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Dynamical localization of interacting bosons in the few-body limit

Radu Chicireanu, Adam Rançon

2021Physical review. A/Physical review, A14 citationsDOIOpen Access PDF

Abstract

The quantum kicked rotor is well known to display dynamical localization in the noninteracting limit. In the interacting case, while the mean-field (Gross-Pitaevskii) approximation displays a destruction of dynamical localization, its fate remains debated beyond mean field. Here we study the kicked Lieb-Liniger model in the few-body limit. We show that for any interaction strength, two kicked interacting bosons always dynamically localize, in the sense that the energy of the system saturates at long times. However, contrary to the noninteracting limit, the momentum distribution $\mathrm{\ensuremath{\Pi}}(k)$ of the bosons is not exponentially localized, but decays as $\mathcal{C}/{k}^{4}$, as expected for interacting quantum particles, with Tan's contact $\mathcal{C}$ which remains finite at long times. We discuss how our results will impact the experimental study of kicked interacting bosons.

Topics & Concepts

BosonPhysicsLimit (mathematics)QuantumMomentum (technical analysis)Classical limitQuantum mechanicsField (mathematics)Mathematical analysisFinanceEconomicsPure mathematicsMathematicsCold Atom Physics and Bose-Einstein CondensatesQuantum many-body systemsQuantum, superfluid, helium dynamics
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