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Maxwell’s Demon Walks into Wall Street: Stochastic Thermodynamics Meets Expected Utility Theory

Andrés F. Ducuara, Paul Skrzypczyk, Francesco Buscemi, Peter Sidajaya, Valerio Scarani

2023Physical Review Letters16 citationsDOIOpen Access PDF

Abstract

The interplay between thermodynamics and information theory has a long history, but its quantitative manifestations are still being explored. We import tools from expected utility theory from economics into stochastic thermodynamics. We prove that, in a process obeying Crooks's fluctuation relations, every α Rényi divergence between the forward process and its reverse has the operational meaning of the "certainty equivalent" of dissipated work (or, more generally, of entropy production) for a player with risk aversion r=α-1. The two known cases α=1 and α=∞ are recovered and receive the new interpretation of being associated with a risk-neutral and an extreme risk-averse player, respectively. Among the new results, the condition for α=0 describes the behavior of a risk-seeking player willing to bet on the transient violations of the second law. Our approach further leads to a generalized Jarzynski equality, and generalizes to a broader class of statistical divergences.

Topics & Concepts

Mathematical economicsNon-equilibrium thermodynamicsSecond law of thermodynamicsEntropy (arrow of time)Interpretation (philosophy)Kullback–Leibler divergenceCertaintyEntropy productionStatistical physicsMaxwell's demonDivergence (linguistics)Meaning (existential)Class (philosophy)MathematicsEconomicsPhysicsThermodynamicsComputer scienceEpistemologyPhilosophyArtificial intelligenceStatisticsLinguisticsProgramming languageGeometryAdvanced Thermodynamics and Statistical MechanicsStatistical Mechanics and EntropyQuantum Mechanics and Applications