Title :
On binary 1-perfect additive codes: some structural properties
Author :
Phelps, Kevin T. ; Rifá, Josep
Author_Institution :
Dept. of Discrete & Stat. Sci., Auburn Univ., AL, USA
fDate :
9/1/2002 12:00:00 AM
Abstract :
The rank and kernel of 1-perfect additive codes is determined. Additive codes could be seen as translation-invariant propelinear codes and, in this correspondence, a characterization of propelinear codes as codes having a regular subgroup of the full group of isometrics of the code is established. A characterization of the automorphism group of a 1-perfect additive code is given and also the cardinality of this group is computed. Finally, an efficiently computable characterization of the Steiner triple systems associated with a 1-perfect binary additive code is also established.
Keywords :
binary codes; 1-perfect binary additive code; Steiner triple systems; automorphism group; binary 1-perfect additive codes; cardinality; computable characterization; isometrics; kernel; rank; structural properties; subgroup; translation-invariant propelinear codes; Additives; Binary codes; Error correction codes; Kernel; Linear code; Propulsion; Vectors;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2002.801474
