Stochastic resonance in bistable systems with nonlinear dissipation and multiplicative noise: A microscopic approach

TL;DR

This paper investigates stochastic resonance in bistable systems using a microscopic Caldeira-Leggett model, revealing new effects of nonlinear dissipation and state-dependent noise on resonance behavior.

Contribution

It introduces a microscopic approach to SR in bistable systems with nonlinear dissipation, showing effects not captured by phenomenological models.

Findings

SPA exhibits SR for parameters a, b, and τ.

SPA shows single-peak and two-peak structures depending on noise.

Results differ from phenomenological Langevin models.

Abstract

The stochastic resonance (SR) in bistable systems has been extensively discussed with the use of {\it phenomenological} Langevin models. By using the {\it microscopic}, generalized Caldeira-Leggett (CL) model, we study in this paper, SR of an open bistable system coupled to a bath with a nonlinear system-bath interaction. The adopted CL model yields the non-Markovian Langevin equation with nonlinear dissipation and state-dependent diffusion which preserve the fluctuation-dissipation relation (FDR). From numerical calculations, we find the following: (1) the spectral power amplification (SPA) exhibits SR not only for $a$ and $b$ but also for $\tau$ while the stationary probability distribution function is independent of them where $a$ ($b$) denotes the magnitude of multiplicative (additive) noise and $\tau$ expresses the relaxation time of colored noise; (2) the SPA for coexisting additive and multiplicative noises has a single-peak but two-peak structure as functions of $a$, $b$ and/or $\tau$. These results (1) and (2) are qualitatively different from previous ones obtained by phenomenological Langevin models where the FDR is indefinite or not held.