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Sample optimal tomography of quantum Markov chains

Quantum Physics 2025-07-15 v1

Abstract

A state on a tripartite quantum system HAHBHC\mathcal{H}_{A}\otimes \mathcal{H}_{B}\otimes\mathcal{H}_{C} forms a Markov chain, i.e., quantum conditional independence, if it can be reconstructed from its marginal on HAHB\mathcal{H}_{A}\otimes \mathcal{H}_{B} by a quantum operation from HB\mathcal{H}_{B} to HBHC\mathcal{H}_{B}\otimes\mathcal{H}_{C} via the famous Petz map: a quantum Markov chain ρABC\rho_{ABC} satisfies ρABC=ρBC1/2(ρB1/2ρABρB1/2idC)ρBC1/2\rho_{ABC}=\rho_{BC}^{1/2}(\rho_B^{-1/2}\rho_{AB}\rho_B^{-1/2}\otimes id_C)\rho_{BC}^{1/2}. In this paper, we study the robustness of the Petz map for different metrics, i.e., the closeness of marginals implies the closeness of the Petz map outcomes. The robustness results are dimension-independent for infidelity δ\delta and trace distance ϵ\epsilon. The applications of robustness results are The sample complexity of quantum Markov chain tomography, i.e., how many copies of an unknown quantum Markov chain are necessary and sufficient to determine the state, is Θ~((dA2+dC2)dB2δ)\tilde{\Theta}(\frac{(d_A^2+d_C^2)d_B^2}{\delta}), and Θ~((dA2+dC2)dB2ϵ2)\tilde{\Theta}(\frac{(d_A^2+d_C^2)d_B^2}{\epsilon^2}) . The sample complexity of quantum Markov Chain certification, i.e., to certify whether a tripartite state equals a fixed given quantum Markov Chain σABC\sigma_{ABC} or at least δ\delta-far from σABC\sigma_{ABC}, is Θ((dA+dC)dBδ){\Theta}(\frac{(d_A+d_C)d_B}{\delta}), and Θ((dA+dC)dBϵ2){\Theta}(\frac{(d_A+d_C)d_B}{\epsilon^2}). O~(min{dAdB3dC3,dA3dB3dC}ϵ2)\tilde{O}(\frac{\min\{d_Ad_B^3d_C^3,d_A^3d_B^3d_C\}}{\epsilon^2}) copies to test whether ρABC\rho_{ABC} is a quantum Markov Chain or ϵ\epsilon-far from its Petz recovery state. We generalized the tomography results into multipartite quantum system by showing O~(n2maxi{di2di+12}δ)\tilde{O}(\frac{n^2\max_{i} \{d_i^2d_{i+1}^2\}}{\delta}) copies for infidelity δ\delta are enough for nn-partite quantum Markov chain tomography with did_i being the dimension of the ii-th subsystem.

Cite

@article{arxiv.2209.02240,
  title  = {Sample optimal tomography of quantum Markov chains},
  author = {Li Gao and Nengkun Yu},
  journal= {arXiv preprint arXiv:2209.02240},
  year   = {2025}
}

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R2 v1 2026-06-28T00:46:28.264Z