Collective radiation spectrum for ensembles with Zeeman splitting in single-photon superradiance

Kong, Xiao; Pálffy, Adriana

doi:10.1103/physreva.96.033819

Cited by 11 publications

(11 citation statements)

References 45 publications

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“…They can also be observed in dilute atomic systems for which the near-field contributions of the dipole-dipole interactions are insignificant. Recent studies concern single-photon superradiance [11][12][13][14], subradiance in cold atomic gases [15,16], collective Lambshift [17,18] and localization of light [19,20]. Moreover, super-and subradiance can be explained using a quantum multipath interference approach and can be simulated from the measurement of higher-order-intensitycorrelation functions on atoms separated by a distance larger than the emission wavelength [21,22].…”

Section: Introductionmentioning

confidence: 99%

Cooperative spontaneous emission from indistinguishable atoms in arbitrary motional quantum states

2016

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We investigate superradiance and subradiance of indistinguishable atoms with quantized motional states, starting with an initial total state that factorizes over the internal and external degrees of freedom of the atoms. Due to the permutational symmetry of the motional state, the cooperative spontaneous emission, governed by a recently derived master equation [F. Damanet et al., Phys. Rev. A 93, 022124 (2016)], depends only on two decay rates γ and γ0 and a single parameter ∆ dd describing the dipole-dipole shifts. We solve the dynamics exactly for N = 2 atoms, numerically for up to 30 atoms, and obtain the large-N -limit by a mean-field approach. We find that there is a critical difference γ0 − γ that depends on N beyond which superradiance is lost. We show that exact non-trivial dark states (i.e. states other than the ground state with vanishing spontaneous emission) only exist for γ = γ0, and that those states (dark when γ = γ0) are subradiant when γ < γ0.

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Section: Introductionmentioning

confidence: 99%

Cooperative spontaneous emission from indistinguishable atoms in arbitrary motional quantum states

2016

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“…[57] and later on discussed in more detail for the general case in Ref. [26]. We note that in particular, Ref.…”

Section: Collective Lamb Shift and Cross-couplingsmentioning

confidence: 88%

“…We note that in particular, Ref. [26] has addressed the specific case of uniform magnetic hyperfine splitting, using the atomic cloud model of Svidzinsky et al [49] to describe the collective coupling. This method derives an interaction kernel for the effective inter-atomic interactions, which turns out to be identical to the free space Green's function.…”

Section: Collective Lamb Shift and Cross-couplingsmentioning

confidence: 99%

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Superradiance and anomalous hyperfine splitting in inhomogeneous ensembles

Andrejić

Pálffy

2021

Phys. Rev. A

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Collective effects in the interaction of light with ensembles of identical scatterers play an important role in many fields of physics. However, often the term "identical" is not accurate due to the presence of hyperfine fields which induce inhomogeneous transition shifts and splittings. Here we develop a formalism based on the Green function method to model the linear response of such inhomogeneous ensembles in one-dimensional waveguides. We obtain a compact formula for the collective spectrum, which exhibits deviations from the uniform frequency shift and broadening expected of two level systems. In particular, if the coherent contribution to the collective coupling is large, the effect of inhomogeneous broadening can be suppressed, with the linewidth approaching that of the superradiant value. We apply this formalism to describe collective effects in x-ray scattering off thin-film waveguides for inhomogeneous hyperfine parameters.

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“…In extended samples larger than one atomic transition wavelength, dipoledipole interactions between different atoms become relevant and the aforementioned symmetry is broken. As a result, the whole Hilbert space with dimension 2 N needs to be considered and most theoretical studies of superradiance and subradiance are consequently restricted to the emission of few photons [12][13][14][15][16][17] or to systems with a small number of atoms [18][19][20] such that numerical Monte-Carlo type methods can be applied.…”

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confidence: 99%

Superradiance and subradiance in inverted atomic arrays

Rubies-Bigordà¹,

Yelin²

2021

Preprint

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Superradiance and subradiance are collective effects that emerge from coherent interactions between quantum emitters. Due to their many-body nature, theoretical studies of extended samples with length larger than the atomic transition wavelength are usually restricted to their early time behavior or to the few-excitation limit. We hereby use a mean-field approach to reduce the complex many-body system to an effective two-atom master equation that includes all correlations up to second order and that can be numerically propagated in time. We find that three-dimensional and two-dimensional inverted atomic arrays sustain superradiance below a critical lattice spacing and quantify the scaling of the superradiant peak for both dimensionalities. Finally, we study the latetime dynamics of the system and demonstrate that a subradiant phase appears before the system finally relaxes.

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Collective radiation spectrum for ensembles with Zeeman splitting in single-photon superradiance

Cited by 11 publications

References 45 publications

Cooperative spontaneous emission from indistinguishable atoms in arbitrary motional quantum states

Cooperative spontaneous emission from indistinguishable atoms in arbitrary motional quantum states

Superradiance and anomalous hyperfine splitting in inhomogeneous ensembles

Superradiance and subradiance in inverted atomic arrays

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