The Existence of Concatenated Codes List-Decodable up to the Hamming Bound

It is proven that binary linear concatenated codes with an outer algebraic code (specifically, a folded Reed-Solomon code) and independently and randomly chosen linear inner codes achieve, with high probability, the optimal tradeoff between rate and list-decoding radius. In particular, for any 0 <; ρ <; 1/2 and ε > 0, there exist concatenated codes of rate at least 1-H(ρ)-ε that are (combinatorially) list-decodable up to a fraction of errors. (The Hamming bound states that the best possible rate for such codes cannot exceed 1-H(ρ), and standard random coding arguments show that this bound is approached by random codes with high probability.) A similar result, with better list size guarantees, holds when the outer code is also randomly chosen. The methods and results extend to the case when the alphabet size is any fixed prime power q ≥ 2.

[1]  A. Rudra,et al.  List decoding and property testing of error-correcting codes , 2007 .

[2]  Venkatesan Guruswami,et al.  Better Binary List Decodable Codes Via Multilevel Concatenation , 2007, IEEE Transactions on Information Theory.

[3]  G. David Forney,et al.  Concatenated codes , 2009, Scholarpedia.

[4]  Venkatesan Guruswami,et al.  Combinatorial bounds for list decoding , 2002, IEEE Trans. Inf. Theory.

[5]  Venkatesan Guruswami,et al.  Explicit Codes Achieving List Decoding Capacity: Error-Correction With Optimal Redundancy , 2005, IEEE Transactions on Information Theory.

[6]  Venkatesan Guruswami,et al.  Limits to List Decoding Reed-Solomon Codes , 2006, IEEE Trans. Inf. Theory.

[7]  O. Antoine,et al.  Theory of Error-correcting Codes , 2022 .

[8]  Venkatesan Guruswami,et al.  List decoding of error correcting codes , 2001 .

[9]  Venkatesan Guruswami,et al.  List Decoding of Error-Correcting Codes (Winning Thesis of the 2002 ACM Doctoral Dissertation Competition) , 2005, Lecture Notes in Computer Science.

[10]  Jørn Justesen,et al.  Class of constructive asymptotically good algebraic codes , 1972, IEEE Trans. Inf. Theory.

[11]  Daniel A. Spielman,et al.  Expander codes , 1994, Proceedings 35th Annual Symposium on Foundations of Computer Science.

[12]  Peter Elias,et al.  Error-correcting codes for list decoding , 1991, IEEE Trans. Inf. Theory.

[13]  Venkatesan Guruswami,et al.  Expander-based constructions of efficiently decodable codes , 2001, Proceedings 2001 IEEE International Conference on Cluster Computing.

[14]  Venkatesan Guruswami,et al.  On the List-Decodability of Random Linear Codes , 2010, IEEE Transactions on Information Theory.

[15]  Christian Thommesen The existence of binary linear concatenated codes with Reed - Solomon outer codes which asymptotically meet the Gilbert- Varshamov bound , 1983, IEEE Trans. Inf. Theory.

[16]  Christian Thommesen,et al.  Error-correcting capabilities of concatenated codes with MDS outer codes on memoryless channels with maximum- likelihood decoding , 1987, IEEE Trans. Inf. Theory.