Instability of a nonlinear oscillator with small friction and small additive noise
Abstract
Let λ= λ(β,σ,a,b) denote the top Lyapunov exponent for the linearization along trajectories of the noisy damped non-linear oscillator x+βx + ax+bx3 = σWt, where a, b and β are all positive and σ≠ 0. In 2004 Arnold, Imkeller and Sri Namachchivaya stated without proof that λ(2 β, σ,a,b) λ 2/3 as 0 with λ > 0. This paper contains a proof of this assertion.
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