Konsep Inti
Linear codes achieving list-decoding capacity also achieve capacity on the q-ary symmetric channel if they have sufficiently large minimum distance.
Abstrak
Bibliographic Information:
Pernice, F., Sprumont, O., & Wootters, M. (2024). List-Decoding Capacity Implies Capacity on the q-ary Symmetric Channel. arXiv:2410.20020v1 [cs.IT].
Research Objective:
This paper investigates the relationship between list-decoding capacity and the capacity of the q-ary symmetric channel (qSC). The authors aim to demonstrate a formal connection between these two concepts by proving that list-decodable codes with sufficiently large minimum distance can also achieve capacity on the qSC.
Methodology:
The authors utilize tools from coding theory and probability theory, including:
- Analysis of maximum-likelihood decoding on the qSC.
- Generalization of Russo's Lemma and Talagrand's inequality to finite fields of arbitrary size.
- Derivation of an isoperimetric inequality to relate the expectation of a function indicating successful decoding to the minimum distance of the code.
Key Findings:
- The paper proves that any linear code achieving list-decoding capacity also achieves capacity on the qSC if its minimum distance is sufficiently large.
- The authors provide a weaker but more interpretable version of the main theorem, stating that a (p, L)-list-decodable code with a minimum distance exceeding a certain threshold can be used for reliable communication on the qSC with a slightly smaller noise parameter.
- The paper demonstrates that the requirement for a large minimum distance cannot be completely disregarded, as there exist codes with constant minimum distance that achieve list-decoding capacity but not qSC capacity.
Main Conclusions:
The research establishes a formal connection between list-decoding capacity and the capacity of the qSC, demonstrating that list-decodability with a large minimum distance is a stronger property. This result provides a theoretical link between worst-case and average-case error models in coding theory.
Significance:
This work contributes to the understanding of the fundamental limits of reliable communication over noisy channels. It also sheds light on the relationship between different error models and decoding paradigms in coding theory.
Limitations and Future Research:
- The converse of the main theorem, whether qSC capacity implies list-decoding capacity under certain conditions, remains an open problem.
- Investigating the tightness of the minimum distance requirement and exploring potential improvements is an interesting direction for future research.
- Extending the results to other channel models and exploring the implications for practical code constructions are promising avenues for further investigation.