Title :
Classification of Quaternary [21s+1,3] Optimal Self-orthogonal Codes
Author :
Zhao, Xuejun ; Li, Ruihu ; Lei, Yingjie
Author_Institution :
Dept. of Comput. Sci., Air Force Eng. Univ. Sanyuan, Sanyuan
Abstract :
The classification of quaternary [21s+t,3,d] codes with dges16s and without zero coordinates is reduced to the classification of quaternary [21c(3,s,t)+t,k,d] code for sges1 and 0lestles20, where c(3,s,t)les min{s, 3t} is a function of 3, s, and t. Quaternary optimal Hermitian self-orthogonal codes are characterized by systems of linear equations. Based on these two results, the complete classification of [21s+1,3] optimal self-orthogonal codes for sges1 is obtained, and the generator matrices and weight polynomials of these 3-dimensional optimal self-orthogonal codes are also given.
Keywords :
linear codes; matrix algebra; orthogonal codes; polynomials; generator matrix; linear equation; quaternary 3-dimensional optimal Hermitian self-orthogonal code classification; weight polynomial; Equations; Error correction codes; Galois fields; Linear code; Military computing; Vectors; Griesmer bound.; optimal code; quaternary linear code; self-orthogonal code;
Conference_Titel :
Computer Engineering and Technology, 2009. ICCET '09. International Conference on
Conference_Location :
Singapore
Print_ISBN :
978-1-4244-3334-6
DOI :
10.1109/ICCET.2009.93
