English

Polar Codes for Arbitrary Classical-Quantum Channels and Arbitrary cq-MACs

Information Theory 2018-11-26 v1 math.IT Quantum Physics

Abstract

We prove polarization theorems for arbitrary classical-quantum (cq) channels. The input alphabet is endowed with an arbitrary Abelian group operation and an Ar{\i}kan-style transformation is applied using this operation. It is shown that as the number of polarization steps becomes large, the synthetic cq-channels polarize to deterministic homomorphism channels which project their input to a quotient group of the input alphabet. This result is used to construct polar codes for arbitrary cq-channels and arbitrary classical-quantum multiple access channels (cq-MAC). The encoder can be implemented in O(NlogN)O(N\log N) operations, where NN is the blocklength of the code. A quantum successive cancellation decoder for the constructed codes is proposed. It is shown that the probability of error of this decoder decays faster than 2Nβ2^{-N^{\beta}} for any β<12\beta<\frac{1}{2}.

Keywords

Cite

@article{arxiv.1701.03397,
  title  = {Polar Codes for Arbitrary Classical-Quantum Channels and Arbitrary cq-MACs},
  author = {Rajai Nasser and Joseph M. Renes},
  journal= {arXiv preprint arXiv:1701.03397},
  year   = {2018}
}

Comments

30 pages. Submitted to IEEE Trans. Inform. Theory and in part to ISIT2017

R2 v1 2026-06-22T17:48:48.836Z