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Error Exponents for Quantum Packing Problems via An Operator Layer Cake Theorem

Quantum Physics 2025-09-25 v3 Information Theory Mathematical Physics Functional Analysis math.IT math.MP

Abstract

In this work, we prove a one-shot random coding bound for classical-quantum channel coding, a problem conjectured by Burnashev and Holevo in 1998. By choosing the optimal input distribution, the bound implies the optimal error exponent (i.e., the reliability function) of classical-quantum channels for rates above the critical rate, even in infinite-dimensional Hilbert spaces. Our result extends to various quantum packing-type problems, including classical communication over any fully quantum channel with or without entanglement-assistance, constant composition codes, and classical data compression with quantum side information via fixed-length or variable-length coding. Our technical ingredient is to establish an operator layer cake theorem - the directional derivative of an operator logarithm admits an integral representation of certain projections. This shows that a kind of pretty-good measurement is equivalent to a randomized Holevo-Helstrom measurement, which provides an operational explanation of why the pretty-good measurement is pretty good.

Keywords

Cite

@article{arxiv.2507.06232,
  title  = {Error Exponents for Quantum Packing Problems via An Operator Layer Cake Theorem},
  author = {Hao-Chung Cheng and Po-Chieh Liu},
  journal= {arXiv preprint arXiv:2507.06232},
  year   = {2025}
}

Comments

v3: new added {\S}3.1: Extension to Infinite Dimensions; v2: tables and references added

R2 v1 2026-07-01T03:52:06.794Z