Finite Phase Space, Wigner Functions, and Tomography for Two-Qubit States

Abstract. The problem of finding and characterizing minimal sets of dequantizers and quantizers applied in the mapping of operators onto functions is considered, for finite-dimensional quantum systems. The general properties of such sets are determined. An explicit description of all the minimum self-dual sets of dequantizers and quantizers for a qubit system is derived. The connection between some known sets of dequantizers and quantizers and the derived formulae is presented.

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“…In [54,55] the following self-dual minimal system of dequantizers are considered for deriving a discrete Wigner function…”

Section: Self-dual Systemsmentioning

confidence: 99%

“…The star product formalism of symbols for N-dimensional systems is described in detail in [53]. Using this formalism the relations between tomograms and Wigner functions for one and two qubits have been determined [53][54][55].…”

Section: Introductionmentioning

confidence: 99%

Minimal sets of dequantizers and quantizers for finite-dimensional quantum systems

et al. 2017

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“…Various two-qubit tomography schemes have been proposed in the recent past [61][62][63][64][65]. Specifically, the tomogram for two spin-1 2 (qubit) states can be obtained using the star product scheme [61,62].…”

Section: Tomogram Of Two Spin-1 2 (Qubit) Statesmentioning

confidence: 99%

Tomograms for open quantum systems: In(finite) dimensional optical and spin systems

2016

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Tomograms are obtained as probability distributions and are used to reconstruct a quantum state from experimentally measured values. We study the evolution of tomograms for different quantum systems, both finite and infinite dimensional. In realistic experimental conditions, quantum states are exposed to the ambient environment and hence subject to effects like decoherence and dissipation, which are dealt with here, consistently, using the formalism of open quantum systems. This is extremely relevant from the perspective of experimental implementation and issues related to state reconstruction in quantum computation and communication. These considerations are also expected to affect the quasiprobability distribution obtained from experimentally generated tomograms and nonclassicality observed from them.

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“…Аналогичную связь можно установить и между функциями Вигнера (33) и томографическими символами (56), которые отвечают операторам Паули (31). Убедимся, что томографические деквантайзеры (41), (42) и квантайзеры (43), (44) не удовлетворяют соотношению (8), но удовлетворяют соотношению (7). Для этого сначала вычислим след произведения деквантайзера на квантайзер:…”

Section: томографические деквантайзеры квантайзеры и отвечающие им сunclassified

“…Найдем явный вид ядра (16), определяющего звездочное произведение томографических символов операторов. Его компоненты, вычисленные с помощью деквантайзеров (41), (42) и квантайзеров (43), (44), определяются с помощью соотношения…”

Section: томографические деквантайзеры квантайзеры и отвечающие им сunclassified

Звездочное Произведение, Дискретные Функции Вигнера И Томограммы Спиновых Систем

Ádám¹,

Andreev²,

Исар³

et al. 2016

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Finite Phase Space, Wigner Functions, and Tomography for Two-Qubit States

Cited by 18 publications

References 24 publications

Minimal sets of dequantizers and quantizers for finite-dimensional quantum systems

Minimal sets of dequantizers and quantizers for finite-dimensional quantum systems

Tomograms for open quantum systems: In(finite) dimensional optical and spin systems

Звездочное Произведение, Дискретные Функции Вигнера И Томограммы Спиновых Систем

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