Related papers: Work statistics across a quantum phase transition

Work statistics across a quantum phase transition

URL: http://arxiv.org/abs/2002.07860v1
Date: Tue, 18 Feb 2020 20:08:02 GMT
Title: Work statistics across a quantum phase transition
Authors: Zhaoyu Fei, Nahuel Freitas, Vasco Cavina, H. T. Quan, Massimiliano Esposito
Abstract summary: We investigate the statistics of the work performed during a quench across a quantum phase transition using the adiabatic theory. It is shown that all the cumulants of work exhibit universal scaling behavior analogous to the Kibble-Zurek scaling for the average density of defects.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We investigate the statistics of the work performed during a quench across a quantum phase transition using the adiabatic perturbation theory. It is shown that all the cumulants of work exhibit universal scaling behavior analogous to the Kibble-Zurek scaling for the average density of defects. Two kinds of transformations are considered: quenches between two gapped phases in which a critical point is traversed, and quenches that end near the critical point. In contrast to the scaling behavior of the density of defects, the scaling behavior of the work cumulants are shown to be qualitatively different for these two kinds of quenches. However, in both cases the corresponding exponents are fully determined by the dimension of the system and the critical exponents of the transition, as in the traditional Kibble-Zurek mechanism (KZM). Thus, our study deepens our understanding about the nonequilibrium dynamics of a quantum phase transition by revealing the imprint of the KZM on the work statistics.

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