Litcius/Paper detail

Beyond Linear Response: Equivalence between Thermodynamic Geometry and Optimal Transport

Adrianne Zhong, Michael R. DeWeese

2024Physical Review Letters12 citationsDOI

Abstract

A fundamental result of thermodynamic geometry is that the optimal, minimal-work protocol that drives a nonequilibrium system between two thermodynamic states in the slow-driving limit is given by a geodesic of the friction tensor, a Riemannian metric defined on control space. For overdamped dynamics in arbitrary dimensions, we demonstrate that thermodynamic geometry is equivalent to L^{2} optimal transport geometry defined on the space of equilibrium distributions corresponding to the control parameters. We show that obtaining optimal protocols past the slow-driving or linear response regime is computationally tractable as the sum of a friction tensor geodesic and a counterdiabatic term related to the Fisher information metric. These geodesic-counterdiabatic optimal protocols are exact for parametric harmonic potentials, reproduce the surprising nonmonotonic behavior recently discovered in linearly biased double well optimal protocols, and explain the ubiquitous discontinuous jumps observed at the beginning and end times.

Topics & Concepts

GeodesicInformation geometryPhysicsRiemannian geometryNon-equilibrium thermodynamicsTensor (intrinsic definition)Parametric statisticsEquivalence (formal languages)Thermodynamic limitMetric (unit)Classical mechanicsStatistical physicsMetric tensorMathematicsGeometryQuantum mechanicsPure mathematicsEconomicsOperations managementStatisticsScalar curvatureCurvatureAdvanced Thermodynamics and Statistical MechanicsStatistical Mechanics and Entropythermodynamics and calorimetric analyses