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Shadow tomography based on informationally complete positive operator-valued measure

Atithi Acharya, Siddhartha Saha, Anirvan M. Sengupta

2021Physical review. A/Physical review, A42 citationsDOI

Abstract

Recently introduced shadow tomography protocols use ``classical shadows'' of quantum states to predict many target functions of an unknown quantum state. Unlike full quantum state tomography, shadow tomography does not insist on accurate recovery of the density matrix for high rank mixed states. Yet, such a protocol makes multiple accurate predictions with high confidence, based on a moderate number of quantum measurements. One particular influential algorithm, proposed by Huang et al. [Huang, Kueng, and Preskill, Nat. Phys. 16, 1050 (2020)], requires additional circuits for performing certain random unitary transformations. In this paper, we avoid these transformations but employ an arbitrary informationally complete positive operator-valued measure and show that such a procedure can compute $k$-bit correlation functions for quantum states reliably. We also show that, for this application, we do not need the median of means procedure of Huang et al. Finally, we discuss the contrast between the computation of correlation functions and fidelity of reconstruction of low rank density matrices.

Topics & Concepts

Quantum tomographyOperator (biology)Shadow (psychology)Quantum stateMeasure (data warehouse)Density matrixAlgorithmComputer scienceRank (graph theory)POVMTomographyQuantumUnitary operatorQuantum computerUnitary stateMathematicsQuantum processQuantum mechanicsPure mathematicsHilbert spacePhysicsData miningCombinatoricsQuantum dynamicsBiochemistryRepressorPsychotherapistOpticsPsychologyChemistryLawPolitical scienceGeneTranscription factorQuantum Computing Algorithms and ArchitectureQuantum Information and CryptographyQuantum many-body systems
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