Abstract
One of the primary objectives in the field of quantum state learning is to develop algorithms that are time-efficient for learning states generated from quantum circuits. Earlier investigations have demonstrated time-efficient algorithms for states generated from Clifford circuits with at most log(n) non-Clifford gates. However, these algorithms necessitate multi-copy measurements, posing implementation challenges in the near term due to the requisite quantum memory. On the contrary, using solely single-qubit measurements in the computational basis is insufficient in learning even the output distribution of a Clifford circuit with one additional T gate under reasonable post-quantum cryptographic assumptions. In this work, we introduce an efficient quantum algorithm that employs only single-copy measurements to learn states produced by Clifford circuits with a maximum of O(log(n)) non-Clifford gates, filling a gap between the previous positive and negative results.
Original language | English |
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Journal | Quantum |
Volume | 8 |
DOIs | |
State | Published - 2024 |