Thermal Contact. II. A Solvable Toy Model

TL;DR

This paper introduces a solvable toy model of thermal contact using a layer of independent spin pairs, calculating heat transfer statistics, large deviation functions, and fluctuation properties in nonequilibrium steady states.

Contribution

It provides explicit analytical expressions for heat transfer statistics and fluctuation properties in a simplified, exactly solvable model of thermal contact.

Findings

Explicit large deviation function for heat transfer derived.

Analysis of fluctuation properties and effects of mesoscopic time scales.

Insights into the limit of zero-temperature thermostats and thermal machine behavior.

Abstract

A diathermal wall between two heat baths at different temperatures can be mimicked by a layer of independent spin pairs with some internal energy and where each spin $\sigma_a$ is flipped by thermostat $a$ ($a=1,2$). The transition rates are determined from the modified detailed balance discussed in Ref.[1]. Generalized heat capacities, excess heats, the housekeeping entropy flow and the thermal conductivity in the steady state are calculated. The joint probability distribution of the heat cumulated exchanges at any time is computed explicitly. We obtain the large deviation function of heat transfer via a variety of approaches. In particular, by a saddle-point method performed accurately, we obtain the explicit expressions not only of the large deviation function, but also of the amplitude prefactor, in the long-time probability density for the heat current. The following physical properties are discussed : the effects of typical time scales of the mesoscopic dynamics which do not appear in equilibrium statistical averages and the limit of strict energy dissipation towards a thermostat when its temperature goes to zero. We also derive some properties of the fluctuations in the two-spin system viewed as a thermal machine performing cycles.