Optimal Two-Dimensional Reed–Solomon Codes Correcting Insertions and Deletions

Roni Con; Amir Shpilka; Itzhak Tamo

doi:10.1109/TIT.2024.3387848

Optimal Two-Dimensional Reed–Solomon Codes Correcting Insertions and Deletions

Roni Con, Amir Shpilka, Itzhak Tamo

Tel Aviv University

Research output: Contribution to journal › Article › peer-review

Abstract

Constructing Reed–Solomon (RS) codes that can correct insertions and deletions (insdel errors) has been considered in numerous recent works. Our focus in this paper is on the special case of two-dimensional RS-codes that can correct from n − 3 insdel errors, the maximal possible number of insdel errors a two-dimensional linear code can recover from. It is known that an [n, 2]q RS-code that can correct from n − 3 insdel errors satisfies that q = Ω(n³). On the other hand, there are several known constructions of [n, 2]q RS-codes that can correct from n − 3 insdel errors, where the smallest field size is q = O(n⁴). In this short paper, we construct [n, 2]q Reed–Solomon codes that can correct n − 3 insdel errors with q = O(n³), thereby resolving the minimum field size needed for such codes.

Original language	English
Article number	10497143
Pages (from-to)	5012-5016
Number of pages	5
Journal	IEEE Transactions on Information Theory
Volume	70
Issue number	7
DOIs	https://doi.org/10.1109/TIT.2024.3387848
State	Published - 1 Jul 2024

Keywords

Codes
Error correction codes
Linear codes
Reed-Solomon (RS) codes
Reed-Solomon codes
Symbols
Synchronization
Upper bound
Vectors
deletions
insertions

All Science Journal Classification (ASJC) codes

Information Systems
Computer Science Applications
Library and Information Sciences

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10.1109/TIT.2024.3387848

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title = "Optimal Two-Dimensional Reed–Solomon Codes Correcting Insertions and Deletions",

abstract = "Constructing Reed–Solomon (RS) codes that can correct insertions and deletions (insdel errors) has been considered in numerous recent works. Our focus in this paper is on the special case of two-dimensional RS-codes that can correct from n − 3 insdel errors, the maximal possible number of insdel errors a two-dimensional linear code can recover from. It is known that an [n, 2]q RS-code that can correct from n − 3 insdel errors satisfies that q = Ω(n3). On the other hand, there are several known constructions of [n, 2]q RS-codes that can correct from n − 3 insdel errors, where the smallest field size is q = O(n4). In this short paper, we construct [n, 2]q Reed–Solomon codes that can correct n − 3 insdel errors with q = O(n3), thereby resolving the minimum field size needed for such codes.",

keywords = "Codes, Error correction codes, Linear codes, Reed-Solomon (RS) codes, Reed-Solomon codes, Symbols, Synchronization, Upper bound, Vectors, deletions, insertions",

author = "Roni Con and Amir Shpilka and Itzhak Tamo",

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AU - Shpilka, Amir

AU - Tamo, Itzhak

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Y1 - 2024/7/1

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AB - Constructing Reed–Solomon (RS) codes that can correct insertions and deletions (insdel errors) has been considered in numerous recent works. Our focus in this paper is on the special case of two-dimensional RS-codes that can correct from n − 3 insdel errors, the maximal possible number of insdel errors a two-dimensional linear code can recover from. It is known that an [n, 2]q RS-code that can correct from n − 3 insdel errors satisfies that q = Ω(n3). On the other hand, there are several known constructions of [n, 2]q RS-codes that can correct from n − 3 insdel errors, where the smallest field size is q = O(n4). In this short paper, we construct [n, 2]q Reed–Solomon codes that can correct n − 3 insdel errors with q = O(n3), thereby resolving the minimum field size needed for such codes.

KW - Codes

KW - Error correction codes

KW - Linear codes

KW - Reed-Solomon (RS) codes

KW - Reed-Solomon codes

KW - Symbols

KW - Synchronization

KW - Upper bound

KW - Vectors

KW - deletions

KW - insertions

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JF - IEEE Transactions on Information Theory

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ER -

Optimal Two-Dimensional Reed–Solomon Codes Correcting Insertions and Deletions

Abstract

Keywords

All Science Journal Classification (ASJC) codes

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