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Implementing fault-tolerant non-Clifford gates using the [[8,3,2]] color code

Daniel Honciuc Menendez, Annie Ray, Michael Vasmer

2024Physical review. A/Physical review, A11 citationsDOI

Abstract

Quantum computers promise to solve problems that are intractable for classical computers, but qubits are vulnerable to many sources of error, limiting the depth of the circuits that can be reliably executed on today's quantum hardware. Quantum error correction has been proposed as a solution to this problem, whereby quantum information is protected by encoding it into a quantum error-correcting code. But protecting quantum information is not enough, we must also process the information using logic gates that are robust to faults that occur during their execution. One method for processing information fault-tolerantly is to use quantum error-correcting codes that have logical gates with a tensor product structure (transversal gates), making them naturally fault-tolerant. Here, we test the performance of a code with such transversal gates, the [[8,3,2]] color code, using trapped-ion and superconducting hardware. We observe improved performance (compared to no encoding) for encoded circuits implementing non-Clifford gates, a class of gates that are essential for achieving universal quantum computing. In particular, we find improved performance for an encoded circuit implementing the controlled-controlled-$Z$ gate, a key gate in Shor's algorithm. Our results illustrate the potential of using codes with transversal gates to implement nontrivial algorithms on near-term quantum hardware.

Topics & Concepts

Computer scienceCode (set theory)Parallel computingProgramming languageArithmeticReliability engineeringEmbedded systemMathematicsEngineeringSet (abstract data type)Quantum Computing Algorithms and ArchitectureQuantum-Dot Cellular AutomataQuantum Information and Cryptography
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