Related papers: Enhancement of non-Stabilizerness within Indefinite Causal Order

Enhancement of non-Stabilizerness within Indefinite Causal Order

URL: http://arxiv.org/abs/2311.15494v2
Date: Tue, 30 Jul 2024 05:02:03 GMT
Title: Enhancement of non-Stabilizerness within Indefinite Causal Order
Authors: Yin Mo, Chengkai Zhu, Zhiping Liu, Mingrui Jing, Xin Wang,
Abstract summary: The quantum SWITCH allows quantum states to pass through operations in a superposition of different orders, outperforming traditional circuits in numerous tasks. We find that the completely stabilizer-preserving operations, which cannot generate magic states under standard conditions, can be transformed to do so when processed by the quantum SWITCH. These findings reveal the unique properties of the quantum SWITCH and open avenues in research on nonstabilizer resources of general quantum architecture.
Score: 6.612068248407539
License: http://creativecommons.org/licenses/by/4.0/
Abstract: In quantum computing, the nonstabilizerness of quantum operations is crucial for understanding and quantifying quantum speedups. In this study, we explore the phenomena of nonstabilizerness of the quantum SWITCH, a novel structure that allows quantum states to pass through operations in a superposition of different orders, outperforming traditional circuits in numerous tasks. To assess its nonstabilizerness, we propose the magic resource capacity of a quantum process to quantitatively examine the nonstabilizerness of general quantum transformations. We find that the completely stabilizer-preserving operations, which cannot generate magic states under standard conditions, can be transformed to do so when processed by the quantum SWITCH. Furthermore, when considering the impact of noise, although the nonstabilizerness of each path may be annihilated, their superposition could still preserve the overall nonstabilizerness. These findings reveal the unique properties of the quantum SWITCH and open avenues in research on nonstabilizer resources of general quantum architecture.

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