Double Fourier Harmonic Balance Method for Nonlinear Oscillators by Means of Bessel Series
Abstract
The standard harmonic balance method consists in expanding the displacement of an oscillator as a Fourier cosine series in time. A key modification is proposed here, in which the conservative force is additionally expanded as a Fourier sine series in space. As a result, the steady-state oscillation frequency can be expressed in terms of a Bessel series, and the sums of many such series are known or can be developed. The method is illustrated for five different physical situations, including a ball rolling inside a V-shaped ramp, an electron attracted to a charged lament, a large-amplitude pendulum, and a Duffing oscillator. As an example of the results the predicted period of a simple pendulum swinging between 90 deg and +90 deg is found to be only 0.4% larger than the exact value. Even better, the predicted frequency for the V-ramp case turns out to be exact.
Document Details
- Document Type
- Technical Report
- Publication Date
- Oct 16, 2014
- Accession Number
- ADA623369
Entities
People
- C. E. Mungan
- T. C. Lipscombe
Organizations
- United States Naval Academy