Randomly Punctured Reed-Solomon Codes Achieve the List Decoding Capacity over Polynomial-Size Alphabets

April 03, 2023 Β· Declared Dead Β· πŸ› IEEE Annual Symposium on Foundations of Computer Science

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Authors Zeyu Guo, Zihan Zhang arXiv ID 2304.01403 Category cs.IT: Information Theory Cross-listed cs.DS, math.CO Citations 38 Venue IEEE Annual Symposium on Foundations of Computer Science Last Checked 3 months ago
Abstract
This paper shows that, with high probability, randomly punctured Reed-Solomon codes over fields of polynomial size achieve the list decoding capacity. More specifically, we prove that for any $Ξ΅>0$ and $R\in (0,1)$, with high probability, randomly punctured Reed-Solomon codes of block length $n$ and rate $R$ are $\left(1-R-Ξ΅, O({1}/Ξ΅)\right)$ list decodable over alphabets of size at least $2^{\mathrm{poly}(1/Ξ΅)}n^2$. This extends the recent breakthrough of Brakensiek, Gopi, and Makam (STOC 2023) that randomly punctured Reed-Solomon codes over fields of exponential size attain the generalized Singleton bound of Shangguan and Tamo (STOC 2020).
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