Entangled light in transition through the generation threshold

Kryuchkyan, G. Yu.; Manukyan, L. A.

doi:10.1103/physreva.69.013813

Cited by 20 publications

(5 citation statements)

References 35 publications

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“…Application of this method for the numerical study of open quantum-optical systems are shown, in particular, in the works [25][26][27][28][29][30][31][32][33][34][35][36][37][38]. Detailed analysis of this three-photon radiation process in case of monochromatic pump field ( ) 1 f t = is presented in the work [16].…”

Section: K a A A Amentioning

confidence: 97%

Three-photon states in phase space

Gevorgyan

2015

J. Contemp. Phys.

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Section: K a A A Amentioning

confidence: 97%

Three-photon states in phase space

Gevorgyan

2015

J. Contemp. Phys.

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“…[46] Therefore, the operator can be approximated near the steady-state value as: O = O s + 𝛿O, where O = a i , m, b, with O s representing the mean value of O and 𝛿O denoting the fluctuation of O. After we substitute the approximate operator to QLE, we can easily obtain steady-state solution considered in the monostable region [47] a 1s = −𝜀 1…”

Section: Model and Hamiltonianmentioning

confidence: 99%

“…[ 46 ] Therefore, the operator can be approximated near the steady‐state value as:

O=O_s+\delta O

, where

O=a_{i}, m, b

, with

O_s

representing the mean value of

O

and

\delta O

denoting the fluctuation of

O

. After we substitute the approximate operator to QLE, we can easily obtain steady‐state solution considered in the monostable region [ 47 ]

\begin{matrix} a_{1 s} & = & \frac{- ε_{1}}{- (i {\overset{Δ}{true}}_{a 1} + κ_{a 1})} + \frac{- i ε_{2} J false(i {\tilde{normalΔ}}_{a 1} + κ_{a 1} false) false(Δ_{m} + κ_{m} false) - ε_{1} J^{2} false(i Δ_{m} + κ_{m} false)}{M} \\ a_{2 s} & = & \frac{- ε_{1} + (i {\overset{Δ}{true}}_{a 1} + κ_{a 1}) a_{1 s}}{- i J} \\ m_{s} & = & \frac{i g_{2} a_{2 s}}{- false(i Δ_{m} + κ_{m} false)} \end{matrix}

…”

Section: Model and Hamiltonianmentioning

confidence: 99%

Preparation of Distant Quantum Entanglement and One‐way Quantum Steering in Hybrid Cavity‐Magnonics‐and‐Cavity‐Optomechanical Systems

Wan,

Lin,

Lin

et al. 2024

Annalen der Physik

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A hybrid system that combines cavity magnonics and cavity optomechanics is proposed to facilitate the generation of long‐distance entanglement and enable one‐way steering between magnons and phonons. This configuration involves two directly coupled cavities, with one interacting with magnons and the other coupling with a mechanical oscillator (i.e., phonons). By driving the microwave cavity with a weak squeezed vacuum field generated by a flux‐driven Josephson parametric amplifier, entanglement and one‐way steering can be further enhanced. Moreover, the results demonstrate that magnon–phonon entanglement and one‐way quantum steering exhibit robustness against temperature variations, which has significant implications for quantum information processing and storage.

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“…The application has been constructed on the base of the numerical simulation method of quantum trajectories or Quantum State Diffusion (QSD) method [3]. The corresponding library includes investigation of quantum dissipative chaos, bistability and bifurcations [4][5][6][7][8], quantum stochastic resonance [9], long-lived quantum interference in periodically modulated oscillatory systems [10], engineering of Fock states and qubits in nonlinear oscillators [11] elaboration of devices generating intensive entangled light beams for quantum communications [12][13][14][15] as well as production of threephoton entangled states in parametric devices [16][17][18] and numerical simulation of complex quantum optical systems (see, particularly, interaction of an atom with bichromatic laser field [19][20][21], cascaded processes [22] and photonics in ion-trap systems [23]).…”

Section: Introductionmentioning

confidence: 99%

“…The density operator using an expansion of the state vector  in a truncated basis of Fock's number states of a harmonic oscillator (photonic states) is calculated. In this way, the ECAQT library corresponding to QSD method has been applied for various physical problems [4][5][6][7][8][9][10][11][12][13][14][15][16][17][18].…”

Section: Introductionmentioning

confidence: 99%

Web Portal for Photonic Technologies Using Grid Infrastructures

Astsatryan¹,

Gevorgyan²,

Shahinyan³

2012

JSEA

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The modeling of physical processes is an integral part of scientific and technical research. In this area, the Extendible C++ Application in Quantum Technologies (ECAQT) package provides the numerical simulations and modeling of complex quantum systems in the presence of decoherence with wide applications in photonics. It allows creating models of interacting complex systems and simulates their time evolution with a number of available time-evolution drivers. Physical simulations require massive amounts of calculations are often executed on distributed computing infrastructures. It is often difficult for non expert users to use such computational infrastructures or even to use advanced libraries over the infrastructures, because they often require being familiar with middleware and tools, parallel programming techniques and packages. The Parallel Grid Run-time and Application Development Environment (P-RADE) Grid Portal is a Grid portal solution that allows users to manage the whole life-cycle for executing a parallel application on the computing Grid infrastructures. The article describes the functionality and the structure of the web portal based on ECAQT package

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Entangled light in transition through the generation threshold

Cited by 20 publications

References 35 publications

Three-photon states in phase space

Three-photon states in phase space

Preparation of Distant Quantum Entanglement and One‐way Quantum Steering in Hybrid Cavity‐Magnonics‐and‐Cavity‐Optomechanical Systems

Web Portal for Photonic Technologies Using Grid Infrastructures

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