Related papers: Out-of-time-order correlators of nonlocal block-spin and random observables in integrable and nonintegrable spin chains

Out-of-time-order correlators of nonlocal block-spin and random observables in integrable and nonintegrable spin chains

URL: http://arxiv.org/abs/2203.05494v1
Date: Thu, 10 Mar 2022 17:30:11 GMT
Title: Out-of-time-order correlators of nonlocal block-spin and random observables in integrable and nonintegrable spin chains
Authors: Rohit Kumar Shukla, Arul Lakshminarayan, and Sunil Kumar Mishra
Abstract summary: We study contiguous symmetric blocks of spins or random operators localized on these blocks as observables. We find only power-law growth of OTOC in both integrable and nonintegrable regimes. Averaging over random observables from the Gaussian unitary ensemble, the OTOC is found to be exactly same as the operator entanglement entropy.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Out-of-time-order correlators (OTOC) in the Ising Floquet system, that can be both integrable and nonintegrable is studied. Instead of localized spin observables, we study contiguous symmetric blocks of spins or random operators localized on these blocks as observables. We find only power-law growth of OTOC in both integrable and nonintegrable regimes. In the non-integrable regime, beyond the scrambling time, there is an exponential saturation of the OTOC to values consistent with random matrix theory. This motivates the use of "pre-scrambled" random block operators as observables. A pure exponential saturation of OTOC in both integrable and nonintegrable system is observed, without a scrambling phase. Averaging over random observables from the Gaussian unitary ensemble, the OTOC is found to be exactly same as the operator entanglement entropy, whose exponential saturation has been observed in previous studies of such spin-chains.

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