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Testing and Learning Quantum Juntas Nearly Optimally

Thomas Chen, Shivam Nadimpalli, Henry Yuen

2023Society for Industrial and Applied Mathematics eBooks19 citationsDOI

Abstract

We consider the problem of testing and learning quantum k-juntas: n-qubit unitary matrices which act non-trivially on just k of the n qubits and as the identity on the rest. As our main algorithmic results, we give 1. A -query quantum algorithm that can distinguish quantum k-juntas from unitary matrices that are “far” from every quantum k-junta; and 2. A O(4k)-query algorithm to learn quantum k-juntas. We complement our upper bounds for testing and learning quantum k-juntas with near-matching lower bounds of and Ω(4k/k), respectively. Our techniques are Fourier-analytic and make use of a notion of influence of qubits on unitaries. * The full version of the paper can be accessed at https://arxiv.org/abs/2207.05898

Topics & Concepts

Quantum Fourier transformQubitComplement (music)QuantumUnitary stateQuantum algorithmDiscrete mathematicsComputer scienceAlgorithmUpper and lower boundsQuantum mechanicsMathematicsPhysicsTheoretical computer scienceQuantum error correctionMathematical analysisChemistryLawComplementationPolitical scienceGeneBiochemistryPhenotypeQuantum Computing Algorithms and ArchitectureMachine Learning and AlgorithmsComplexity and Algorithms in Graphs
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