English

Signature Codes for a Noisy Adder Multiple Access Channel

Information Theory 2022-07-26 v2 math.IT

Abstract

In this work, we consider qq-ary signature codes of length kk and size nn for a noisy adder multiple access channel. A signature code in this model has the property that any subset of codewords can be uniquely reconstructed based on any vector that is obtained from the sum (over integers) of these codewords. We show that there exists an algorithm to construct a signature code of length k=2nlog3(12τ)(logn+(q1)logπ2)+O(nlogn(q+logn))k = \frac{2n\log{3}}{(1-2\tau)\left(\log{n} + (q-1)\log{\frac{\pi}{2}}\right)} +\mathcal{O}\left(\frac{n}{\log{n}(q+\log{n})}\right) capable of correcting τk\tau k errors at the channel output, where 0τ<q12q0\le \tau < \frac{q-1}{2q}. Furthermore, we present an explicit construction of signature codewords with polynomial complexity being able to correct up to (q18qϵ)k\left( \frac{q-1}{8q} - \epsilon\right)k errors for a codeword length k=O(nloglogn)k = \mathcal{O} \left ( \frac{n}{\log \log n} \right ), where ϵ\epsilon is a small non-negative number. Moreover, we prove several non-existence results (converse bounds) for qq-ary signature codes enabling error correction.

Cite

@article{arxiv.2206.10735,
  title  = {Signature Codes for a Noisy Adder Multiple Access Channel},
  author = {Gökberk Erdoğan and Georg Maringer and Nikita Polyanskii},
  journal= {arXiv preprint arXiv:2206.10735},
  year   = {2022}
}

Comments

12 pages, 0 figures, submitted to 2022 IEEE Information Theory Workshop

R2 v1 2026-06-24T11:59:16.951Z