Probabilistic work extraction on a classical oscillator beyond the second law
Statistical Mechanics
2024-08-20 v2
Abstract
We demonstrate experimentally that, applying optimal protocols which drive the system between two equilibrium states characterized by a free energy difference , we can maximize the probability of performing the transition between the two states with a work smaller than . The second law holds only on average, resulting in the inequality . The experiment is performed using an underdamped oscillator evolving in a double-well potential. We show that with a suitable choice of parameters the probability of obtaining trajectories with can be larger than 95%. Very fast protocols are a key feature to obtain these results, which are explained in terms of the Jarzynski equality.
Keywords
Cite
@article{arxiv.2402.18556,
title = {Probabilistic work extraction on a classical oscillator beyond the second law},
author = {Nicolas Barros and Sergio Ciliberto and Ludovic Bellon},
journal= {arXiv preprint arXiv:2402.18556},
year = {2024}
}