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Tight Bounds on the Convergence of Noisy Random Circuits to the Uniform Distribution

Abhinav Deshpande, Pradeep Niroula, Oles Shtanko, Alexey V. Gorshkov, Bill Fefferman, Michael J. Gullans

2022PRX Quantum47 citationsDOIOpen Access PDF

Abstract

We study the properties of output distributions of noisy random circuits. We obtain upper and lower bounds on the expected distance of the output distribution from the "useless" uniform distribution. These bounds are tight with respect to the dependence on circuit depth. Our proof techniques also allow us to make statements about the presence or absence of anticoncentration for both noisy and noiseless circuits. We uncover a number of interesting consequences for hardness proofs of sampling schemes that aim to show a quantum computational advantage over classical computation. Specifically, we discuss recent barrier results for depth-agnostic and/or noise-agnostic proof techniques. We show that in certain depth regimes, noise-agnostic proof techniques might still work in order to prove an often-conjectured claim in the literature on quantum computational advantage, contrary to what has been thought prior to this work.

Topics & Concepts

Mathematical proofComputer scienceNoise (video)Theoretical computer scienceDistribution (mathematics)LicenseAlgorithmDiscrete mathematicsMathematicsArtificial intelligenceMathematical analysisImage (mathematics)Operating systemGeometryQuantum Computing Algorithms and ArchitectureComputability, Logic, AI AlgorithmsQuantum Information and Cryptography
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