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Main Authors: Aramthottil, Adith Sai, Das, Diptarka, Das, Suchetan, Dey, Bidyut
Format: Preprint
Published: 2021
Subjects:
Online Access:https://arxiv.org/abs/2109.02132
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author Aramthottil, Adith Sai
Das, Diptarka
Das, Suchetan
Dey, Bidyut
author_facet Aramthottil, Adith Sai
Das, Diptarka
Das, Suchetan
Dey, Bidyut
contents We evaluate out of time ordered correlators in certain low dimensional quantum systems at zero temperature, subjected to homogenous quantum quenches. We find that when the Lyapunov exponent exists, it can be identified with the quenched energy. We show that the exponent naturally gets related to the post-quench effective temperature. In the context of sudden quenches the exponent is determined in terms of the quench amplitude while for smooth quenches we observe scalings (both the Kibble-Zurek as well as the fast) of the exponent with the quench rate. The scalings are identical to that of the energy generated during the quench.
format Preprint
id arxiv_https___arxiv_org_abs_2109_02132
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Scrambling under quench
Aramthottil, Adith Sai
Das, Diptarka
Das, Suchetan
Dey, Bidyut
High Energy Physics - Theory
Statistical Mechanics
We evaluate out of time ordered correlators in certain low dimensional quantum systems at zero temperature, subjected to homogenous quantum quenches. We find that when the Lyapunov exponent exists, it can be identified with the quenched energy. We show that the exponent naturally gets related to the post-quench effective temperature. In the context of sudden quenches the exponent is determined in terms of the quench amplitude while for smooth quenches we observe scalings (both the Kibble-Zurek as well as the fast) of the exponent with the quench rate. The scalings are identical to that of the energy generated during the quench.
title Scrambling under quench
topic High Energy Physics - Theory
Statistical Mechanics
url https://arxiv.org/abs/2109.02132