400

نوع سند: مقاله ژورنالی

زبان: English

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https://civilica.com/doc/1253564

شناسه ملی سند علمی:

JR_JACM-7-0_015

تاریخ نمایه سازی: 20 مرداد 1400

Abstract:

Nonlinear oscillators with geometric stiffness terms can be used to model a range of structural elements such as cables, beams and plates. In particular, single-degree-of-freedom (SDOF) systems are commonly studied in the literature by means of different approximate analytical methods. In this work, an analytical study of nonlinear oscillators with different combinations of geometric polynomial stiffness nonlinearities is presented. To do this, the method of direct normal forms (DNF) is applied symbolically using Maple software. Closed form (approximate) expressions of the corresponding frequency-amplitude relationships (or backbone curves) are obtained for both ε and ε۲ expansions, and a general pattern for ε truncation is presented in the case of odd nonlinear terms. This is extended to a system of two degrees-of-freedom, where linear and nonlinear cubic and quintic coupling terms exist. Considering the non-resonant case, an example is shown to demonstrate how the single mode backbone curves of the two degree-of-freedom system can be computed in an analogous manner to the approach used for the SDOF analysis. Numerical verifications are also presented using COCO numerical continuation toolbox in Matlab for the SDOF examples.

Keywords:

Nonlinear , Mechanical Vibrations , Direct Normal Forms , Backbone curves , Symbolic computations‎

Authors

Ayman Nasir

Department of Mechanical Engineering, The University of Sheffield, Sheffield, S۱ ۳JD, UK

Neil Sims

Department of Mechanical Engineering, The University of Sheffield, Sheffield, S۱ ۳JD, UK

David Wagg

Department of Mechanical Engineering, The University of Sheffield, Sheffield, S۱ ۳JD, UK

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