Title :
Trellis properties of group codes
Author :
Haibin Kan ; Hong Shen
Author_Institution :
Japan Advanced Institute of Science and Technology
Abstract :
In this paper, we discuss some trellis properties for codes over finite Abelian groups, and prove that for any biproper p-basis of a group code, their atomic spans and orders of the first and last nonzero components of vectors in the biproper p-basis are unique. This is the generalization of the corresponding trellis property for a linear code over a field. We also discuss difficulties when we try to generalize the theory of a tail-biting trellis over a field into that of a tail-biting trellis over a finite Abelian group.
Keywords :
Block codes; Character generation; Computational Intelligence Society; Decoding; Galois fields; Information science; Linear code; Parity check codes; Tail; Vectors; Atomic span; biproper p-basis; minimal span form; tail-biting trellis; trellis;
Conference_Titel :
Advanced Communication Technology, 2004. The 6th International Conference on
Conference_Location :
Phoenix Park, Korea
Print_ISBN :
89-5519-119-7
DOI :
10.1109/ICACT.2004.1292858
