Master Equation and Two Heat Reservoirs

Abstract

We analyze a simple spin-flip process under the presence of two heat reservoirs. While one flip process is triggered by a bath at temperature T, the inverse process is activated by a bath at a different temperature T . The situation can be described by using a master equation approach in a second quantized Hamiltonian formulation. The stationary solution leads to a generalized Fermi-Dirac distribution with an effective temperature Te. Likewise the relaxation time is given in terms of Te. Introducing a spin-representation we perform a Landau expansion for the averaged spin <σ> as order parameter and consequently, a free energy functional can be derived. Owing to the two reservoirs the model is invariant with respect to a simultaneous change σ - σ and T T . This new symmetry generates a third order term in the free energy which gives rise a dynamically induced first order transition.

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