Pattern formation in one-dimensional polaron systems and temporal orthogonality catastrophe

Recent studies have demonstrated that higher than two-body bath-impurity correlations are not important for quantitatively describing the ground state of the Bose polaron. Motivated by the above, we employ the so-called Gross Ansatz (GA) approach to unravel the stationary and dynamical properties of...

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Veröffentlicht in:	arXiv.org 2021-10
Hauptverfasser:	Koutentakis, G M, Mistakidis, S I, Schmelcher, P
Format:	Artikel
Sprache:	eng
Schlagworte:	Couplings Drag Elementary excitations Excitation Impurities Momentum transfer Orthogonality Physics - Atomic Physics Physics - Pattern Formation and Solitons Physics - Quantum Gases Physics - Quantum Physics Polarons Shock waves Solitary waves Wave dispersion
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description	Recent studies have demonstrated that higher than two-body bath-impurity correlations are not important for quantitatively describing the ground state of the Bose polaron. Motivated by the above, we employ the so-called Gross Ansatz (GA) approach to unravel the stationary and dynamical properties of the homogeneous one-dimensional Bose-polaron for different impurity momenta and bath-impurity couplings. We explicate that the character of the equilibrium state crossovers from the quasi-particle Bose polaron regime to the collective-excitation stationary dark-bright soliton for varying impurity momentum and interactions. Following an interspecies interaction quench the temporal orthogonality catastrophe is identified, provided that bath-impurity interactions are sufficiently stronger than the intraspecies bath ones, thus generalizing the results of the confined case. This catastrophe originates from the formation of dispersive shock wave structures associated with the zero-range character of the bath-impurity potential. For initially moving impurities, a momentum transfer process from the impurity to the dispersive shock waves via the exerted drag force is demonstrated, resulting in a final polaronic state with reduced velocity. Our results clearly demonstrate the crucial role of non-linear excitations for determining the behavior of the one-dimensional Bose polaron.
doi_str_mv	10.48550/arxiv.2110.11165
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Motivated by the above, we employ the so-called Gross Ansatz (GA) approach to unravel the stationary and dynamical properties of the homogeneous one-dimensional Bose-polaron for different impurity momenta and bath-impurity couplings. We explicate that the character of the equilibrium state crossovers from the quasi-particle Bose polaron regime to the collective-excitation stationary dark-bright soliton for varying impurity momentum and interactions. Following an interspecies interaction quench the temporal orthogonality catastrophe is identified, provided that bath-impurity interactions are sufficiently stronger than the intraspecies bath ones, thus generalizing the results of the confined case. This catastrophe originates from the formation of dispersive shock wave structures associated with the zero-range character of the bath-impurity potential. 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subjects	Couplings Drag Elementary excitations Excitation Impurities Momentum transfer Orthogonality Physics - Atomic Physics Physics - Pattern Formation and Solitons Physics - Quantum Gases Physics - Quantum Physics Polarons Shock waves Solitary waves Wave dispersion
title	Pattern formation in one-dimensional polaron systems and temporal orthogonality catastrophe
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