Sustaining a temperature difference

Abstract

We derive an expression for the minimal rate of entropy that sustains two reservoirs at different temperatures T0 and T. The law displays an intuitive -1 dependency on the relative distance and a characterisic 2 (T/T0) dependency on the boundary temperatures. First we give a back-of-envelope argument based on the Fourier Law (FL) of conduction, showing that the least-dissipation profile is exponential. Then we revisit a model of a chain of oscillators, each coupled to a heat reservoir. In the limit of large damping we reobtain the exponential and squared-log behaviors, providing a self-consistent derivation of the FL. For small damping "equipartition frustration" leads to a well-known balistic behaviour, whose incompatibility with the FL posed a long-time challenge.