Title :
A lifting decoding scheme and its application to interleaved linear codes
Author :
Quintin, Guillaume
Author_Institution :
Lab. d´´Inf. de l´´X (LIX), Ecole Polytech., Palaiseau, France
Abstract :
In this paper we design a decoding algorithm based on a lifting decoding scheme. This leads to a unique decoding algorithm with complexity quasi linear in all the parameters for Reed-Solomon codes over Galois rings and a list decoding algorithm. We show that, using erasures in our algorithms, allows one to decode more errors than half the minimum distance with a high probability. Finally we apply these techniques to interleaved linear codes over a finite field and obtain a decoding algorithm that can recover more errors than half the minimum distance.
Keywords :
Galois fields; Reed-Solomon codes; communication complexity; decoding; interleaved codes; linear codes; probability; Galois rings; Reed-Solomon codes; error decoding; finite field; interleaved linear codes; lifting decoding scheme; quasilinear complexity; unique decoding algorithm; Algorithm design and analysis; Complexity theory; Decoding; Interleaved codes; Linear code; Reed-Solomon codes; Vectors; Algorithm design and analysis; Decoding; Error correction; Interleaved codes; Reed-Solomon codes;
Conference_Titel :
Information Theory Proceedings (ISIT), 2012 IEEE International Symposium on
Conference_Location :
Cambridge, MA
Print_ISBN :
978-1-4673-2580-6
Electronic_ISBN :
2157-8095
DOI :
10.1109/ISIT.2012.6284707
