Equality statements for entropy change in open systems

Abstract

The entropy change of a (non-equilibrium) Markovian ensemble is calculated from (1) the ensemble phase density p(t) evolved as iterative map, p(t) = M(t) p(t- t) under detail balanced transition matrix M(t), and (2) the invariant phase density π(t) = M(t)∞ π(t) . A virtual measurement protocol is employed, where variational entropy is zero, generating exact expressions for irreversible entropy change in terms of the Jeffreys measure, J(t) = Σ [p(t) - π(t)] p(t)π(t), and for reversible entropy change in terms of the Kullbach-Leibler measure, DKL(t) = Σ π(0) π(0)π(t). Five properties of J are discussed, and Clausius' theorem is derived.