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Quantum computing with rotation-symmetric bosonic codes

Arne Grimsmo (20066700), Joshua Combes (17490960), Ben Baragiola (18028297)

2020Queensland's institutional digital repository (The University of Queensland)137 citations

Abstract

Bosonic rotation codes, introduced here, are a broad class of bosonic error-correcting codes based on phase-space rotation symmetry. We present a universal quantum computing scheme applicable to a subset of this class-number-phase codes-which includes the well-known cat and binomial codes, among many others. The entangling gate in our scheme is code agnostic and can be used to interface different rotation-symmetric encodings. In addition to a universal set of operations, we propose a teleportation-based error-correction scheme that allows recoveries to be tracked entirely in software. Focusing on cat and binomial codes as examples, we compute average gate fidelities for error correction under simultaneous loss and dephasing noise and show numerically that the error-correction scheme is close to optimal for error-free ancillae and ideal measurements. Finally, we present a scheme for fault-tolerant, universal quantum computing based on the concatenation of number-phase codes and Bacon-Shor subsystem codes.

Topics & Concepts

Computer scienceQuantum computerQuantum error correctionQuantumBosonRotation (mathematics)AlgorithmQuantum mechanicsTheoretical computer sciencePhysicsArtificial intelligenceQuantum Information and CryptographyQuantum Computing Algorithms and ArchitectureQuantum and electron transport phenomena
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