Abstract

There has been a great deal of work establishing that random linear codes are as list-decodable as uniformly random codes, in the sense that a random linear binary code of rate $1 - {H}(\text {p}) - \epsilon $ is $( {p},\text {O}(1/\epsilon))$ -list-decodable with high probability. In this work, we show that such codes are $( {p}, {H}( {p})/\epsilon + 2)$ -list-decodable with high probability, for any $ {p} \in (0, 1/2)$ and $\epsilon > 0$ . In addition to improving the constant in known list-size bounds, our argument—which is quite simple—works simultaneously for all values of p, while previous works obtaining $ {L} = \text {O}(1/\epsilon)$ patched together different arguments to cover different parameter regimes. Our approach is to strengthen an existential argument of (Guruswami, Hastad, Sudan and Zuckerman, IEEE Trans. IT, 2002) to hold with high probability. To complement our upper bound for random linear codes, we also improve an argument of (Guruswami, Narayanan, IEEE Trans. IT, 2014) to obtain an essentially tight lower bound of $1/\epsilon $ on the list size of uniformly random codes; this implies that random linear codes are in fact more list-decodable than uniformly random codes, in the sense that the list sizes are strictly smaller. To demonstrate the applicability of these techniques, we use them to (a) obtain more information about the distribution of list sizes of random linear codes and (b) to prove a similar result for random linear rank-metric codes.

Highlights

  • An error correcting code is a subset C ⊆ Fn2, which is ideally “spread out.” In this paper, we focus on one notion of “spread out” known as list-decodability

  • By applying the techniques in the proof of Theorem 5, we prove the following upper bound on the list size of random linear binary rank-metric codes

  • Our analysis works for all values of p, and obtains improved bounds on the list size as the rate approaches list-decoding capacity

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Summary

Introduction

An error correcting code is a subset C ⊆ Fn2 , which is ideally “spread out.” In this paper, we focus on one notion of “spread out” known as list-decodability. Because it is a major open problem to construct explicit binary codes of rate 1 − H(p) − ε with constant (or even poly(n)) list-sizes, one natural line of work has been to study structured random approaches, in particular random linear codes. To complement our upper bound, we strengthen an argument of Guruswami and Narayanan [15] to show that a uniformly random binary code of rate 1 − H(p) − ε requires L ≥ (1 − γ)/ε for any constant γ > 0 and sufficiently small ε. Our approach establishes that random linear binary rank-metric codes are more list-decodable than their uniformly random counterparts in certain parameter regimes, in the sense that the list sizes near capacity are strictly smaller. We show that low-rate random linear binary rank-metric codes are list-decodable to capacity, answering a question of [16]. It would be very interesting to extend our results to these settings

Outline of paper
Notation
Previous Work and Our Results
Prior work: uniformly random and random linear codes
Our main results: random linear codes
Our results: uniformly random codes
Prior work: rank metric codes
Our results: rank metric codes
Simplified result for random linear binary codes
Proof of Theorem 5
Conclusion
A Characterizing the list size distribution

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