Related papers: $\mathcal{PT}$-symmetric mapping of three states and its implementation on a cloud quantum processor

$\mathcal{PT}$-symmetric mapping of three states and its implementation on a cloud quantum processor

URL: http://arxiv.org/abs/2312.16680v2
Date: Fri, 21 Jun 2024 17:28:39 GMT
Title: $\mathcal{PT}$-symmetric mapping of three states and its implementation on a cloud quantum processor
Authors: Yaroslav Balytskyi, Yevgen Kotukh, Gennady Khalimov, Sang-Yoon Chang,
Abstract summary: We develop a new $mathcalPT$-symmetric approach for mapping three pure qubit states. We show consistency with the Hermitian case, conservation of average projections on reference vectors, and Quantum Fisher Information. Our work unlocks new doors for applying $mathcalPT$-symmetry in quantum communication, computing, and cryptography.
Score: 0.9599644507730107
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We develop a new $\mathcal{PT}$-symmetric approach for mapping three pure qubit states, implement it by the dilation method, and demonstrate it with a superconducting quantum processor provided by the IBM Quantum Experience. We derive exact formulas for the population of the post-selected $\mathcal{PT}$-symmetric subspace and show consistency with the Hermitian case, conservation of average projections on reference vectors, and Quantum Fisher Information. When used for discrimination of $N = 2$ pure states, our algorithm gives an equivalent result to the conventional unambiguous quantum state discrimination. For $N = 3$ states, our approach provides novel properties unavailable in the conventional Hermitian case and can transform an arbitrary set of three quantum states into another arbitrary set of three states at the cost of introducing an inconclusive result. For the QKD three-state protocol, our algorithm has the same error rate as the conventional minimum error, maximum confidence, and maximum mutual information strategies. The proposed method surpasses its Hermitian counterparts in quantum sensing using non-MSE metrics, providing an advantage for precise estimations within specific data space regions and improved robustness to outliers. Applied to quantum database search, our approach yields a notable decrease in circuit depth in comparison to traditional Grover's search algorithm while maintaining the same average number of oracle calls, thereby offering significant advantages for NISQ computers. Additionally, the versatility of our method can be valuable for the discrimination of highly non-symmetric quantum states, and quantum error correction. Our work unlocks new doors for applying $\mathcal{PT}$-symmetry in quantum communication, computing, and cryptography.

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