Digital simulation of non-Abelian anyons with 68 programmable superconducting qubits

• Published in: arXiv.org
• Main Authors: Xu, Shibo, Zheng-Zhi, Sun, Wang, Ke, Liang Xiang, Bao, Zehang, Zhu, Zitian, Shen, Fanhao, Song, Zixuan, Zhang, Pengfei, Ren, Wenhui, Zhang, Xu, Dong, Hang, Deng, Jinfeng, Chen, Jiachen, Wu, Yaozu, Tan, Ziqi, Gao, Yu, Jin, Feitong, Zhu, Xuhao, Zhang, Chuanyu, Wang, Ning, Zou, Yiren, Zhong, Jiarun, Zhang, Aosai, Li, Weikang, Jiang, Wenjie, Li-Wei, Yu, Yao, Yunyan, Wang, Zhen, Li, Hekang, Guo, Qiujiang, Song, Chao, Wang, H, Dong-Ling, Deng
• Format: Paper Journal Article
• Language: English
• Published: Ithaca Cornell University Library, arXiv.org 11.05.2023
• Subjects: Braiding; Digital simulation; Elementary excitations; Fermions; Ising model; Logic circuits; Physics - Mesoscale and Nanoscale Physics; Physics - Other Condensed Matter; Physics - Quantum Physics; Quantum computing; Qubits (quantum computing); Statistics; Superconductivity; Topology; Wave functions
• ISSN: 2331-8422
• DOI: 10.48550/arxiv.2211.09802

Non-Abelian anyons are exotic quasiparticle excitations hosted by certain topological phases of matter. They break the fermion-boson dichotomy and obey non-Abelian braiding statistics: their interchanges yield unitary operations, rather than merely a phase factor, in a space spanned by topologically degenerate wavefunctions. They are the building blocks of topological quantum computing. However, experimental observation of non-Abelian anyons and their characterizing braiding statistics is notoriously challenging and has remained elusive hitherto, in spite of various theoretical proposals. Here, we report an experimental quantum digital simulation of projective non-Abelian anyons and their braiding statistics with up to 68 programmable superconducting qubits arranged on a two-dimensional lattice. By implementing the ground states of the toric-code model with twists through quantum circuits, we demonstrate that twists exchange electric and magnetic charges and behave as a particular type of non-Abelian anyons, i.e., the Ising anyons. In particular, we show experimentally that these twists follow the fusion rules and non-Abelian braiding statistics of the Ising type, and can be explored to encode topological logical qubits. Furthermore, we demonstrate how to implement both single- and two-qubit logic gates through applying a sequence of elementary Pauli gates on the underlying physical qubits. Our results demonstrate a versatile quantum digital approach for simulating non-Abelian anyons, offering a new lens into the study of such peculiar quasiparticles.