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Sample-Optimal Quantum Process Tomography with Non-Adaptive Incoherent Measurements

Quantum Physics 2024-01-31 v1

Abstract

How many copies of a quantum process are necessary and sufficient to construct an approximate classical description of it? We extend the result of Surawy-Stepney, Kahn, Kueng, and Guta (2022) to show that O~(din3dout3/ε2)\tilde{\mathcal{O}}(d_{\text{in}}^3d_{\text{out}}^3/\varepsilon^2) copies are sufficient to learn any quantum channel Cdin×dinCdout×doutC^{d_{\text{in}}\times d_{\text{in}}} \rightarrow C^{d_{\text{out}}\times d_{\text{out}}} to within ε\varepsilon in diamond norm. Moreover, we show that Ω(din3dout3/ε2)\Omega(d_{\text{in}}^3 d_{\text{out}}^3/\varepsilon^2) copies are necessary for any strategy using incoherent non-adaptive measurements. This lower bound applies even for ancilla-assisted strategies.

Cite

@article{arxiv.2301.12925,
  title  = {Sample-Optimal Quantum Process Tomography with Non-Adaptive Incoherent Measurements},
  author = {Aadil Oufkir},
  journal= {arXiv preprint arXiv:2301.12925},
  year   = {2024}
}
R2 v1 2026-06-28T08:26:47.220Z