Hidden Entropy Production at Mechanical Stall: Exact Reconstruction in a Reciprocal Brownian Motor

Abstract

We show that in a reciprocal Brownian motor the entropy production hidden behind a mechanically stalled coordinate can be reconstructed exactly from measurements of that coordinate alone. We introduce a minimal, analytically solvable Langevin motor in which an observed translational coordinate is coupled reciprocally to a hidden internal rotor: a single periodic potential V(x-θ) generates both the force on the observed coordinate and the reaction torque on the hidden one, so that τ int=- Fx holds identically. Force--torque reciprocity together with translational symmetry produces a local current identity that closes the hidden thermodynamic bookkeeping. From it we prove that the Harada--Sasa heat measured through the observed coordinate equals the positive current-square dissipation of that coordinate, with the information-flow correction vanishing identically. eciprocal class. ries in that it requires no separation of time scales.

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