Identification of quantum scars via phase-space localization measures

Abstract

There is no unique way to quantify the degree of delocalization of quantum states in unbounded continuous spaces. In this work, we explore a recently introduced localization measure that quantifies the portion of the classical phase space occupied by a quantum state. The measure is based on the -moments of the Husimi function and is known as the R'enyi occupation of order . With this quantity and random pure states, we find a general expression to identify states that are maximally delocalized in phase space. Using this expression and the Dicke model, which is an interacting spin-boson model with an unbounded four-dimensional phase space, we show that the R'enyi occupations with large are highly effective at revealing quantum scars. Furthermore, by analyzing the large moments of the Husimi function, we are able to find the unstable periodic orbits that scar some of the eigenstates of the model.

Description

Scholarly article / Open access

Keywords

localization measures, phase space, Husimi function, R ́enyi occupation, Dicke mode, unstable periodic orbits, eigenstates, quantum scars

Citation

Santos, L.F., Pilatowsky-Cameo, S., Villase ̃nor, D., Bastarrachea-Magnan, M.A., Lerma-Hern ́andez, S., Hirsch, J. G. (2021, July 14). Identification of quantum scars via phase-space localization measures. https://arxiv.org/pdf/2107.06894.pdf