Science - USA (2021-12-03)

gate errors, suggesting that continued efforts
are needed to decrease the cycle duration and
improve coherence.

Discussion

Our shallow quantum circuits for realizing
toric code eigenstates and simulating braiding
statistics can be extended to other topologi-
cally ordered states, including string-nets with
non-Abelian anyons ( 40 , 41 ). The quasi-static
protocol that uses controlled Pauli strings to
simulate braiding can be generalized to dy-
namical adiabatic braiding ( 42 ) by using deeper
circuits in future devices. Moreover, the tools
we developed can be readily applied to a wide
class of topologically ordered states generated
on quantum processors. By encoding quan-
tum information in the degenerate ground-
state manifold of the toric code, we provide a

method for studying coherence properties of

logical qubit states. This method could be used

to identify and mitigate noise correlations in

the system, with critical implications for future

error-correction experiments.

Note added in proof: A contemporary work by

G. Semeghiniet al.( 43 ) studies topological spin

liquid states on a Rydberg quantum simulator.

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ACKNOWLEDGMENTS

We thank B. Bauer, A. Elben, B. Vermersch, and G. Vidal for useful

discussions.Funding:F.P., Y.-J.L., A.S., and M.K. acknowledge

support from the Technical University of Munich–Institute for

Advanced Study, funded by the German Excellence Initiative and

the European Union FP7 under grant agreement 291763; the

Max Planck Gesellschaft (MPG) through the International Max

Planck Research School for Quantum Science and Technology

(IMPRS-QST); the Deutsche Forschungsgemeinschaft (DFG;

German Research Foundation) under Germany’s Excellence

Strategy–EXC– 2111 – 390814868, TRR80, and DFG grant KN1254/

2-1; and from the European Research Council (ERC) under the

European Union’s Horizon 2020 research and innovation program

(grant agreements 771537 and 851161). A.S. was supported by a

Research Fellowship from the Royal Commission for the Exhibition

of 1851. C.K. was supported by the Walter Burke Institute for

Theoretical Physics at Caltech, and by the IQIM, an NSF Frontier

center funded by the Gordon and Betty Moore Foundation, the

Packard Foundation, and the Simons Foundation.Author

contributions:A.S., M.K., F.P., K.J.S., Y.-J.L., C.K., and P.R.

designed the experiment. K.J.S. and P.R. performed the

experiment. K.J.S. and Y.-J.L. analyzed the data and wrote the

supplement. Y.-J.L., A.S., C.K., M.K., F.P., and K.J.S. provided

theoretical support and analysis. C.K., K.JS., Y.-J.L., A.S., M.K., F.P.,

and P.R. wrote the manuscript. All authors contributed to revising

the manuscript and supplement. All authors contributed to the

experimental and theoretical infrastructure to enable the

experiment.Competing interests:The authors declare no

competing interests.Data and materials availability:Data and

code used for analysis and simulation are available at ( 44 ).

SUPPLEMENTARY MATERIALS

science.org/doi/10.1126/science.abi8378

Supplementary Text

Figs. S1 to S25

References ( 45 – 63 )

2 April 2021; accepted 28 October 2021

10.1126/science.abi8378

SCIENCEscience.org 3 DECEMBER 2021¥VOL 374 ISSUE 6572 1241

Fig. 4. Surface code logical qubit states.(A) Measured parity values for surface code logical qubit

statesj i¼TL j iþ (^0) L eip=^4 ji (^1) L=
ffiffiffi
2
p
on 5-by-5 and 3-by-3 qubit arrays. Logical operatorsZLandXLspan
across each array. (B) Logical measurement with error correction. We measured a 25-qubit bitstring inXor
Zbasis and evaluated the local parities of the same basis. Negative parities indicate an error. We flipped the
circled qubits to restore positive parities. (C) Experimental logical qubit tomography immediately after
state injection for 128 states (sweeping the initial state of the center qubitaji 0 þbji 1 ), plotted in the
Bloch sphere (5 by 5). The ideal states lie on five planes:x= 0 (yellow),y= 0 (purple),z¼ 1 =
ffiffiffi
2
p
(red),z=0
(blue), andz¼ 1 =
ffiffiffi
2
p
(green). Mean Bloch vector length, 0.6 ± 0.1 (1s). (D) We prepared logical states,
waited for a timet, and then performed a logical measurement. We compared logical measurements
for 1jiL (red) andjiþL (purple), for both 5-by-5 (5-sided markers) and 3-by-3 (3-sided markers) states.
Stars indicate raw measurements. Open symbols indicate corrected measurements. Solid symbols indicate
corrected measurements with dynamical decoupling during the wait time (jiþL only). Each logical
measurement used 10^4 repetitions.
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