Title :
On the [24, 12, 10] quaternary code and binary codes with an automorphism having two cycles
Author :
Huffman, W. Cary
Author_Institution :
Dept. of Math. Sci., Loyola Univ., Chicago, IL, USA
fDate :
5/1/1988 12:00:00 AM
Abstract :
A general decomposition theorem is given for codes over finite fields which have an automorphism of a given type. Such codes can be decomposed as direct sums of subcodes which may be viewed as shorter length codes over extension fields. If such a code is self-dual, sometimes the subcodes are also. This decomposition is applied to prove that the self-dual [24, 12, 10] quaternary code has no automorphism of order 3. This decomposition is also applied to count the number of equivalent [2r, r] and [2r+2r+1] self-dual binary codes with an automorphism of prime order r
Keywords :
error correction codes; [24, 12, 10] quaternary code; automorphism; binary codes; extension fields; finite fields; general decomposition theorem; self-dual code; shorter length codes; subcodes; Binary codes; Galois fields; Linear code; Terminology; Vectors;
Journal_Title :
Information Theory, IEEE Transactions on
