Paper Info
Title
Efficient representation of binary nonlinear codes: constructions and minimum distance computation
Abstract
A binary nonlinear code can be represented as a union of cosets of a binary linear subcode. In this paper, the complexity of some algorithms to obtain this representation is analyzed. Moreover, some properties and constructions of new codes from given ones in terms of this representation are described. Algorithms to compute the minimum distance of binary nonlinear codes, based on known algorithms for linear codes, are also established, along with an algorithm to decode such codes. All results are written in such a way that they can be easily transformed into algorithms, and the performance of these algorithms is evaluated.
Year
DOI
Venue
2015
10.1007/s10623-014-0028-4
Des. Codes Cryptography
Keywords
Field
DocType
Nonlinear code,Kernel,Minimum distance,Minimum weight,Decoding,Algorithms,94B60,94B25,94B35
Discrete mathematics,Concatenated error correction code,Combinatorics,Nonlinear system,Block code,Expander code,Minimum weight,Linear code,Decoding methods,Mathematics,Binary number
Journal
Volume
Issue
ISSN
76
1
0925-1022
Citations 
PageRank 
References 
5
0.69
13
Authors
3
Name
Order
Citations
PageRank
Mercè Villanueva111018.45
Fanxuan Zeng250.69
Jaume Pujol314123.76