Non Linear Oscillations

We have seen that the potential energy of a particle about its position of stable equilibrium can be expressed as,

U ( q ) = ½ C₂ q² + 1/6 C₃ q³ + 1/24 C₄ q⁴ + ….

where q is displacement. The restoring force, therefore, is

F ( q ) = –C₂ q – ½ C₃ q² – 1/6 C₄ q³ – ….

If either all the coefficients C₃, C₄, etc. (except C₂) are zero, or if terms containing q² and higher powers are neglected, the restoring force is linear in displacement, F ( q ) = –C₂ q. The particle then executes simple harmonic motion about position of equilibrium at q = 0, with frequency .

On the other hand, if terms containing higher powers of q are present in the expression for force, the force is said to depend non-linearly on displacement. In such cases, the motion of the particle shows two important deviations from simple harmonic motion:
    
1. In general, the resultant motion of the particle is a superposition of harmonic oscillations of fundamental frequency and higher harmonics containing frequencies 2 ω, 3 ω, etc.
    
2. In general, the equilibrium point about which oscillations occur gets displaced from q = 0 to some other position q = q₀. The particle oscillates symmetrically about point q = q₀, and not about q = 0.
    
Suppose a particle is subjected to a restoring force is given by,

F ( q ) = –C₂ q – ½ C₃ q²

The force contains a linear term (–C₂ q) and a non-linear term [(–C₃/2)q²]

The equation of motion of the particle is written as,

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