Related papers: Generation of Non-Gaussian States in the Squeezed State Entanglement Scheme

Generation of Non-Gaussian States in the Squeezed State Entanglement Scheme

URL: http://arxiv.org/abs/2306.14148v1
Date: Sun, 25 Jun 2023 07:18:25 GMT
Title: Generation of Non-Gaussian States in the Squeezed State Entanglement Scheme
Authors: E. N. Bashmakova, S. B. Korolev, T. Yu. Golubeva
Abstract summary: The paper considers the possibility of generating different non-Gaussian states using the entangled state photon measurement scheme. We have proposed a way to explicitly find the wave function and the Wigner function of the output state of this scheme.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: The paper considers the possibility of generating different non-Gaussian states using the entangled state photon measurement scheme. In the paper, we have proposed a way to explicitly find the wave function and the Wigner function of the output state of this scheme. Moreover, the solutions found are not restricted to any particular case, but have maximum generality (depend on the number of measured photons and on all parameters of the scheme). Such a notation allowed us to carry out a complete analysis of the output states, depending on the scheme parameters. Using explicit expressions, we have analyzed the magnitude of non-Gaussianity of the output states, and we have revealed which particular states can be obtained in the proposed scheme. We have considered in detail a particular case of measurement (single photon measurement) and have shown that using explicit expressions for the output state wave function one can find scheme parameters to obtain states suitable for quantum error correction codes with a large fidelity value and high probability. The Schrodinger cat state with amplitude $\alpha=2$ can be obtained with fidelity $F \approx 0.88$ and probability 18 percent, and the squeezed Schrodinger cat state ($\alpha=0.5$, $R=1$) with fidelity $F \approx 0.98$ and probability 22 percent.

Related papers

Measurement-assisted non-Gaussian gate for Schr\"odinger cat states preparation: Fock resource state versus cubic phase state [0.0]
We consider the preparation of Schr"odinger cat states using a measurement-assisted gate based on the Fock resource state. We compare the efficiency of two schemes, that is, their ability to produce cat-like superpositions with high fidelity and probability of success.
arXiv Detail & Related papers (2023-07-12T17:55:25Z)
Schr\"odinger cat states prepared by logical gate with non-Gaussian resource state: effect of finite squeezing and efficiency versus monotones [0.0]
We present exact solution for the gate output state and demonstrate that there exists a degree of squeezing. We argue that measures of non-Gaussianity of the resource state as Wigner logarithmic negativiy and non-Gaussianity may not be directly applicable to assess the efficiency of non-Gaussian gates.
arXiv Detail & Related papers (2022-10-14T11:14:11Z)
Experimental demonstration of optimal unambiguous two-out-of-four quantum state elimination [52.77024349608834]
A core principle of quantum theory is that non-orthogonal quantum states cannot be perfectly distinguished with single-shot measurements. Here we implement a quantum state elimination measurement which unambiguously rules out two of four pure, non-orthogonal quantum states.
arXiv Detail & Related papers (2022-06-30T18:00:01Z)
Deterministic Gaussian conversion protocols for non-Gaussian single-mode resources [58.720142291102135]
We show that cat and binomial states are approximately equivalent for finite energy, while this equivalence was previously known only in the infinite-energy limit. We also consider the generation of cat states from photon-added and photon-subtracted squeezed states, improving over known schemes by introducing additional squeezing operations.
arXiv Detail & Related papers (2022-04-07T11:49:54Z)
Generation of nonclassical states of light via truncation of mixed states [0.0]
We show the possibilities of generating truncated states with either a maximum Fock number N or states having a minimum Fock number N. In both cases, we show that the generated states can have significant sub-Poissonian statistics as well as non-Gaussian character.
arXiv Detail & Related papers (2021-12-11T22:25:09Z)
Random quantum circuits transform local noise into global white noise [118.18170052022323]
We study the distribution over measurement outcomes of noisy random quantum circuits in the low-fidelity regime. For local noise that is sufficiently weak and unital, correlations (measured by the linear cross-entropy benchmark) between the output distribution $p_textnoisy$ of a generic noisy circuit instance shrink exponentially. If the noise is incoherent, the output distribution approaches the uniform distribution $p_textunif$ at precisely the same rate.
arXiv Detail & Related papers (2021-11-29T19:26:28Z)
Average-case Speedup for Product Formulas [69.68937033275746]
Product formulas, or Trotterization, are the oldest and still remain an appealing method to simulate quantum systems. We prove that the Trotter error exhibits a qualitatively better scaling for the vast majority of input states. Our results open doors to the study of quantum algorithms in the average case.
arXiv Detail & Related papers (2021-11-09T18:49:48Z)
Quantum state truncation using an optical parametric amplifier and a beamsplitter [0.0]
We present a scheme of quantum state truncation in the Fock basis (quantum scissors) A truncated state is generated after performing photodetections in the global state. We quantify the nonclassicality degree of the generated states using the Wigner-Yanase information measure.
arXiv Detail & Related papers (2021-09-24T15:21:12Z)
Quantum statistics of Schr\"odinger cat states prepared by logical gate with non-Gaussian resource state [0.0]
A measurement-induced continuous-variable logical gate is able to prepare Schr"odinger cat states if the gate uses a non-Gaussian resource state. A detailed analysis of the fidelity between the gate output state and high-quality Schr"odinger cat state is performed.
arXiv Detail & Related papers (2021-02-24T11:09:53Z)
Gaussian conversion protocols for cubic phase state generation [104.23865519192793]
Universal quantum computing with continuous variables requires non-Gaussian resources. The cubic phase state is a non-Gaussian state whose experimental implementation has so far remained elusive. We introduce two protocols that allow for the conversion of a non-Gaussian state to a cubic phase state.
arXiv Detail & Related papers (2020-07-07T09:19:49Z)
Gaussian Process States: A data-driven representation of quantum many-body physics [59.7232780552418]
We present a novel, non-parametric form for compactly representing entangled many-body quantum states. The state is found to be highly compact, systematically improvable and efficient to sample. It is also proven to be a universal approximator' for quantum states, able to capture any entangled many-body state with increasing data set size.
arXiv Detail & Related papers (2020-02-27T15:54:44Z)

This list is automatically generated from the titles and abstracts of the papers in this site.