Programmable quantum-state discriminators with simple programs

Bergou, János A.; Bužek, Vladimír; Feldman, Edgar; Herzog, Ulrike; Hillery, Mark

doi:10.1103/physreva.73.062334

Cited by 58 publications

(112 citation statements)

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“…On the unambiguous side, R = 0, the only possible choice is r α = 0 for all values of α, and the success probability is given by (17). At the other end point, if R ≥ R c = n+1 α=1 p α r c,α , where r c,α is the critical margin in the subspace H α , given by (7) with c = c α , we immediately recover the minimum-error result (18).…”

Section: A Weak Error Marginmentioning

confidence: 99%

“…(19) below]. Bases obeying an orthogonality relation of the form (16) exist for any two subspaces and are known as Jordan bases [17]. Since a state of the first basis has nonzero overlap with only one element of the second basis, the problem of discriminating σ 1 from σ 2 can be cast as pure state discrimination in each Jordan subspace, which we label by j (note that the overlaps c j do not depend on the magnetic number m).…”

Section: Programmable Discriminationmentioning

confidence: 99%

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Programmable discrimination with an error margin

et al. 2013

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The problem of optimally discriminating between two completely unknown qubit states is generalized by allowing an error margin. It is visualized as a device-the programmable discriminator-with one data and two program ports, each fed with a number of identically prepared qubits-the data and the programs. The device aims at correctly identifying the data state with one of the two program states. This scheme has the unambiguous and the minimum error schemes as extremal cases, when the error margin is set to zero or it is sufficiently large, respectively. Analytical results are given in the two situations where the margin is imposed on the average error probability-weak condition-or it is imposed separately on the two probabilities of assigning the state of the data to the wrong program-strong condition. It is a general feature of our scheme that the success probability rises sharply as soon as a small error margin is allowed, thus providing a significant gain over the unambiguous scheme while still having high confidence results.

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Section: A Weak Error Marginmentioning

confidence: 99%

Section: Programmable Discriminationmentioning

confidence: 99%

Programmable discrimination with an error margin

et al. 2013

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“…Moreover, if we have the PSP, take the average of it and we can obtain the ASP. Unfortunately, except the results for few special simple cases [7,8], PSPs for the general case with multi-copy and high-dimensional states are left behind and still not obtained.The main purpose of this paper is to evaluate the PSPs of the optimal universal unambiguous discriminators between two unknown pure states for the general case. Following the optimal measurement operators for the universal unambiguous discriminator in Ref.…”

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confidence: 99%

mentioning

confidence: 99%

“…In this programmable quantum device, two possible states enter two program registers as "programs" respectively, and the data register is prepared with a third state (guaranteed to be one of the two possible states) which one wishes to identify. One amazing feature of this discriminator is that the states in the device can be unknown, which means no classical knowledge on the states is provided, and it is capable to distinguish any pair of states in this device.Later, the generalizations and the experimental realizations of programmable discriminators are introduced and widely discussed [8][9][10][11][12][13]. The problems with multiple copies in program and data registers or with high-dimensional states in the registers are considered.…”

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Success probabilities for universal unambiguous discriminators between unknown pure states

Zhou

2014

Phys. Rev. A

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A universal programmable discriminator can perform the discrimination between two unknown states, and the optimal solution can be approached via the discrimination between the two averages over the uniformly distributed unknown input pure states, which has been widely discussed in previous works. In this paper, we consider the success probabilities of the optimal universal programmable unambiguous discriminators when applied to the pure input states. More precisely, the analytic results of the success probabilities are derived with the expressions of the optimal measurement operators for the universal discriminators and we find that the success probabilities have nothing to do with the dimension d while the amounts of the copies in the two program registers are equal. The success probability of programmable unambiguous discriminator can asymptotically approach to that of usual unambiguous discrimination (state comparison) as the number of copies in program registers (data register) goes to infinity.PACS numbers: 03.67. Hk, 03.65.Ta, 03.65.Fd The discrimination between quantum states is a basic tool in quantum information processing, and this is a nontrivial problem since an unknown state cannot be perfectly cloned [1]. Usually, there are two basic strategies to achieve the state discrimination: Minimum-error discrimination (MD) [2-4] with a minimal probability for the error, and unambiguous discrimination (UD) [5] with a minimum probability of inconclusive results. In those works, a quantum state is chosen from a set of known states but we do not know which and want to determine the actual states.The discrimination problems above are dependent on the set of states to be distinguished, and the device for the discrimination is not universal but specifically designed for the states. As in the spirit of programmable quantum devices [6], it is interesting to design a discrimination device that does not need to change as the input states change. Such a universal device that can unambiguously discriminate between two unknown qubit states has first been constructed by Bergou and Hillery [7]. In this programmable quantum device, two possible states enter two program registers as "programs" respectively, and the data register is prepared with a third state (guaranteed to be one of the two possible states) which one wishes to identify. One amazing feature of this discriminator is that the states in the device can be unknown, which means no classical knowledge on the states is provided, and it is capable to distinguish any pair of states in this device.Later, the generalizations and the experimental realizations of programmable discriminators are introduced and widely discussed [8][9][10][11][12][13]. The problems with multiple copies in program and data registers or with high-dimensional states in the registers are considered. Furthermore, the case that each copy in the registers is the mixed state is also treated [11]. In most of these literatures, either the unambiguous discrimination or the minimum-error scheme is us...

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Optimal Discrimination of Two Nonorthogonal States by Continuous Probing and Feedback Operation

Zhao

2022

Annalen der Physik

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For a quantum system prepared probabilistically on two or more non‐orthogonal states, the observer cannot discriminate the initial preparation perfectly. Kurt Jacobs [Quantum Inf. Comput. 2007, 7, 127] introduced a measurement operator that could increase the rate of information obtained using a continuous measurement scheme. However, the better effect happens at the expense of reducing the total information from the quantum system. To address this problem, an optimal operator that could yield the maximal value of mutual information for a long‐time measurement is found. Particularly, it turns out that the error probability is minimized for any measurement moment by measuring the optimal operator. Furthermore, for a given finite measurement time, a measurement scheme to maximize the obtained mutual information is presented. It is shown that while the Jacobs' operator should be used for a short‐time case, for a long‐time limit, the proposed optimal operator should be employed. For a given finite duration, the proposal could determine the optimal measurement operator that maximizes the final value of mutual information.

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Programmable quantum-state discriminators with simple programs

Cited by 58 publications

References 38 publications

Programmable discrimination with an error margin

Programmable discrimination with an error margin

Success probabilities for universal unambiguous discriminators between unknown pure states

Optimal Discrimination of Two Nonorthogonal States by Continuous Probing and Feedback Operation

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