Optimized Synthesis of Circuits for Diagonal Unitary Matrices with Reflection Symmetry

IF 1.5 4区 物理与天体物理 Q2 PHYSICS, MULTIDISCIPLINARY Journal of the Physical Society of Japan Pub Date : 2024-04-11 DOI:10.7566/jpsj.93.054002
Xinchi Huang, Taichi Kosugi, Hirofumi Nishi, Yu-ichiro Matsushita
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Abstract

During the noisy intermediate-scale quantum (NISQ) era, it is important to optimize the quantum circuits in circuit depth and gate count, especially entanglement gates, including the CNOT gate. Among all the unitary operators, diagonal unitary matrices form a special class that plays a crucial role in many quantum algorithms/subroutines. Based on a natural gate set \(\{ \text{CNOT},R_{z}\} \), quantum circuits for general diagonal unitary matrices were discussed in several previous works, and an optimal synthesis algorithm was proposed in terms of circuit depth. In this paper, we are interested in the implementation of diagonal unitary matrices with reflection symmetry, which has promising applications, including the realization of real-time evolution for first quantized Hamiltonians by quantum circuits. Owing to such a symmetric property, we show that the quantum circuit in the existing work can be further simplified and propose a constructive algorithm that optimizes the entanglement gate count. Compared to the previous synthesis methods for general diagonal unitary matrices, the quantum circuit by our proposed algorithm achieves nearly half the reduction in both the gate count and circuit depth.
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具有反射对称性的对角单元矩阵电路的优化合成
在噪声中量子(NISQ)时代,优化量子电路的电路深度和门数非常重要,尤其是纠缠门,包括 CNOT 门。在所有单元算子中,对角单元矩阵是一类特殊的算子,在许多量子算法/子程序中起着至关重要的作用。基于自然门集(\{ \text{CNOT},R_{z}\} \),之前的一些研究讨论了一般对角单元矩阵的量子电路,并从电路深度的角度提出了一种最优合成算法。在本文中,我们关注的是具有反射对称性的对角单元矩阵的实现,它具有广阔的应用前景,包括通过量子电路实现首次量化哈密顿的实时演化。由于这种对称性,我们发现现有工作中的量子电路可以进一步简化,并提出了一种优化纠缠门数的构造算法。与以往针对一般对角单元矩阵的合成方法相比,我们提出的算法的量子电路在门数和电路深度上都减少了近一半。
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来源期刊
CiteScore
3.40
自引率
17.60%
发文量
325
审稿时长
3 months
期刊介绍: The papers published in JPSJ should treat fundamental and novel problems of physics scientifically and logically, and contribute to the development in the understanding of physics. The concrete objects are listed below. Subjects Covered JPSJ covers all the fields of physics including (but not restricted to) Elementary particles and fields Nuclear physics Atomic and Molecular Physics Fluid Dynamics Plasma physics Physics of Condensed Matter Metal, Superconductor, Semiconductor, Magnetic Materials, Dielectric Materials Physics of Nanoscale Materials Optics and Quantum Electronics Physics of Complex Systems Mathematical Physics Chemical physics Biophysics Geophysics Astrophysics.
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