Nonergodic Brownian oscillator: Low-frequency response

Abstract

An undisturbed Brownian oscillator may not reach thermal equilibrium with the thermal bath due to the formation of a localized normal mode. The latter may emerge when the spectrum of the thermal bath has a finite upper bound ω0 and the oscillator natural frequency exceeds a critical value ωc, which depends on the specific form of the bath spectrum. We consider the response of the oscillator with and without a localized mode to the external periodic force with frequency lower than ω0. The results complement those obtained earlier for the high-frequency response at ω0 and require a different mathematical approach. The signature property of the high-frequency response is resonance when the external force frequency coincides with the frequency of the localized mode ω*. In the low-frequency domain <ω0 the condition of resonance =ω* cannot be met (since ω*>ω0). Yet, in the limits ωωc and ω0-, the oscillator shows a peculiar quasi-resonance response with an amplitude increasing with time sublinearly.