Time-dependence of the effective temperatures of a two-dimensional Brownian gyrator with cold and hot components

Abstract

We consider a model of a two-dimensional molecular machine - called Brownian gyrator - that consists of two coordinates coupled to each other and to separate heat baths at temperatures respectively Tx and Ty. We consider the limit in which one component is passive, because its bath is "cold", Tx 0, while the second is in contact with a "hot" bath, Ty > 0, hence it entrains the passive component in a stochastic motion. We derive an asymmetry relation as a function of time, from which time dependent effective temperatures can be obtained for both components. We find that the effective temperature of the passive element tends to a constant value, which is a fraction of Ty, while the effective temperature of the driving component grows without bounds, in fact exponentially in time, as the steady-state is approached.