Time-Delayed Quantum Feedback Control

Grimsmo, Arne L.

doi:10.1103/physrevlett.115.060402

Cited by 134 publications

(188 citation statements)

References 55 publications

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“…One can show that this is equivalent to allowing S to interact with each discrete input mode twice (the time interval between the two interactions representing the delay time), a dynamics that was tackled in Ref. [16] through a nice diagrammatic method.…”

Section: Discussionmentioning

confidence: 99%

“…The last property alongside their simple and intrinsically discrete nature make CMs advantageous case studies to investigate major open problems in quantum non-Markovianity once the basic model outlined above is modi ed so as to introduce a memory mechanism. Among the ways to endow a CM with memory are: adding ancillaancilla collisions [4][5][6][7][8][9][10], embedding S into a larger system [11][12][13][14][15], allowing S to collide with each ancilla more than once [16,17], assuming a correlated initial bath state instead of a product one [18][19][20][21][22][23][24][25] or initial system-bath correlations [26][27][28]. Typical tasks that can be accomplished through NM CMs constructed in one of these ways are: deriving well-de ned (i.e., unconditionally completely positive) NM MEs [4,5,[37][38][39], gaining quantitative information about the role of system-bath and/or intra-bath correlations in making a dynamics NM [6,10,[19][20][21][22], simulating highly NM dynamics or indivisible channels [7,18,24].…”

Section: Introductionmentioning

confidence: 99%

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Collision models in quantum optics

Ciccarello¹

2017

Quantum Measurements and Quantum Metrology

116

118

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Quantum collision models (CMs) provide advantageous case studies for investigating major issues in open quantum systems theory, and especially quantum non-Markovianity. After reviewing their general de nition and distinctive features, we illustrate the emergence of a CM in a familiar quantum optics scenario. This task is carried out by highlighting the close connection between the well-known input-output formalism and CMs. Within this quantum optics framework, usual assumptions in the CMs' literature -such as considering a bath of noninteracting yet initially correlated ancillas -have a clear physical origin.

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Section: Discussionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Collision models in quantum optics

Ciccarello¹

2017

Quantum Measurements and Quantum Metrology

116

118

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“…To solve this problem methods have been proposed employing the Liouville space [26], Matrix product state (MPS) evolution [27], and the Heisenberg picture [21].…”

Section: Introductionmentioning

confidence: 99%

Intensified antibunching via feedback-induced quantum interference

Naumann

Cerrillo

et al. 2017

Phys. Rev. A

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We numerically show that time delayed coherent feedback controls the statistical output characteristics of driven quantum emitters. Quantum feedback allows to enhance or suppress a wide range of classical and nonclassical features of the emitted quantum light. As exemplary quantum system, we use a pumped cavity containing two emitters. By applying phase-selective feedback, we demonstrate that photon antibunching and bunching can be increased in orders of magnitude due to intrinsically and externally controllabe quantum interferences. Our modelling is based on a fully non-Markovian quantum simulation of a structured photon continuum. We show that an approximative method in the Schrödinger picture allows a very good estimate for quantum feedback induced features for low pump rates.

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“…Remarkably, (i) in particular can suggest schemes to perform experimental simulations of non-Markovian dynamics [17] or provide valuable theoretical tools in the analysis of very large Hilbert space problems [18] and time-delayed quantum feedback [19]. Concerning (ii), in particular, in 2013 two of us [12] showed that one can use a collision model to work out a non-Markovian master equation that is both capable to interpolate between a Markovian and a strongly non-Markovian regime and, additionally, is ensured to be completely positive and trace preserving, namely two requirements that are in general hard to meet at the same time.…”

Section: Introductionmentioning

confidence: 99%

Composite quantum collision models

2017

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A collision model (CM) is a framework to describe open quantum dynamics. In its memoryless version, it models the reservoir R as consisting of a large collection of elementary ancillas: the dynamics of the open system S results from successive collisions of S with the ancillas of R. Here, we present a general formulation of memoryless composite CMs, where S is partitioned into the very open system under study S coupled to one or more auxiliary systems {S i }. Their composite dynamics occurs through internal S−{S i } collisions interspersed with external ones involving {S i } and the reservoir R. We show that important known instances of quantum non-Markovian dynamics of S-such as the emission of an atom into a reservoir featuring a Lorentzian, or multi-Lorentzian, spectral density or a qubit subject to random telegraph noise-can be mapped on to such memoryless composite CMs.

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Time-Delayed Quantum Feedback Control

Cited by 134 publications

References 55 publications

Collision models in quantum optics

Collision models in quantum optics

Intensified antibunching via feedback-induced quantum interference

Composite quantum collision models

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